/* Group 1344.8738 downloaded from the LMFDB on 03 October 2025. */
 
/* Various presentations of this group are stored in this file: 
	 GPC is polycyclic presentation GPerm is permutation group 
	 GLZ, GLFp, GLZA, GLZq, GLFq if they exist are matrix groups 
 
 Many characteristics of the group are stored as booleans in a record: 
	 Agroup, Zgroup, abelian, almost_simple,cyclic, metabelian, 
	 metacyclic, monomial, nilpotent, perfect, quasisimple, rational, 
	 solvable, supersolvable 
 
 The character table is stored as chartbl_n_i where n is the order of 
 the group and i is which group of that order it is. Conjugacy classes 
 are stored in the variable 'C' with elements from the group 'G'. 
*/
 
/* Constructions */
GPC := PCGroup([8, -2, -2, -2, -2, -2, -7, -2, -3, 2786, 2650, 66, 3467, 91, 4172, 116, 4621, 15702, 166, 14359]); a,b,c,d := Explode([GPC.1, GPC.2, GPC.3, GPC.7]); AssignNames(~GPC, ["a", "b", "c", "c2", "c4", "c8", "d", "d2"]);
GPerm := PermutationGroup< 20 | (2,3)(4,5)(6,7)(12,15)(13,17)(16,18), (9,10)(11,12,13,15,14,16,17,18), (19,20), (12,16)(15,18)(19,20), (11,13,14,17)(12,15,16,18), (11,14)(12,16)(13,17)(15,18), (8,9,10), (1,2,4,6,7,5,3) >;

 
/* Booleans */
RF := recformat< Agroup, Zgroup, abelian, almost_simple, cyclic, metabelian, metacyclic, monomial, nilpotent, perfect, quasisimple, rational, solvable, supersolvable  : BoolElt >; 
booleans_1344_8738 := rec< RF |  
Agroup := false,
Zgroup := false,
abelian := false,
almost_simple := false,
cyclic := false,
metabelian := true,
metacyclic := false,
monomial := true,
nilpotent := false,
perfect := false,
quasisimple := false,
rational := false,
solvable := true,
supersolvable := true>; 

 
/* Character Table */
G:= GPC;
C := SequenceToConjugacyClasses([car<Integers(), Integers(), G> |< 1, 1, Id(G)>,< 2, 1, d^3>,< 2, 1, c^28*d^3>,< 2, 1, c^28>,< 2, 2, a>,< 2, 2, a*d^3>,< 2, 28, b>,< 2, 28, b*d^3>,< 2, 28, a*b>,< 2, 28, a*b*d^3>,< 2, 84, b*c^47>,< 2, 84, b*c^11*d^5>,< 3, 2, d^4>,< 4, 2, c^14>,< 4, 2, c^42*d^3>,< 4, 2, a*c^42>,< 4, 2, a*c^42*d^3>,< 4, 84, a*b*c^47*d^4>,< 4, 84, a*b*c^29*d>,< 6, 2, d>,< 6, 2, c^28*d>,< 6, 2, c^28*d^4>,< 6, 2, a*d^2>,< 6, 2, a*d^4>,< 6, 2, a*d>,< 6, 2, a*d^5>,< 6, 28, b*d^2>,< 6, 28, b*d^4>,< 6, 28, b*d>,< 6, 28, b*c^2*d>,< 6, 28, a*b*d^2>,< 6, 28, a*b*d^4>,< 6, 28, a*b*d>,< 6, 28, a*b*c^2*d>,< 7, 2, c^48>,< 7, 2, c^40>,< 7, 2, c^32>,< 8, 12, c^7>,< 8, 12, c^7*d>,< 8, 12, a*c^35>,< 8, 12, a*c^35*d>,< 12, 4, c^14*d^2>,< 12, 4, c^14*d>,< 12, 4, a*c^14*d^2>,< 12, 4, a*c^14*d>,< 14, 2, c^24*d^3>,< 14, 2, c^16*d^3>,< 14, 2, c^8*d^3>,< 14, 2, c^12*d^3>,< 14, 2, c^36*d^3>,< 14, 2, c^4*d^3>,< 14, 2, c^4>,< 14, 2, c^12>,< 14, 2, c^20>,< 14, 4, a*c^24>,< 14, 4, a*c^16>,< 14, 4, a*c^8>,< 14, 4, a*c^24*d^3>,< 14, 4, a*c^16*d^3>,< 14, 4, a*c^8*d^3>,< 21, 4, c^16*d^2>,< 21, 4, c^32*d^4>,< 21, 4, c^8*d^2>,< 28, 2, c^2>,< 28, 2, c^6>,< 28, 2, c^10>,< 28, 2, c^18>,< 28, 2, c^22>,< 28, 2, c^26>,< 28, 2, c^6*d^3>,< 28, 2, c^18*d^3>,< 28, 2, c^30*d^3>,< 28, 2, c^54*d^3>,< 28, 2, c^10*d^3>,< 28, 2, c^22*d^3>,< 28, 4, a*c^6>,< 28, 4, a*c^18>,< 28, 4, a*c^30>,< 28, 4, a*c^6*d^3>,< 28, 4, a*c^18*d^3>,< 28, 4, a*c^30*d^3>,< 42, 4, c^8*d>,< 42, 4, c^16*d>,< 42, 4, c^24*d>,< 42, 4, c^4*d>,< 42, 4, c^20*d>,< 42, 4, c^12*d>,< 42, 4, c^4*d^4>,< 42, 4, c^20*d^2>,< 42, 4, c^44*d^2>,< 42, 4, a*c^8*d^2>,< 42, 4, a*c^8*d^4>,< 42, 4, a*c^16*d^4>,< 42, 4, a*c^16*d^2>,< 42, 4, a*c^4*d^2>,< 42, 4, a*c^4*d^4>,< 42, 4, a*c^8*d>,< 42, 4, a*c^8*d^5>,< 42, 4, a*c^12*d>,< 42, 4, a*c^16*d>,< 42, 4, a*c^4*d>,< 42, 4, a*c^24*d>,< 56, 12, c>,< 56, 12, c^3>,< 56, 12, c^5>,< 56, 12, c^9>,< 56, 12, c^17>,< 56, 12, c^41>,< 56, 12, c*d>,< 56, 12, c^3*d>,< 56, 12, c^5*d>,< 56, 12, c^9*d>,< 56, 12, c^17*d>,< 56, 12, c^41*d>,< 56, 12, a*c>,< 56, 12, a*c^3>,< 56, 12, a*c^5>,< 56, 12, a*c^9>,< 56, 12, a*c^17>,< 56, 12, a*c^41>,< 56, 12, a*c*d>,< 56, 12, a*c^3*d>,< 56, 12, a*c^5*d>,< 56, 12, a*c^9*d>,< 56, 12, a*c^17*d>,< 56, 12, a*c^41*d>,< 84, 4, c^2*d^2>,< 84, 4, c^10*d^2>,< 84, 4, c^34*d^2>,< 84, 4, c^26*d^2>,< 84, 4, c^18*d^2>,< 84, 4, c^6*d^2>,< 84, 4, c^2*d>,< 84, 4, c^10*d>,< 84, 4, c^34*d>,< 84, 4, c^26*d>,< 84, 4, c^18*d>,< 84, 4, c^6*d>,< 84, 4, a*c^2*d^2>,< 84, 4, a*c^2*d^4>,< 84, 4, a*c^10*d^4>,< 84, 4, a*c^10*d^2>,< 84, 4, a*c^6*d^2>,< 84, 4, a*c^6*d^4>,< 84, 4, a*c^2*d>,< 84, 4, a*c^2*d^5>,< 84, 4, a*c^18*d>,< 84, 4, a*c^10*d>,< 84, 4, a*c^6*d>,< 84, 4, a*c^34*d>]); 
CR := CharacterRing(G);
x := CR!\[1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[1, 1, -1, -1, -1, 1, -1, 1, 1, -1, -1, 1, 1, 1, -1, -1, 1, 1, -1, 1, 1, 1, -1, -1, -1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, -1, 1, -1, 1, -1, 1, 1, -1, -1, -1, 1, -1, -1, 1, -1, -1, 1, -1, 1, -1, -1, 1, 1, 1, 1, 1, 1, -1, -1, -1, 1, -1, 1, -1, 1, 1, 1, -1, -1, 1, -1, -1, 1, 1, -1, -1, -1, 1, 1, -1, 1, 1, -1, 1, 1, -1, -1, 1, 1, -1, -1, -1, -1, 1, -1, 1, 1, -1, -1, 1, 1, -1, -1, 1, 1, 1, -1, -1, 1, 1, -1, -1, 1, 1, -1, -1, 1, -1, -1, -1, -1, 1, -1, 1, -1, 1, 1, -1, 1, 1, -1, -1, -1, -1, 1, 1, 1, 1, 1, -1, 1, -1, -1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[1, 1, -1, -1, -1, 1, -1, 1, 1, -1, 1, -1, 1, 1, -1, -1, 1, -1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, -1, 1, -1, -1, 1, 1, -1, -1, -1, 1, -1, -1, 1, -1, -1, 1, -1, 1, -1, -1, 1, 1, 1, 1, 1, 1, -1, -1, -1, 1, -1, 1, -1, 1, 1, 1, -1, -1, 1, -1, -1, 1, 1, -1, -1, -1, 1, 1, -1, 1, 1, -1, 1, 1, -1, -1, 1, 1, -1, -1, -1, -1, 1, -1, -1, -1, 1, 1, -1, -1, 1, 1, -1, -1, -1, 1, 1, -1, -1, 1, 1, -1, -1, 1, 1, -1, 1, 1, -1, -1, 1, -1, 1, -1, 1, 1, -1, 1, 1, -1, -1, -1, -1, 1, 1, 1, 1, 1, -1, 1, -1, -1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[1, 1, -1, -1, -1, 1, 1, -1, -1, 1, -1, 1, 1, 1, -1, -1, 1, 1, -1, 1, 1, 1, -1, -1, -1, -1, 1, 1, 1, 1, -1, -1, -1, -1, 1, 1, 1, 1, -1, 1, -1, -1, 1, 1, -1, -1, -1, 1, -1, -1, 1, -1, -1, 1, -1, 1, -1, -1, 1, 1, 1, 1, 1, 1, -1, -1, -1, 1, -1, 1, -1, 1, 1, 1, -1, -1, 1, -1, -1, 1, 1, -1, -1, -1, 1, 1, -1, 1, 1, -1, 1, 1, -1, -1, 1, 1, -1, -1, -1, -1, 1, -1, -1, -1, 1, 1, -1, -1, 1, 1, -1, -1, -1, 1, 1, -1, -1, 1, 1, -1, -1, 1, 1, -1, 1, 1, -1, -1, 1, -1, 1, -1, 1, 1, -1, 1, 1, -1, -1, -1, -1, 1, 1, 1, 1, 1, -1, 1, -1, -1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[1, 1, -1, -1, -1, 1, 1, -1, -1, 1, 1, -1, 1, 1, -1, -1, 1, -1, 1, 1, 1, 1, -1, -1, -1, -1, 1, 1, 1, 1, -1, -1, -1, -1, 1, 1, 1, -1, 1, -1, 1, -1, 1, 1, -1, -1, -1, 1, -1, -1, 1, -1, -1, 1, -1, 1, -1, -1, 1, 1, 1, 1, 1, 1, -1, -1, -1, 1, -1, 1, -1, 1, 1, 1, -1, -1, 1, -1, -1, 1, 1, -1, -1, -1, 1, 1, -1, 1, 1, -1, 1, 1, -1, -1, 1, 1, -1, -1, -1, -1, 1, -1, 1, 1, -1, -1, 1, 1, -1, -1, 1, 1, 1, -1, -1, 1, 1, -1, -1, 1, 1, -1, -1, 1, -1, -1, -1, -1, 1, -1, 1, -1, 1, 1, -1, 1, 1, -1, -1, -1, -1, 1, 1, 1, 1, 1, -1, 1, -1, -1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[1, 1, -1, -1, 1, -1, -1, 1, -1, 1, -1, 1, 1, 1, -1, 1, -1, -1, 1, -1, -1, 1, -1, -1, 1, 1, 1, 1, -1, -1, 1, 1, -1, -1, 1, 1, 1, 1, 1, -1, -1, 1, -1, 1, -1, -1, -1, 1, -1, -1, 1, -1, -1, 1, 1, -1, 1, 1, -1, -1, 1, 1, 1, 1, -1, -1, -1, 1, -1, 1, -1, 1, 1, 1, -1, 1, -1, 1, 1, -1, -1, -1, -1, -1, 1, 1, 1, -1, -1, -1, -1, -1, 1, -1, -1, 1, 1, 1, -1, 1, -1, 1, 1, -1, -1, -1, 1, 1, -1, 1, 1, -1, -1, 1, -1, -1, 1, 1, 1, -1, -1, 1, -1, 1, -1, 1, -1, 1, -1, 1, 1, -1, 1, -1, -1, -1, 1, -1, -1, -1, 1, 1, -1, -1, -1, 1, 1, 1, 1, 1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[1, 1, -1, -1, 1, -1, -1, 1, -1, 1, 1, -1, 1, 1, -1, 1, -1, 1, -1, -1, -1, 1, -1, -1, 1, 1, 1, 1, -1, -1, 1, 1, -1, -1, 1, 1, 1, -1, -1, 1, 1, 1, -1, 1, -1, -1, -1, 1, -1, -1, 1, -1, -1, 1, 1, -1, 1, 1, -1, -1, 1, 1, 1, 1, -1, -1, -1, 1, -1, 1, -1, 1, 1, 1, -1, 1, -1, 1, 1, -1, -1, -1, -1, -1, 1, 1, 1, -1, -1, -1, -1, -1, 1, -1, -1, 1, 1, 1, -1, 1, -1, 1, -1, 1, 1, 1, -1, -1, 1, -1, -1, 1, 1, -1, 1, 1, -1, -1, -1, 1, 1, -1, 1, -1, 1, -1, -1, 1, -1, 1, 1, -1, 1, -1, -1, -1, 1, -1, -1, -1, 1, 1, -1, -1, -1, 1, 1, 1, 1, 1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[1, 1, -1, -1, 1, -1, 1, -1, 1, -1, -1, 1, 1, 1, -1, 1, -1, -1, 1, -1, -1, 1, -1, -1, 1, 1, -1, -1, 1, 1, -1, -1, 1, 1, 1, 1, 1, -1, -1, 1, 1, 1, -1, 1, -1, -1, -1, 1, -1, -1, 1, -1, -1, 1, 1, -1, 1, 1, -1, -1, 1, 1, 1, 1, -1, -1, -1, 1, -1, 1, -1, 1, 1, 1, -1, 1, -1, 1, 1, -1, -1, -1, -1, -1, 1, 1, 1, -1, -1, -1, -1, -1, 1, -1, -1, 1, 1, 1, -1, 1, -1, 1, -1, 1, 1, 1, -1, -1, 1, -1, -1, 1, 1, -1, 1, 1, -1, -1, -1, 1, 1, -1, 1, -1, 1, -1, -1, 1, -1, 1, 1, -1, 1, -1, -1, -1, 1, -1, -1, -1, 1, 1, -1, -1, -1, 1, 1, 1, 1, 1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[1, 1, -1, -1, 1, -1, 1, -1, 1, -1, 1, -1, 1, 1, -1, 1, -1, 1, -1, -1, -1, 1, -1, -1, 1, 1, -1, -1, 1, 1, -1, -1, 1, 1, 1, 1, 1, 1, 1, -1, -1, 1, -1, 1, -1, -1, -1, 1, -1, -1, 1, -1, -1, 1, 1, -1, 1, 1, -1, -1, 1, 1, 1, 1, -1, -1, -1, 1, -1, 1, -1, 1, 1, 1, -1, 1, -1, 1, 1, -1, -1, -1, -1, -1, 1, 1, 1, -1, -1, -1, -1, -1, 1, -1, -1, 1, 1, 1, -1, 1, -1, 1, 1, -1, -1, -1, 1, 1, -1, 1, 1, -1, -1, 1, -1, -1, 1, 1, 1, -1, -1, 1, -1, 1, -1, 1, -1, 1, -1, 1, 1, -1, 1, -1, -1, -1, 1, -1, -1, -1, 1, 1, -1, -1, -1, 1, 1, 1, 1, 1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[1, 1, 1, 1, -1, -1, -1, -1, 1, 1, -1, -1, 1, 1, 1, -1, -1, 1, 1, -1, -1, 1, 1, 1, -1, -1, 1, 1, -1, -1, -1, -1, 1, 1, 1, 1, 1, -1, 1, 1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, -1, -1, -1, 1, -1, -1, -1, 1, -1, 1, -1, -1, 1, -1, -1, -1, 1, -1, 1, 1, 1, 1, 1, -1, 1, -1, -1, -1, 1, -1, 1, -1, -1, -1, -1, -1, 1, 1, 1, -1, 1, -1, -1, -1, 1, 1, 1, -1, 1, -1, 1, 1, 1, 1, -1, 1, -1, -1, -1, 1, -1, 1, -1, -1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[1, 1, 1, 1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, 1, 1, 1, -1, -1, 1, 1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, -1, -1, 1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, -1, -1, -1, 1, -1, -1, -1, 1, -1, 1, -1, -1, 1, -1, -1, -1, -1, 1, -1, -1, -1, -1, -1, 1, -1, 1, 1, 1, -1, 1, -1, 1, 1, 1, 1, 1, -1, -1, -1, 1, 1, -1, -1, -1, 1, 1, 1, -1, 1, -1, 1, 1, 1, 1, -1, 1, -1, -1, -1, 1, -1, 1, -1, -1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[1, 1, 1, 1, -1, -1, 1, 1, -1, -1, -1, -1, 1, 1, 1, -1, -1, 1, 1, -1, -1, 1, 1, 1, -1, -1, -1, -1, 1, 1, 1, 1, -1, -1, 1, 1, 1, 1, -1, -1, 1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, -1, -1, -1, 1, -1, -1, -1, 1, -1, 1, -1, -1, 1, -1, -1, -1, -1, 1, -1, -1, -1, -1, -1, 1, -1, 1, 1, 1, -1, 1, -1, 1, 1, 1, 1, 1, -1, -1, -1, 1, 1, -1, -1, -1, 1, 1, 1, -1, 1, -1, 1, 1, 1, 1, -1, 1, -1, -1, -1, 1, -1, 1, -1, -1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[1, 1, 1, 1, -1, -1, 1, 1, -1, -1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, 1, 1, 1, -1, -1, -1, -1, 1, 1, 1, 1, -1, -1, 1, 1, 1, -1, 1, 1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, -1, -1, -1, 1, -1, -1, -1, 1, -1, 1, -1, -1, 1, -1, -1, -1, 1, -1, 1, 1, 1, 1, 1, -1, 1, -1, -1, -1, 1, -1, 1, -1, -1, -1, -1, -1, 1, 1, 1, -1, 1, -1, -1, -1, 1, 1, 1, -1, 1, -1, 1, 1, 1, 1, -1, 1, -1, -1, -1, 1, -1, 1, -1, -1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, -1, -1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[1, 1, 1, 1, 1, 1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, -1, -1, 1, 1, 1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[1, 1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, 1, 1, 1, 1, 1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 0, 0, -1, 2, 2, 2, 2, 0, 0, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, 2, 2, 2, 0, 0, 0, 0, -1, -1, -1, -1, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, -1, -1, -1, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[2, 2, -2, -2, -2, 2, 0, 0, 0, 0, 0, 0, 2, -2, 2, 2, -2, 0, 0, 2, 2, 2, -2, -2, -2, -2, 0, 0, 0, 0, 0, 0, 0, 0, 2, 2, 2, 0, 0, 0, 0, 2, -2, -2, 2, -2, -2, 2, -2, -2, 2, -2, -2, 2, -2, 2, -2, -2, 2, 2, 2, 2, 2, -2, 2, 2, 2, -2, 2, -2, 2, -2, -2, -2, 2, 2, -2, 2, 2, -2, -2, -2, -2, -2, 2, 2, -2, 2, 2, -2, 2, 2, -2, -2, 2, 2, -2, -2, -2, -2, 2, -2, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 2, 2, -2, 2, -2, 2, -2, -2, 2, -2, -2, 2, 2, 2, 2, -2, -2, -2, -2, -2, 2, -2, 2, 2]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[2, 2, -2, -2, 2, -2, 0, 0, 0, 0, 0, 0, 2, -2, 2, -2, 2, 0, 0, -2, -2, 2, -2, -2, 2, 2, 0, 0, 0, 0, 0, 0, 0, 0, 2, 2, 2, 0, 0, 0, 0, -2, 2, -2, 2, -2, -2, 2, -2, -2, 2, -2, -2, 2, 2, -2, 2, 2, -2, -2, 2, 2, 2, -2, 2, 2, 2, -2, 2, -2, 2, -2, -2, -2, 2, -2, 2, -2, -2, 2, 2, -2, -2, -2, 2, 2, 2, -2, -2, -2, -2, -2, 2, -2, -2, 2, 2, 2, -2, 2, -2, 2, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 2, -2, 2, -2, -2, 2, -2, 2, 2, 2, -2, 2, 2, 2, -2, -2, 2, 2, 2, -2, -2, -2, -2, -2]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[2, 2, 2, 2, -2, -2, 0, 0, 0, 0, 0, 0, 2, -2, -2, 2, 2, 0, 0, -2, -2, 2, 2, 2, -2, -2, 0, 0, 0, 0, 0, 0, 0, 0, 2, 2, 2, 0, 0, 0, 0, 2, 2, -2, -2, 2, 2, 2, 2, 2, 2, 2, 2, 2, -2, -2, -2, -2, -2, -2, 2, 2, 2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, -2, -2, -2, 2, -2, -2, -2, 2, -2, 2, -2, -2, 2, -2, -2, -2, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -2, 2, 2, 2, -2, -2, -2, 2, -2, 2, -2, -2, -2, -2, 2, -2, 2, 2, 2, -2, 2, -2, 2, 2]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[2, 2, 2, 2, 2, 2, 0, 0, 0, 0, 0, 0, 2, -2, -2, -2, -2, 0, 0, 2, 2, 2, 2, 2, 2, 2, 0, 0, 0, 0, 0, 0, 0, 0, 2, 2, 2, 0, 0, 0, 0, -2, -2, -2, -2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[2, 2, -2, -2, -2, 2, -2, 2, 2, -2, 0, 0, -1, 2, -2, -2, 2, 0, 0, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, 2, 2, 2, 0, 0, 0, 0, 1, -1, -1, 1, -2, -2, 2, -2, -2, 2, -2, -2, 2, -2, 2, -2, -2, 2, 2, -1, -1, -1, 2, -2, -2, -2, 2, -2, 2, -2, 2, 2, 2, -2, -2, 2, -2, -2, 2, 2, 1, 1, 1, -1, -1, 1, -1, -1, 1, -1, -1, 1, 1, -1, -1, 1, 1, 1, 1, -1, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 1, -1, 1, -1, 1, -1, -1, 1, -1, -1, 1, 1, 1, 1, -1, -1, -1, -1, -1, 1, -1, 1, 1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[2, 2, -2, -2, -2, 2, 2, -2, -2, 2, 0, 0, -1, 2, -2, -2, 2, 0, 0, -1, -1, -1, 1, 1, 1, 1, -1, -1, -1, -1, 1, 1, 1, 1, 2, 2, 2, 0, 0, 0, 0, 1, -1, -1, 1, -2, -2, 2, -2, -2, 2, -2, -2, 2, -2, 2, -2, -2, 2, 2, -1, -1, -1, 2, -2, -2, -2, 2, -2, 2, -2, 2, 2, 2, -2, -2, 2, -2, -2, 2, 2, 1, 1, 1, -1, -1, 1, -1, -1, 1, -1, -1, 1, 1, -1, -1, 1, 1, 1, 1, -1, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 1, -1, 1, -1, 1, -1, -1, 1, -1, -1, 1, 1, 1, 1, -1, -1, -1, -1, -1, 1, -1, 1, 1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[2, 2, -2, -2, 2, -2, -2, 2, -2, 2, 0, 0, -1, 2, -2, 2, -2, 0, 0, 1, 1, -1, 1, 1, -1, -1, -1, -1, 1, 1, -1, -1, 1, 1, 2, 2, 2, 0, 0, 0, 0, -1, 1, -1, 1, -2, -2, 2, -2, -2, 2, -2, -2, 2, 2, -2, 2, 2, -2, -2, -1, -1, -1, 2, -2, -2, -2, 2, -2, 2, -2, 2, 2, 2, -2, 2, -2, 2, 2, -2, -2, 1, 1, 1, -1, -1, -1, 1, 1, 1, 1, 1, -1, 1, 1, -1, -1, -1, 1, -1, 1, -1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, -1, 1, -1, -1, 1, -1, 1, 1, 1, -1, 1, 1, 1, -1, -1, 1, 1, 1, -1, -1, -1, -1, -1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[2, 2, -2, -2, 2, -2, 2, -2, 2, -2, 0, 0, -1, 2, -2, 2, -2, 0, 0, 1, 1, -1, 1, 1, -1, -1, 1, 1, -1, -1, 1, 1, -1, -1, 2, 2, 2, 0, 0, 0, 0, -1, 1, -1, 1, -2, -2, 2, -2, -2, 2, -2, -2, 2, 2, -2, 2, 2, -2, -2, -1, -1, -1, 2, -2, -2, -2, 2, -2, 2, -2, 2, 2, 2, -2, 2, -2, 2, 2, -2, -2, 1, 1, 1, -1, -1, -1, 1, 1, 1, 1, 1, -1, 1, 1, -1, -1, -1, 1, -1, 1, -1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, -1, 1, -1, -1, 1, -1, 1, 1, 1, -1, 1, 1, 1, -1, -1, 1, 1, 1, -1, -1, -1, -1, -1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[2, 2, 2, 2, -2, -2, -2, -2, 2, 2, 0, 0, -1, 2, 2, -2, -2, 0, 0, 1, 1, -1, -1, -1, 1, 1, -1, -1, 1, 1, 1, 1, -1, -1, 2, 2, 2, 0, 0, 0, 0, 1, 1, -1, -1, 2, 2, 2, 2, 2, 2, 2, 2, 2, -2, -2, -2, -2, -2, -2, -1, -1, -1, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, -2, -2, -2, -2, -2, -2, -1, -1, -1, -1, -1, 1, 1, 1, -1, 1, 1, 1, -1, 1, -1, 1, 1, -1, 1, 1, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -1, 1, 1, 1, -1, -1, -1, 1, -1, 1, -1, -1, -1, -1, 1, -1, 1, 1, 1, -1, 1, -1, 1, 1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[2, 2, 2, 2, -2, -2, 2, 2, -2, -2, 0, 0, -1, 2, 2, -2, -2, 0, 0, 1, 1, -1, -1, -1, 1, 1, 1, 1, -1, -1, -1, -1, 1, 1, 2, 2, 2, 0, 0, 0, 0, 1, 1, -1, -1, 2, 2, 2, 2, 2, 2, 2, 2, 2, -2, -2, -2, -2, -2, -2, -1, -1, -1, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, -2, -2, -2, -2, -2, -2, -1, -1, -1, -1, -1, 1, 1, 1, -1, 1, 1, 1, -1, 1, -1, 1, 1, -1, 1, 1, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -1, 1, 1, 1, -1, -1, -1, 1, -1, 1, -1, -1, -1, -1, 1, -1, 1, 1, 1, -1, 1, -1, 1, 1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[2, 2, 2, 2, 2, 2, -2, -2, -2, -2, 0, 0, -1, 2, 2, 2, 2, 0, 0, -1, -1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 2, 2, 2, 0, 0, 0, 0, -1, -1, -1, -1, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, -1, -1, -1, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(3: Sparse := true);
S := [ K |2,2,-2,-2,-2,2,0,0,0,0,0,0,-1,-2,2,2,-2,0,0,-1,-1,-1,1,1,1,1,-1-2*K.1,1+2*K.1,1+2*K.1,-1-2*K.1,1+2*K.1,-1-2*K.1,-1-2*K.1,1+2*K.1,2,2,2,0,0,0,0,-1,1,1,-1,-2,-2,2,-2,-2,2,-2,-2,2,-2,2,-2,-2,2,2,-1,-1,-1,-2,2,2,2,-2,2,-2,2,-2,-2,-2,2,2,-2,2,2,-2,-2,1,1,1,-1,-1,1,-1,-1,1,-1,-1,1,1,-1,-1,1,1,1,1,-1,1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1,-1,1,-1,1,-1,1,1,-1,1,1,-1,-1,-1,-1,1,1,1,1,1,-1,1,-1,-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(3: Sparse := true);
S := [ K |2,2,-2,-2,-2,2,0,0,0,0,0,0,-1,-2,2,2,-2,0,0,-1,-1,-1,1,1,1,1,1+2*K.1,-1-2*K.1,-1-2*K.1,1+2*K.1,-1-2*K.1,1+2*K.1,1+2*K.1,-1-2*K.1,2,2,2,0,0,0,0,-1,1,1,-1,-2,-2,2,-2,-2,2,-2,-2,2,-2,2,-2,-2,2,2,-1,-1,-1,-2,2,2,2,-2,2,-2,2,-2,-2,-2,2,2,-2,2,2,-2,-2,1,1,1,-1,-1,1,-1,-1,1,-1,-1,1,1,-1,-1,1,1,1,1,-1,1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1,-1,1,-1,1,-1,1,1,-1,1,1,-1,-1,-1,-1,1,1,1,1,1,-1,1,-1,-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(3: Sparse := true);
S := [ K |2,2,-2,-2,2,-2,0,0,0,0,0,0,-1,-2,2,-2,2,0,0,1,1,-1,1,1,-1,-1,-1-2*K.1,1+2*K.1,-1-2*K.1,1+2*K.1,-1-2*K.1,1+2*K.1,-1-2*K.1,1+2*K.1,2,2,2,0,0,0,0,1,-1,1,-1,-2,-2,2,-2,-2,2,-2,-2,2,2,-2,2,2,-2,-2,-1,-1,-1,-2,2,2,2,-2,2,-2,2,-2,-2,-2,2,-2,2,-2,-2,2,2,1,1,1,-1,-1,-1,1,1,1,1,1,-1,1,1,-1,-1,-1,1,-1,1,-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1,1,-1,1,1,-1,1,-1,-1,-1,1,-1,-1,-1,1,1,-1,-1,-1,1,1,1,1,1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(3: Sparse := true);
S := [ K |2,2,-2,-2,2,-2,0,0,0,0,0,0,-1,-2,2,-2,2,0,0,1,1,-1,1,1,-1,-1,1+2*K.1,-1-2*K.1,1+2*K.1,-1-2*K.1,1+2*K.1,-1-2*K.1,1+2*K.1,-1-2*K.1,2,2,2,0,0,0,0,1,-1,1,-1,-2,-2,2,-2,-2,2,-2,-2,2,2,-2,2,2,-2,-2,-1,-1,-1,-2,2,2,2,-2,2,-2,2,-2,-2,-2,2,-2,2,-2,-2,2,2,1,1,1,-1,-1,-1,1,1,1,1,1,-1,1,1,-1,-1,-1,1,-1,1,-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1,1,-1,1,1,-1,1,-1,-1,-1,1,-1,-1,-1,1,1,-1,-1,-1,1,1,1,1,1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(3: Sparse := true);
S := [ K |2,2,2,2,-2,-2,0,0,0,0,0,0,-1,-2,-2,2,2,0,0,1,1,-1,-1,-1,1,1,-1-2*K.1,1+2*K.1,-1-2*K.1,1+2*K.1,1+2*K.1,-1-2*K.1,1+2*K.1,-1-2*K.1,2,2,2,0,0,0,0,-1,-1,1,1,2,2,2,2,2,2,2,2,2,-2,-2,-2,-2,-2,-2,-1,-1,-1,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,2,2,2,2,2,2,-1,-1,-1,-1,-1,1,1,1,-1,1,1,1,-1,1,-1,1,1,-1,1,1,1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,1,-1,-1,-1,1,1,1,-1,1,-1,1,1,1,1,-1,1,-1,-1,-1,1,-1,1,-1,-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(3: Sparse := true);
S := [ K |2,2,2,2,-2,-2,0,0,0,0,0,0,-1,-2,-2,2,2,0,0,1,1,-1,-1,-1,1,1,1+2*K.1,-1-2*K.1,1+2*K.1,-1-2*K.1,-1-2*K.1,1+2*K.1,-1-2*K.1,1+2*K.1,2,2,2,0,0,0,0,-1,-1,1,1,2,2,2,2,2,2,2,2,2,-2,-2,-2,-2,-2,-2,-1,-1,-1,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,2,2,2,2,2,2,-1,-1,-1,-1,-1,1,1,1,-1,1,1,1,-1,1,-1,1,1,-1,1,1,1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,1,-1,-1,-1,1,1,1,-1,1,-1,1,1,1,1,-1,1,-1,-1,-1,1,-1,1,-1,-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(3: Sparse := true);
S := [ K |2,2,2,2,2,2,0,0,0,0,0,0,-1,-2,-2,-2,-2,0,0,-1,-1,-1,-1,-1,-1,-1,-1-2*K.1,1+2*K.1,1+2*K.1,-1-2*K.1,-1-2*K.1,1+2*K.1,1+2*K.1,-1-2*K.1,2,2,2,0,0,0,0,1,1,1,1,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,-1,-1,-1,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(3: Sparse := true);
S := [ K |2,2,2,2,2,2,0,0,0,0,0,0,-1,-2,-2,-2,-2,0,0,-1,-1,-1,-1,-1,-1,-1,1+2*K.1,-1-2*K.1,-1-2*K.1,1+2*K.1,1+2*K.1,-1-2*K.1,-1-2*K.1,1+2*K.1,2,2,2,0,0,0,0,1,1,1,1,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,-1,-1,-1,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,2,2,2,2,0,0,0,0,0,0,2,2,2,2,2,0,0,2,2,2,2,2,2,2,0,0,0,0,0,0,0,0,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,2,2,2,2,2,2,2,2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,2,2,2,2,0,0,0,0,0,0,2,2,2,2,2,0,0,2,2,2,2,2,2,2,0,0,0,0,0,0,0,0,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,2,2,2,2,2,2,2,2,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,2,2,2,2,0,0,0,0,0,0,2,2,2,2,2,0,0,2,2,2,2,2,2,2,0,0,0,0,0,0,0,0,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,2,2,2,2,2,2,2,2,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,-2,-2,-2,2,0,0,0,0,0,0,2,2,-2,-2,2,0,0,2,2,2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-2,2,-2,2,-2,2,2,-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,-2,-2,-2,2,0,0,0,0,0,0,2,2,-2,-2,2,0,0,2,2,2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-2,2,-2,2,-2,2,2,-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,-2,-2,-2,2,0,0,0,0,0,0,2,2,-2,-2,2,0,0,2,2,2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-2,2,-2,2,-2,2,2,-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,-2,-2,-2,2,0,0,0,0,0,0,2,2,-2,-2,2,0,0,2,2,2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,2,-2,2,-2,-2,2,2,-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,-2,-2,-2,2,0,0,0,0,0,0,2,2,-2,-2,2,0,0,2,2,2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,2,-2,2,-2,-2,2,2,-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,-2,-2,-2,2,0,0,0,0,0,0,2,2,-2,-2,2,0,0,2,2,2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,2,-2,2,-2,-2,2,2,-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,-2,-2,2,-2,0,0,0,0,0,0,2,2,-2,2,-2,0,0,-2,-2,2,-2,-2,2,2,0,0,0,0,0,0,0,0,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-2,-2,2,2,2,-2,2,-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,-2,-2,2,-2,0,0,0,0,0,0,2,2,-2,2,-2,0,0,-2,-2,2,-2,-2,2,2,0,0,0,0,0,0,0,0,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-2,-2,2,2,2,-2,2,-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,-2,-2,2,-2,0,0,0,0,0,0,2,2,-2,2,-2,0,0,-2,-2,2,-2,-2,2,2,0,0,0,0,0,0,0,0,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-2,-2,2,2,2,-2,2,-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,-2,-2,2,-2,0,0,0,0,0,0,2,2,-2,2,-2,0,0,-2,-2,2,-2,-2,2,2,0,0,0,0,0,0,0,0,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,2,2,-2,-2,2,-2,2,-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,-2,-2,2,-2,0,0,0,0,0,0,2,2,-2,2,-2,0,0,-2,-2,2,-2,-2,2,2,0,0,0,0,0,0,0,0,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,2,2,-2,-2,2,-2,2,-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,-2,-2,2,-2,0,0,0,0,0,0,2,2,-2,2,-2,0,0,-2,-2,2,-2,-2,2,2,0,0,0,0,0,0,0,0,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,2,2,-2,-2,2,-2,2,-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,2,2,-2,-2,0,0,0,0,0,0,2,2,2,-2,-2,0,0,-2,-2,2,2,2,-2,-2,0,0,0,0,0,0,0,0,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-2,2,2,-2,-2,-2,2,2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,2,2,-2,-2,0,0,0,0,0,0,2,2,2,-2,-2,0,0,-2,-2,2,2,2,-2,-2,0,0,0,0,0,0,0,0,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-2,2,2,-2,-2,-2,2,2,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,2,2,-2,-2,0,0,0,0,0,0,2,2,2,-2,-2,0,0,-2,-2,2,2,2,-2,-2,0,0,0,0,0,0,0,0,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-2,2,2,-2,-2,-2,2,2,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,2,2,-2,-2,0,0,0,0,0,0,2,2,2,-2,-2,0,0,-2,-2,2,2,2,-2,-2,0,0,0,0,0,0,0,0,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,2,-2,-2,2,-2,-2,2,2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,2,2,-2,-2,0,0,0,0,0,0,2,2,2,-2,-2,0,0,-2,-2,2,2,2,-2,-2,0,0,0,0,0,0,0,0,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,2,-2,-2,2,-2,-2,2,2,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,2,2,-2,-2,0,0,0,0,0,0,2,2,2,-2,-2,0,0,-2,-2,2,2,2,-2,-2,0,0,0,0,0,0,0,0,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,2,-2,-2,2,-2,-2,2,2,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,2,2,2,2,0,0,0,0,0,0,2,2,2,2,2,0,0,2,2,2,2,2,2,2,0,0,0,0,0,0,0,0,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-2,-2,-2,-2,2,2,2,2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,2,2,2,2,0,0,0,0,0,0,2,2,2,2,2,0,0,2,2,2,2,2,2,2,0,0,0,0,0,0,0,0,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-2,-2,-2,-2,2,2,2,2,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |2,2,2,2,2,2,0,0,0,0,0,0,2,2,2,2,2,0,0,2,2,2,2,2,2,2,0,0,0,0,0,0,0,0,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-2,-2,-2,-2,2,2,2,2,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,-2,-2,-2,2,0,0,0,0,0,0,2,-2,2,2,-2,0,0,2,2,2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,0,0,0,0,2,-2,-2,2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,K.1+K.1^-1,-1*K.1^5-K.1^-5,K.1+K.1^-1,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^5+K.1^-5,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,K.1^5+K.1^-5,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,-1*K.1-K.1^-1,K.1^5+K.1^-5,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^4+K.1^-4]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,-2,-2,-2,2,0,0,0,0,0,0,2,-2,2,2,-2,0,0,2,2,2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,0,0,0,0,2,-2,-2,2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^5+K.1^-5,-1*K.1-K.1^-1,K.1^5+K.1^-5,-1*K.1-K.1^-1,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^5+K.1^-5,K.1+K.1^-1,-1*K.1^5-K.1^-5,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,K.1+K.1^-1,-1*K.1^5-K.1^-5,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^4+K.1^-4]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,-2,-2,-2,2,0,0,0,0,0,0,2,-2,2,2,-2,0,0,2,2,2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,0,0,0,0,2,-2,-2,2,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^5+K.1^-5,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,K.1^5+K.1^-5,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^5+K.1^-5,-1*K.1^5-K.1^-5,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^2-K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,-2,-2,-2,2,0,0,0,0,0,0,2,-2,2,2,-2,0,0,2,2,2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,0,0,0,0,2,-2,-2,2,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^5+K.1^-5,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^5-K.1^-5,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^5-K.1^-5,K.1^5+K.1^-5,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^2-K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,-2,-2,-2,2,0,0,0,0,0,0,2,-2,2,2,-2,0,0,2,2,2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,0,0,0,0,2,-2,-2,2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^5+K.1^-5,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,K.1+K.1^-1,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,-2,-2,-2,2,0,0,0,0,0,0,2,-2,2,2,-2,0,0,2,2,2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,0,0,0,0,2,-2,-2,2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,K.1^5+K.1^-5,-1*K.1-K.1^-1,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,-2,-2,2,-2,0,0,0,0,0,0,2,-2,2,-2,2,0,0,-2,-2,2,-2,-2,2,2,0,0,0,0,0,0,0,0,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,0,0,0,0,-2,2,-2,2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,K.1+K.1^-1,-1*K.1^5-K.1^-5,K.1+K.1^-1,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^5+K.1^-5,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^5+K.1^-5,K.1+K.1^-1,-1*K.1^5-K.1^-5,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,-1*K.1-K.1^-1,-1*K.1^5-K.1^-5,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,-2,-2,2,-2,0,0,0,0,0,0,2,-2,2,-2,2,0,0,-2,-2,2,-2,-2,2,2,0,0,0,0,0,0,0,0,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,0,0,0,0,-2,2,-2,2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,K.1^5+K.1^-5,-1*K.1-K.1^-1,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^5-K.1^-5,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,K.1^5+K.1^-5,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,K.1+K.1^-1,K.1^5+K.1^-5,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,-2,-2,2,-2,0,0,0,0,0,0,2,-2,2,-2,2,0,0,-2,-2,2,-2,-2,2,2,0,0,0,0,0,0,0,0,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,0,0,0,0,-2,2,-2,2,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^5-K.1^-5,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^5+K.1^-5,K.1^5+K.1^-5,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^5+K.1^-5,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^5-K.1^-5,-1*K.1^5-K.1^-5,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,-2,-2,2,-2,0,0,0,0,0,0,2,-2,2,-2,2,0,0,-2,-2,2,-2,-2,2,2,0,0,0,0,0,0,0,0,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,0,0,0,0,-2,2,-2,2,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^5+K.1^-5,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^5-K.1^-5,-1*K.1^5-K.1^-5,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^5+K.1^-5,K.1^5+K.1^-5,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,-2,-2,2,-2,0,0,0,0,0,0,2,-2,2,-2,2,0,0,-2,-2,2,-2,-2,2,2,0,0,0,0,0,0,0,0,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,0,0,0,0,-2,2,-2,2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^5+K.1^-5,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^5-K.1^-5,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,K.1+K.1^-1,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,-2,-2,2,-2,0,0,0,0,0,0,2,-2,2,-2,2,0,0,-2,-2,2,-2,-2,2,2,0,0,0,0,0,0,0,0,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,0,0,0,0,-2,2,-2,2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1+K.1^-1,K.1^3+K.1^-3,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^5-K.1^-5,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^5+K.1^-5,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,2,2,-2,-2,0,0,0,0,0,0,2,-2,-2,2,2,0,0,-2,-2,2,2,2,-2,-2,0,0,0,0,0,0,0,0,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,0,0,0,0,2,2,-2,-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,-1*K.1-K.1^-1,K.1^5+K.1^-5,K.1+K.1^-1,-1*K.1^5-K.1^-5,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^5-K.1^-5,K.1+K.1^-1,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^5+K.1^-5,K.1+K.1^-1,K.1^5+K.1^-5,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^4+K.1^-4]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,2,2,-2,-2,0,0,0,0,0,0,2,-2,-2,2,2,0,0,-2,-2,2,2,2,-2,-2,0,0,0,0,0,0,0,0,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,0,0,0,0,2,2,-2,-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,K.1+K.1^-1,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,K.1^5+K.1^-5,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^5+K.1^-5,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^5+K.1^-5,-1*K.1-K.1^-1,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,-1*K.1^5-K.1^-5,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^4+K.1^-4]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,2,2,-2,-2,0,0,0,0,0,0,2,-2,-2,2,2,0,0,-2,-2,2,2,2,-2,-2,0,0,0,0,0,0,0,0,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,0,0,0,0,2,2,-2,-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^5-K.1^-5,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^5-K.1^-5,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,K.1^5+K.1^-5,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^5+K.1^-5,K.1^5+K.1^-5,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^2-K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,2,2,-2,-2,0,0,0,0,0,0,2,-2,-2,2,2,0,0,-2,-2,2,2,2,-2,-2,0,0,0,0,0,0,0,0,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,0,0,0,0,2,2,-2,-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^5+K.1^-5,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^5+K.1^-5,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,-1*K.1^5-K.1^-5,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^5-K.1^-5,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^2-K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,2,2,-2,-2,0,0,0,0,0,0,2,-2,-2,2,2,0,0,-2,-2,2,2,2,-2,-2,0,0,0,0,0,0,0,0,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,0,0,0,0,2,2,-2,-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^5+K.1^-5,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^5+K.1^-5,K.1^3+K.1^-3,K.1^5+K.1^-5,K.1+K.1^-1,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,2,2,-2,-2,0,0,0,0,0,0,2,-2,-2,2,2,0,0,-2,-2,2,2,2,-2,-2,0,0,0,0,0,0,0,0,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,0,0,0,0,2,2,-2,-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^5-K.1^-5,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^5-K.1^-5,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1^5+K.1^-5,K.1^3+K.1^-3,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^4+K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,2,2,2,2,0,0,0,0,0,0,2,-2,-2,-2,-2,0,0,2,2,2,2,2,2,2,0,0,0,0,0,0,0,0,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,0,0,0,0,-2,-2,-2,-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,K.1^5+K.1^-5,K.1+K.1^-1,-1*K.1^5-K.1^-5,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^5-K.1^-5,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^5+K.1^-5,-1*K.1-K.1^-1,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1^5+K.1^-5,K.1+K.1^-1,-1*K.1^5-K.1^-5,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,2,2,2,2,0,0,0,0,0,0,2,-2,-2,-2,-2,0,0,2,2,2,2,2,2,2,0,0,0,0,0,0,0,0,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,0,0,0,0,-2,-2,-2,-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^5+K.1^-5,K.1+K.1^-1,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,K.1^5+K.1^-5,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^5+K.1^-5,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^5-K.1^-5,K.1+K.1^-1,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,K.1^5+K.1^-5,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,2,2,2,2,0,0,0,0,0,0,2,-2,-2,-2,-2,0,0,2,2,2,2,2,2,2,0,0,0,0,0,0,0,0,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,0,0,0,0,-2,-2,-2,-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^5-K.1^-5,K.1^5+K.1^-5,K.1^3+K.1^-3,K.1^5+K.1^-5,-1*K.1^5-K.1^-5,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^5-K.1^-5,K.1^5+K.1^-5,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,2,2,2,2,0,0,0,0,0,0,2,-2,-2,-2,-2,0,0,2,2,2,2,2,2,2,0,0,0,0,0,0,0,0,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,0,0,0,0,-2,-2,-2,-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,K.1^5+K.1^-5,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^5+K.1^-5,-1*K.1^5-K.1^-5,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,K.1^5+K.1^-5,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^5+K.1^-5,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,2,2,2,2,0,0,0,0,0,0,2,-2,-2,-2,-2,0,0,2,2,2,2,2,2,2,0,0,0,0,0,0,0,0,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,0,0,0,0,-2,-2,-2,-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^5+K.1^-5,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,K.1+K.1^-1,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |2,2,2,2,2,2,0,0,0,0,0,0,2,-2,-2,-2,-2,0,0,2,2,2,2,2,2,2,0,0,0,0,0,0,0,0,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,0,0,0,0,-2,-2,-2,-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,-1*K.1^6-K.1^-6,K.1^4+K.1^-4,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^5-K.1^-5,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,K.1^5+K.1^-5,-1*K.1-K.1^-1,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,-1*K.1^5-K.1^-5,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1^5+K.1^-5,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,K.1^6+K.1^-6,K.1^6+K.1^-6,K.1^2+K.1^-2,K.1^6+K.1^-6,K.1^2+K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^6+K.1^-6]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[4, -4, -4, 4, 0, 0, 0, 0, 0, 0, 0, 0, 4, 0, 0, 0, 0, 0, 0, 0, 0, -4, -4, 4, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 4, 4, 4, 0, 0, 0, 0, 0, 0, 0, 0, -4, -4, -4, 4, 4, -4, 4, -4, -4, 0, 0, 0, 0, 0, 0, 4, 4, 4, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 4, -4, 4, -4, -4, 0, 0, 0, -4, 0, 0, 0, 4, 0, -4, 0, 0, -4, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
x := CR!\[4, -4, 4, -4, 0, 0, 0, 0, 0, 0, 0, 0, 4, 0, 0, 0, 0, 0, 0, 0, 0, -4, 4, -4, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 4, 4, 4, 0, 0, 0, 0, 0, 0, 0, 0, 4, 4, -4, -4, -4, -4, -4, 4, -4, 0, 0, 0, 0, 0, 0, 4, 4, 4, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -4, 4, -4, -4, -4, 0, 0, 0, 4, 0, 0, 0, -4, 0, -4, 0, 0, 4, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(3: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,-2-4*K.1,2+4*K.1,2,2,-2,-2-4*K.1,2+4*K.1,0,0,0,0,0,0,0,0,4,4,4,0,0,0,0,0,0,0,0,-4,-4,-4,4,4,-4,4,-4,-4,0,0,0,0,0,0,-2,-2,-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2,2,-2,2,2,-2-4*K.1,2+4*K.1,2+4*K.1,2,2+4*K.1,-2-4*K.1,2+4*K.1,-2,-2-4*K.1,2,-2-4*K.1,2+4*K.1,2,2+4*K.1,-2-4*K.1,-2-4*K.1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(3: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,2+4*K.1,-2-4*K.1,2,2,-2,2+4*K.1,-2-4*K.1,0,0,0,0,0,0,0,0,4,4,4,0,0,0,0,0,0,0,0,-4,-4,-4,4,4,-4,4,-4,-4,0,0,0,0,0,0,-2,-2,-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2,2,-2,2,2,2+4*K.1,-2-4*K.1,-2-4*K.1,2,-2-4*K.1,2+4*K.1,-2-4*K.1,-2,2+4*K.1,2,2+4*K.1,-2-4*K.1,2,-2-4*K.1,2+4*K.1,2+4*K.1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(3: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,-2-4*K.1,2+4*K.1,2,-2,2,2+4*K.1,-2-4*K.1,0,0,0,0,0,0,0,0,4,4,4,0,0,0,0,0,0,0,0,4,4,-4,-4,-4,-4,-4,4,-4,0,0,0,0,0,0,-2,-2,-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2,-2,2,2,2,2+4*K.1,2+4*K.1,2+4*K.1,-2,2+4*K.1,-2-4*K.1,-2-4*K.1,2,-2-4*K.1,2,2+4*K.1,-2-4*K.1,-2,-2-4*K.1,-2-4*K.1,2+4*K.1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(3: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,2+4*K.1,-2-4*K.1,2,-2,2,-2-4*K.1,2+4*K.1,0,0,0,0,0,0,0,0,4,4,4,0,0,0,0,0,0,0,0,4,4,-4,-4,-4,-4,-4,4,-4,0,0,0,0,0,0,-2,-2,-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2,-2,2,2,2,-2-4*K.1,-2-4*K.1,-2-4*K.1,-2,-2-4*K.1,2+4*K.1,2+4*K.1,2,2+4*K.1,2,-2-4*K.1,2+4*K.1,-2,2+4*K.1,2+4*K.1,-2-4*K.1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,4,4,4,4,0,0,0,0,0,0,-2,4,4,4,4,0,0,-2,-2,-2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,0,0,0,0,-2,-2,-2,-2,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,4,4,4,4,0,0,0,0,0,0,-2,4,4,4,4,0,0,-2,-2,-2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,0,0,0,0,-2,-2,-2,-2,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,4,4,4,4,0,0,0,0,0,0,-2,4,4,4,4,0,0,-2,-2,-2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,0,0,0,0,-2,-2,-2,-2,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1-K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,-4,-4,-4,4,0,0,0,0,0,0,-2,4,-4,-4,4,0,0,-2,-2,-2,2,2,2,2,0,0,0,0,0,0,0,0,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,0,0,0,0,2,-2,-2,2,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,2*K.1^2+2*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,-4,-4,-4,4,0,0,0,0,0,0,-2,4,-4,-4,4,0,0,-2,-2,-2,2,2,2,2,0,0,0,0,0,0,0,0,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,0,0,0,0,2,-2,-2,2,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,2*K.1^2+2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,2*K.1+2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,2*K.1^2+2*K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,-4,-4,-4,4,0,0,0,0,0,0,-2,4,-4,-4,4,0,0,-2,-2,-2,2,2,2,2,0,0,0,0,0,0,0,0,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,0,0,0,0,2,-2,-2,2,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1+2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^2-2*K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,2*K.1+2*K.1^-1,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,-1*K.1-K.1^-1,K.1+K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,-4,-4,4,-4,0,0,0,0,0,0,-2,4,-4,4,-4,0,0,2,2,-2,2,2,-2,-2,0,0,0,0,0,0,0,0,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,0,0,0,0,-2,2,-2,2,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,2*K.1^2+2*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,-4,-4,4,-4,0,0,0,0,0,0,-2,4,-4,4,-4,0,0,2,2,-2,2,2,-2,-2,0,0,0,0,0,0,0,0,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,0,0,0,0,-2,2,-2,2,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,2*K.1^2+2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,2*K.1+2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,2*K.1^2+2*K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,-4,-4,4,-4,0,0,0,0,0,0,-2,4,-4,4,-4,0,0,2,2,-2,2,2,-2,-2,0,0,0,0,0,0,0,0,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,0,0,0,0,-2,2,-2,2,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1+2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^2-2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,2*K.1+2*K.1^-1,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1-K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,4,4,-4,-4,0,0,0,0,0,0,-2,4,4,-4,-4,0,0,2,2,-2,-2,-2,2,2,0,0,0,0,0,0,0,0,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,0,0,0,0,2,2,-2,-2,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^3+K.1^-3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,4,4,-4,-4,0,0,0,0,0,0,-2,4,4,-4,-4,0,0,2,2,-2,-2,-2,2,2,0,0,0,0,0,0,0,0,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,0,0,0,0,2,2,-2,-2,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,4,4,-4,-4,0,0,0,0,0,0,-2,4,4,-4,-4,0,0,2,2,-2,-2,-2,2,2,0,0,0,0,0,0,0,0,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,0,0,0,0,2,2,-2,-2,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1+K.1^-1,K.1+K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,-4,-4,-4,4,0,0,0,0,0,0,-2,-4,4,4,-4,0,0,-2,-2,-2,2,2,2,2,0,0,0,0,0,0,0,0,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,0,0,0,0,-2,2,2,-2,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-2*K.1^2-2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,-4,-4,-4,4,0,0,0,0,0,0,-2,-4,4,4,-4,0,0,-2,-2,-2,2,2,2,2,0,0,0,0,0,0,0,0,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,0,0,0,0,-2,2,2,-2,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,2*K.1^2+2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-2*K.1-2*K.1^-1,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,-2*K.1^2-2*K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,-4,-4,-4,4,0,0,0,0,0,0,-2,-4,4,4,-4,0,0,-2,-2,-2,2,2,2,2,0,0,0,0,0,0,0,0,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,0,0,0,0,-2,2,2,-2,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1+2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^2-2*K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1-2*K.1^-1,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,-1*K.1-K.1^-1,K.1+K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,-4,-4,4,-4,0,0,0,0,0,0,-2,-4,4,-4,4,0,0,2,2,-2,2,2,-2,-2,0,0,0,0,0,0,0,0,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,0,0,0,0,2,-2,2,-2,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-2*K.1^2-2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,-4,-4,4,-4,0,0,0,0,0,0,-2,-4,4,-4,4,0,0,2,2,-2,2,2,-2,-2,0,0,0,0,0,0,0,0,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,0,0,0,0,2,-2,2,-2,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,2*K.1^2+2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-2*K.1-2*K.1^-1,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,-2*K.1^2-2*K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,-4,-4,4,-4,0,0,0,0,0,0,-2,-4,4,-4,4,0,0,2,2,-2,2,2,-2,-2,0,0,0,0,0,0,0,0,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,0,0,0,0,2,-2,2,-2,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1+2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^2-2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1-2*K.1^-1,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1-K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,4,4,-4,-4,0,0,0,0,0,0,-2,-4,-4,4,4,0,0,2,2,-2,-2,-2,2,2,0,0,0,0,0,0,0,0,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,0,0,0,0,-2,-2,2,2,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^3+K.1^-3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,4,4,-4,-4,0,0,0,0,0,0,-2,-4,-4,4,4,0,0,2,2,-2,-2,-2,2,2,0,0,0,0,0,0,0,0,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,0,0,0,0,-2,-2,2,2,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^2+K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1+K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,4,4,-4,-4,0,0,0,0,0,0,-2,-4,-4,4,4,0,0,2,2,-2,-2,-2,2,2,0,0,0,0,0,0,0,0,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,0,0,0,0,-2,-2,2,2,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,-1*K.1^2-K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,K.1+K.1^-1,K.1+K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,-1*K.1-K.1^-1,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,-1*K.1^2-K.1^-2,K.1^2+K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,K.1+K.1^-1,-1*K.1-K.1^-1,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,4,4,4,4,0,0,0,0,0,0,-2,-4,-4,-4,-4,0,0,-2,-2,-2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,0,0,0,0,2,2,2,2,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,4,4,4,4,0,0,0,0,0,0,-2,-4,-4,-4,-4,0,0,-2,-2,-2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,0,0,0,0,2,2,2,2,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(7: Sparse := true);
S := [ K |4,4,4,4,4,4,0,0,0,0,0,0,-2,-4,-4,-4,-4,0,0,-2,-2,-2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,0,0,0,0,2,2,2,2,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^3+2*K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1-K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1+K.1^-1,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1^2+K.1^-2,K.1^3+K.1^-3,K.1+K.1^-1,K.1+K.1^-1,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^2+K.1^-2]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,4,0,0,0,0,0,0,0,0,-4,-4,4,0,0,0,0,0,0,0,0,0,0,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,0,0,0,0,0,0,0,0,2*K.1^2+2*K.1^-2,2*K.1^6+2*K.1^-6,-2*K.1^4-2*K.1^-4,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,2*K.1^6+2*K.1^-6,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^5-2*K.1^-5,-2*K.1^5-2*K.1^-5,2*K.1^3+2*K.1^-3,2*K.1^5+2*K.1^-5,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^5+2*K.1^-5,0,0,0,0,0,0,-2*K.1^2-2*K.1^-2,2*K.1^6+2*K.1^-6,-2*K.1^6-2*K.1^-6,-2*K.1^4-2*K.1^-4,2*K.1^6+2*K.1^-6,0,0,0,-2*K.1^4-2*K.1^-4,0,0,0,2*K.1^4+2*K.1^-4,0,2*K.1^2+2*K.1^-2,0,0,2*K.1^2+2*K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1+2*K.1^-1,0,0,0,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,0,-2*K.1^5-2*K.1^-5,0,-2*K.1^5-2*K.1^-5,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1^5+2*K.1^-5,0,2*K.1^3+2*K.1^-3,0,0,0,2*K.1^5+2*K.1^-5,0,-2*K.1-2*K.1^-1,0,0]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,4,0,0,0,0,0,0,0,0,-4,-4,4,0,0,0,0,0,0,0,0,0,0,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,0,0,0,0,0,0,0,0,2*K.1^2+2*K.1^-2,2*K.1^6+2*K.1^-6,-2*K.1^4-2*K.1^-4,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,2*K.1^6+2*K.1^-6,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^5+2*K.1^-5,2*K.1^5+2*K.1^-5,-2*K.1^3-2*K.1^-3,-2*K.1^5-2*K.1^-5,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^5-2*K.1^-5,0,0,0,0,0,0,-2*K.1^2-2*K.1^-2,2*K.1^6+2*K.1^-6,-2*K.1^6-2*K.1^-6,-2*K.1^4-2*K.1^-4,2*K.1^6+2*K.1^-6,0,0,0,-2*K.1^4-2*K.1^-4,0,0,0,2*K.1^4+2*K.1^-4,0,2*K.1^2+2*K.1^-2,0,0,2*K.1^2+2*K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2*K.1-2*K.1^-1,0,0,0,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,0,2*K.1^5+2*K.1^-5,0,2*K.1^5+2*K.1^-5,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^5-2*K.1^-5,0,-2*K.1^3-2*K.1^-3,0,0,0,-2*K.1^5-2*K.1^-5,0,2*K.1+2*K.1^-1,0,0]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,4,0,0,0,0,0,0,0,0,-4,-4,4,0,0,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,0,0,0,0,0,0,0,0,2*K.1^6+2*K.1^-6,-2*K.1^4-2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,2*K.1^6+2*K.1^-6,-2*K.1^2-2*K.1^-2,2*K.1^2+2*K.1^-2,-2*K.1^4-2*K.1^-4,0,0,0,0,0,0,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^5+2*K.1^-5,2*K.1^5+2*K.1^-5,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,-2*K.1^5-2*K.1^-5,-2*K.1-2*K.1^-1,-2*K.1^5-2*K.1^-5,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,-2*K.1^4-2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,-2*K.1^4-2*K.1^-4,0,0,0,2*K.1^2+2*K.1^-2,0,0,0,-2*K.1^2-2*K.1^-2,0,2*K.1^6+2*K.1^-6,0,0,2*K.1^6+2*K.1^-6,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1^3+2*K.1^-3,0,0,0,2*K.1^5+2*K.1^-5,2*K.1^5+2*K.1^-5,2*K.1^3+2*K.1^-3,0,2*K.1+2*K.1^-1,0,2*K.1+2*K.1^-1,-2*K.1^5-2*K.1^-5,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,0,-2*K.1^5-2*K.1^-5,0,0,0,-2*K.1-2*K.1^-1,0,-2*K.1^3-2*K.1^-3,0,0]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,4,0,0,0,0,0,0,0,0,-4,-4,4,0,0,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,0,0,0,0,0,0,0,0,2*K.1^6+2*K.1^-6,-2*K.1^4-2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,2*K.1^6+2*K.1^-6,-2*K.1^2-2*K.1^-2,2*K.1^2+2*K.1^-2,-2*K.1^4-2*K.1^-4,0,0,0,0,0,0,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^5-2*K.1^-5,-2*K.1^5-2*K.1^-5,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,2*K.1^5+2*K.1^-5,2*K.1+2*K.1^-1,2*K.1^5+2*K.1^-5,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,-2*K.1^4-2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,-2*K.1^4-2*K.1^-4,0,0,0,2*K.1^2+2*K.1^-2,0,0,0,-2*K.1^2-2*K.1^-2,0,2*K.1^6+2*K.1^-6,0,0,2*K.1^6+2*K.1^-6,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2*K.1^3-2*K.1^-3,0,0,0,-2*K.1^5-2*K.1^-5,-2*K.1^5-2*K.1^-5,-2*K.1^3-2*K.1^-3,0,-2*K.1-2*K.1^-1,0,-2*K.1-2*K.1^-1,2*K.1^5+2*K.1^-5,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,0,2*K.1^5+2*K.1^-5,0,0,0,2*K.1+2*K.1^-1,0,2*K.1^3+2*K.1^-3,0,0]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,4,0,0,0,0,0,0,0,0,-4,-4,4,0,0,0,0,0,0,0,0,0,0,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,0,0,0,0,0,0,0,0,-2*K.1^4-2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1^6+2*K.1^-6,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^6-2*K.1^-6,2*K.1^6+2*K.1^-6,2*K.1^2+2*K.1^-2,0,0,0,0,0,0,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,-2*K.1^5-2*K.1^-5,-2*K.1^5-2*K.1^-5,2*K.1^5+2*K.1^-5,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1^5+2*K.1^-5,2*K.1^3+2*K.1^-3,0,0,0,0,0,0,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,-2*K.1^2-2*K.1^-2,2*K.1^6+2*K.1^-6,2*K.1^2+2*K.1^-2,0,0,0,2*K.1^6+2*K.1^-6,0,0,0,-2*K.1^6-2*K.1^-6,0,-2*K.1^4-2*K.1^-4,0,0,-2*K.1^4-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1^5+2*K.1^-5,0,0,0,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^5+2*K.1^-5,0,-2*K.1^3-2*K.1^-3,0,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^5-2*K.1^-5,2*K.1^3+2*K.1^-3,0,-2*K.1-2*K.1^-1,0,0,0,2*K.1^3+2*K.1^-3,0,-2*K.1^5-2*K.1^-5,0,0]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,4,0,0,0,0,0,0,0,0,-4,-4,4,0,0,0,0,0,0,0,0,0,0,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,0,0,0,0,0,0,0,0,-2*K.1^4-2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1^6+2*K.1^-6,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^6-2*K.1^-6,2*K.1^6+2*K.1^-6,2*K.1^2+2*K.1^-2,0,0,0,0,0,0,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,2*K.1^5+2*K.1^-5,2*K.1^5+2*K.1^-5,-2*K.1^5-2*K.1^-5,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^5-2*K.1^-5,-2*K.1^3-2*K.1^-3,0,0,0,0,0,0,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,-2*K.1^2-2*K.1^-2,2*K.1^6+2*K.1^-6,2*K.1^2+2*K.1^-2,0,0,0,2*K.1^6+2*K.1^-6,0,0,0,-2*K.1^6-2*K.1^-6,0,-2*K.1^4-2*K.1^-4,0,0,-2*K.1^4-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2*K.1^5-2*K.1^-5,0,0,0,-2*K.1-2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1^5-2*K.1^-5,0,2*K.1^3+2*K.1^-3,0,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^5+2*K.1^-5,-2*K.1^3-2*K.1^-3,0,2*K.1+2*K.1^-1,0,0,0,-2*K.1^3-2*K.1^-3,0,2*K.1^5+2*K.1^-5,0,0]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,4,0,0,0,0,0,0,0,0,-4,4,-4,0,0,0,0,0,0,0,0,0,0,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,0,0,0,0,0,0,0,0,-2*K.1^2-2*K.1^-2,-2*K.1^6-2*K.1^-6,-2*K.1^4-2*K.1^-4,2*K.1^6+2*K.1^-6,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,-2*K.1^4-2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^6+2*K.1^-6,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,-2*K.1-2*K.1^-1,2*K.1+2*K.1^-1,-2*K.1-2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^5+2*K.1^-5,-2*K.1^5-2*K.1^-5,-2*K.1^3-2*K.1^-3,2*K.1^5+2*K.1^-5,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^5-2*K.1^-5,0,0,0,0,0,0,2*K.1^2+2*K.1^-2,-2*K.1^6-2*K.1^-6,2*K.1^6+2*K.1^-6,-2*K.1^4-2*K.1^-4,2*K.1^6+2*K.1^-6,0,0,0,2*K.1^4+2*K.1^-4,0,0,0,-2*K.1^4-2*K.1^-4,0,2*K.1^2+2*K.1^-2,0,0,-2*K.1^2-2*K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2*K.1-2*K.1^-1,0,0,0,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,0,2*K.1^5+2*K.1^-5,0,-2*K.1^5-2*K.1^-5,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^5-2*K.1^-5,0,2*K.1^3+2*K.1^-3,0,0,0,2*K.1^5+2*K.1^-5,0,-2*K.1-2*K.1^-1,0,0]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,4,0,0,0,0,0,0,0,0,-4,4,-4,0,0,0,0,0,0,0,0,0,0,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,0,0,0,0,0,0,0,0,-2*K.1^2-2*K.1^-2,-2*K.1^6-2*K.1^-6,-2*K.1^4-2*K.1^-4,2*K.1^6+2*K.1^-6,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,-2*K.1^4-2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^6+2*K.1^-6,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,2*K.1+2*K.1^-1,-2*K.1-2*K.1^-1,2*K.1+2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^5-2*K.1^-5,2*K.1^5+2*K.1^-5,2*K.1^3+2*K.1^-3,-2*K.1^5-2*K.1^-5,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1^5+2*K.1^-5,0,0,0,0,0,0,2*K.1^2+2*K.1^-2,-2*K.1^6-2*K.1^-6,2*K.1^6+2*K.1^-6,-2*K.1^4-2*K.1^-4,2*K.1^6+2*K.1^-6,0,0,0,2*K.1^4+2*K.1^-4,0,0,0,-2*K.1^4-2*K.1^-4,0,2*K.1^2+2*K.1^-2,0,0,-2*K.1^2-2*K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1+2*K.1^-1,0,0,0,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,0,-2*K.1^5-2*K.1^-5,0,2*K.1^5+2*K.1^-5,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1^5+2*K.1^-5,0,-2*K.1^3-2*K.1^-3,0,0,0,-2*K.1^5-2*K.1^-5,0,2*K.1+2*K.1^-1,0,0]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,4,0,0,0,0,0,0,0,0,-4,4,-4,0,0,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,-2*K.1^4-2*K.1^-4,2*K.1^6+2*K.1^-6,2*K.1^6+2*K.1^-6,2*K.1^2+2*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1^4-2*K.1^-4,0,0,0,0,0,0,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^5-2*K.1^-5,2*K.1^5+2*K.1^-5,-2*K.1-2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^5+2*K.1^-5,-2*K.1-2*K.1^-1,-2*K.1^5-2*K.1^-5,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,0,0,0,0,0,0,2*K.1^6+2*K.1^-6,2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,2*K.1^2+2*K.1^-2,-2*K.1^4-2*K.1^-4,0,0,0,-2*K.1^2-2*K.1^-2,0,0,0,2*K.1^2+2*K.1^-2,0,2*K.1^6+2*K.1^-6,0,0,-2*K.1^6-2*K.1^-6,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2*K.1^3-2*K.1^-3,0,0,0,2*K.1^5+2*K.1^-5,-2*K.1^5-2*K.1^-5,2*K.1^3+2*K.1^-3,0,-2*K.1-2*K.1^-1,0,2*K.1+2*K.1^-1,2*K.1^5+2*K.1^-5,2*K.1^3+2*K.1^-3,2*K.1+2*K.1^-1,0,-2*K.1^5-2*K.1^-5,0,0,0,-2*K.1-2*K.1^-1,0,-2*K.1^3-2*K.1^-3,0,0]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,4,0,0,0,0,0,0,0,0,-4,4,-4,0,0,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,-2*K.1^4-2*K.1^-4,2*K.1^6+2*K.1^-6,2*K.1^6+2*K.1^-6,2*K.1^2+2*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1^4-2*K.1^-4,0,0,0,0,0,0,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^5+2*K.1^-5,-2*K.1^5-2*K.1^-5,2*K.1+2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1^5-2*K.1^-5,2*K.1+2*K.1^-1,2*K.1^5+2*K.1^-5,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,0,0,0,0,0,0,2*K.1^6+2*K.1^-6,2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,2*K.1^2+2*K.1^-2,-2*K.1^4-2*K.1^-4,0,0,0,-2*K.1^2-2*K.1^-2,0,0,0,2*K.1^2+2*K.1^-2,0,2*K.1^6+2*K.1^-6,0,0,-2*K.1^6-2*K.1^-6,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1^3+2*K.1^-3,0,0,0,-2*K.1^5-2*K.1^-5,2*K.1^5+2*K.1^-5,-2*K.1^3-2*K.1^-3,0,2*K.1+2*K.1^-1,0,-2*K.1-2*K.1^-1,-2*K.1^5-2*K.1^-5,-2*K.1^3-2*K.1^-3,-2*K.1-2*K.1^-1,0,2*K.1^5+2*K.1^-5,0,0,0,2*K.1+2*K.1^-1,0,2*K.1^3+2*K.1^-3,0,0]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,4,0,0,0,0,0,0,0,0,-4,4,-4,0,0,0,0,0,0,0,0,0,0,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,0,0,0,0,0,0,0,0,2*K.1^4+2*K.1^-4,-2*K.1^2-2*K.1^-2,2*K.1^6+2*K.1^-6,2*K.1^2+2*K.1^-2,-2*K.1^4-2*K.1^-4,-2*K.1^4-2*K.1^-4,2*K.1^6+2*K.1^-6,-2*K.1^6-2*K.1^-6,2*K.1^2+2*K.1^-2,0,0,0,0,0,0,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,-2*K.1^5-2*K.1^-5,2*K.1^5+2*K.1^-5,-2*K.1^5-2*K.1^-5,-2*K.1-2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,2*K.1^5+2*K.1^-5,-2*K.1^3-2*K.1^-3,0,0,0,0,0,0,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^6+2*K.1^-6,2*K.1^2+2*K.1^-2,0,0,0,-2*K.1^6-2*K.1^-6,0,0,0,2*K.1^6+2*K.1^-6,0,-2*K.1^4-2*K.1^-4,0,0,2*K.1^4+2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2*K.1^5-2*K.1^-5,0,0,0,2*K.1+2*K.1^-1,-2*K.1-2*K.1^-1,2*K.1^5+2*K.1^-5,0,2*K.1^3+2*K.1^-3,0,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,2*K.1^5+2*K.1^-5,-2*K.1^3-2*K.1^-3,0,-2*K.1-2*K.1^-1,0,0,0,2*K.1^3+2*K.1^-3,0,-2*K.1^5-2*K.1^-5,0,0]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(28: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,4,0,0,0,0,0,0,0,0,-4,4,-4,0,0,0,0,0,0,0,0,0,0,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,-2*K.1^2-2*K.1^-2,0,0,0,0,0,0,0,0,2*K.1^4+2*K.1^-4,-2*K.1^2-2*K.1^-2,2*K.1^6+2*K.1^-6,2*K.1^2+2*K.1^-2,-2*K.1^4-2*K.1^-4,-2*K.1^4-2*K.1^-4,2*K.1^6+2*K.1^-6,-2*K.1^6-2*K.1^-6,2*K.1^2+2*K.1^-2,0,0,0,0,0,0,-2*K.1^2-2*K.1^-2,2*K.1^4+2*K.1^-4,-2*K.1^6-2*K.1^-6,2*K.1^5+2*K.1^-5,-2*K.1^5-2*K.1^-5,2*K.1^5+2*K.1^-5,2*K.1+2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^3-2*K.1^-3,2*K.1+2*K.1^-1,-2*K.1^5-2*K.1^-5,2*K.1^3+2*K.1^-3,0,0,0,0,0,0,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^6+2*K.1^-6,2*K.1^2+2*K.1^-2,0,0,0,-2*K.1^6-2*K.1^-6,0,0,0,2*K.1^6+2*K.1^-6,0,-2*K.1^4-2*K.1^-4,0,0,2*K.1^4+2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1^5+2*K.1^-5,0,0,0,-2*K.1-2*K.1^-1,2*K.1+2*K.1^-1,-2*K.1^5-2*K.1^-5,0,-2*K.1^3-2*K.1^-3,0,2*K.1^3+2*K.1^-3,-2*K.1-2*K.1^-1,-2*K.1^5-2*K.1^-5,2*K.1^3+2*K.1^-3,0,2*K.1+2*K.1^-1,0,0,0,-2*K.1^3-2*K.1^-3,0,2*K.1^5+2*K.1^-5,0,0]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 1;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,2-4*K.1^14,-2+4*K.1^14,2,2,-2,2-4*K.1^14,-2+4*K.1^14,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,0,0,0,0,0,0,0,0,2*K.1^6+2*K.1^-6,2*K.1^18+2*K.1^-18,-2*K.1^12-2*K.1^-12,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^6+2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^12-2*K.1^-12,2*K.1^18+2*K.1^-18,0,0,0,0,0,0,K.1^18+K.1^-18,K.1^6+K.1^-6,-1*K.1^12-K.1^-12,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^9-2*K.1^-9,-2*K.1^9-2*K.1^-9,-2*K.1^15-2*K.1^-15,-2*K.1^15-2*K.1^-15,2*K.1^9+2*K.1^-9,2*K.1^15+2*K.1^-15,2*K.1^9+2*K.1^-9,2*K.1^3+2*K.1^-3,2*K.1^15+2*K.1^-15,0,0,0,0,0,0,K.1^6+K.1^-6,-1*K.1^18-K.1^-18,K.1^18+K.1^-18,K.1^12+K.1^-12,-1*K.1^18-K.1^-18,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,K.1^12+K.1^-12,K.1^6-K.1^8-2*K.1^20-K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-1*K.1^12-K.1^-12,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1*K.1^6-K.1^-6,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1*K.1^6-K.1^-6,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^3-K.1^-3,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^9+K.1^-9,K.1^9+K.1^-9,-1*K.1^3-K.1^-3,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^15+K.1^-15,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1^15+K.1^-15,-1*K.1^9-K.1^-9,K.1^3+K.1^-3,-1*K.1^15-K.1^-15,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1^9-K.1^-9,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-1*K.1^15-K.1^-15,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,K.1^3+K.1^-3,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,-2+4*K.1^14,2-4*K.1^14,2,2,-2,-2+4*K.1^14,2-4*K.1^14,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,0,0,0,0,0,0,0,0,2*K.1^6+2*K.1^-6,2*K.1^18+2*K.1^-18,-2*K.1^12-2*K.1^-12,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^6+2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^12-2*K.1^-12,2*K.1^18+2*K.1^-18,0,0,0,0,0,0,K.1^18+K.1^-18,K.1^6+K.1^-6,-1*K.1^12-K.1^-12,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^9-2*K.1^-9,-2*K.1^9-2*K.1^-9,-2*K.1^15-2*K.1^-15,-2*K.1^15-2*K.1^-15,2*K.1^9+2*K.1^-9,2*K.1^15+2*K.1^-15,2*K.1^9+2*K.1^-9,2*K.1^3+2*K.1^-3,2*K.1^15+2*K.1^-15,0,0,0,0,0,0,K.1^6+K.1^-6,-1*K.1^18-K.1^-18,K.1^18+K.1^-18,K.1^12+K.1^-12,-1*K.1^18-K.1^-18,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,K.1^12+K.1^-12,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-1*K.1^12-K.1^-12,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1*K.1^6-K.1^-6,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1*K.1^6-K.1^-6,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^3-K.1^-3,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,K.1^9+K.1^-9,K.1^9+K.1^-9,-1*K.1^3-K.1^-3,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,K.1^15+K.1^-15,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,K.1^15+K.1^-15,-1*K.1^9-K.1^-9,K.1^3+K.1^-3,-1*K.1^15-K.1^-15,K.1^5-K.1^9+K.1^19+2*K.1^23,-1*K.1^9-K.1^-9,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^15-K.1^-15,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^3+K.1^-3,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,2-4*K.1^14,-2+4*K.1^14,2,2,-2,2-4*K.1^14,-2+4*K.1^14,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,0,0,0,0,0,0,0,0,2*K.1^6+2*K.1^-6,2*K.1^18+2*K.1^-18,-2*K.1^12-2*K.1^-12,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^6+2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^12-2*K.1^-12,2*K.1^18+2*K.1^-18,0,0,0,0,0,0,K.1^18+K.1^-18,K.1^6+K.1^-6,-1*K.1^12-K.1^-12,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^9+2*K.1^-9,2*K.1^9+2*K.1^-9,2*K.1^15+2*K.1^-15,2*K.1^15+2*K.1^-15,-2*K.1^9-2*K.1^-9,-2*K.1^15-2*K.1^-15,-2*K.1^9-2*K.1^-9,-2*K.1^3-2*K.1^-3,-2*K.1^15-2*K.1^-15,0,0,0,0,0,0,K.1^6+K.1^-6,-1*K.1^18-K.1^-18,K.1^18+K.1^-18,K.1^12+K.1^-12,-1*K.1^18-K.1^-18,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,K.1^12+K.1^-12,K.1^6-K.1^8-2*K.1^20-K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-1*K.1^12-K.1^-12,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1*K.1^6-K.1^-6,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1*K.1^6-K.1^-6,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^3+K.1^-3,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^9-K.1^-9,-1*K.1^9-K.1^-9,K.1^3+K.1^-3,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^15-K.1^-15,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1^15-K.1^-15,K.1^9+K.1^-9,-1*K.1^3-K.1^-3,K.1^15+K.1^-15,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1^9+K.1^-9,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,K.1^15+K.1^-15,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,-1*K.1^3-K.1^-3,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,-2+4*K.1^14,2-4*K.1^14,2,2,-2,-2+4*K.1^14,2-4*K.1^14,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,0,0,0,0,0,0,0,0,2*K.1^6+2*K.1^-6,2*K.1^18+2*K.1^-18,-2*K.1^12-2*K.1^-12,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^6+2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^12-2*K.1^-12,2*K.1^18+2*K.1^-18,0,0,0,0,0,0,K.1^18+K.1^-18,K.1^6+K.1^-6,-1*K.1^12-K.1^-12,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^9+2*K.1^-9,2*K.1^9+2*K.1^-9,2*K.1^15+2*K.1^-15,2*K.1^15+2*K.1^-15,-2*K.1^9-2*K.1^-9,-2*K.1^15-2*K.1^-15,-2*K.1^9-2*K.1^-9,-2*K.1^3-2*K.1^-3,-2*K.1^15-2*K.1^-15,0,0,0,0,0,0,K.1^6+K.1^-6,-1*K.1^18-K.1^-18,K.1^18+K.1^-18,K.1^12+K.1^-12,-1*K.1^18-K.1^-18,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,K.1^12+K.1^-12,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-1*K.1^12-K.1^-12,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1*K.1^6-K.1^-6,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1*K.1^6-K.1^-6,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^3+K.1^-3,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,-1*K.1^9-K.1^-9,-1*K.1^9-K.1^-9,K.1^3+K.1^-3,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,-1*K.1^15-K.1^-15,K.1^5-K.1^9+K.1^19+2*K.1^23,-1*K.1^15-K.1^-15,K.1^9+K.1^-9,-1*K.1^3-K.1^-3,K.1^15+K.1^-15,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,K.1^9+K.1^-9,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^15+K.1^-15,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^3-K.1^-3,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,2-4*K.1^14,-2+4*K.1^14,2,2,-2,2-4*K.1^14,-2+4*K.1^14,0,0,0,0,0,0,0,0,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,0,0,0,0,0,0,0,0,2*K.1^18+2*K.1^-18,-2*K.1^12-2*K.1^-12,2*K.1^6+2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,2*K.1^18+2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^6+2*K.1^-6,-2*K.1^12-2*K.1^-12,0,0,0,0,0,0,-1*K.1^12-K.1^-12,K.1^18+K.1^-18,K.1^6+K.1^-6,-2*K.1^9-2*K.1^-9,-2*K.1^9-2*K.1^-9,2*K.1^9+2*K.1^-9,2*K.1^15+2*K.1^-15,2*K.1^15+2*K.1^-15,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^15-2*K.1^-15,-2*K.1^3-2*K.1^-3,-2*K.1^15-2*K.1^-15,2*K.1^9+2*K.1^-9,-2*K.1^3-2*K.1^-3,0,0,0,0,0,0,K.1^18+K.1^-18,K.1^12+K.1^-12,-1*K.1^12-K.1^-12,-1*K.1^6-K.1^-6,K.1^12+K.1^-12,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-1*K.1^6-K.1^-6,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^6+K.1^-6,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-1*K.1^18-K.1^-18,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-1*K.1^18-K.1^-18,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^9-K.1^-9,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^15-K.1^-15,-1*K.1^15-K.1^-15,-1*K.1^9-K.1^-9,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^3-K.1^-3,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^3-K.1^-3,K.1^15+K.1^-15,K.1^9+K.1^-9,K.1^3+K.1^-3,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^15+K.1^-15,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1^3+K.1^-3,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^9+K.1^-9,K.1^5-K.1^9+K.1^19+2*K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,-2+4*K.1^14,2-4*K.1^14,2,2,-2,-2+4*K.1^14,2-4*K.1^14,0,0,0,0,0,0,0,0,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,0,0,0,0,0,0,0,0,2*K.1^18+2*K.1^-18,-2*K.1^12-2*K.1^-12,2*K.1^6+2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,2*K.1^18+2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^6+2*K.1^-6,-2*K.1^12-2*K.1^-12,0,0,0,0,0,0,-1*K.1^12-K.1^-12,K.1^18+K.1^-18,K.1^6+K.1^-6,-2*K.1^9-2*K.1^-9,-2*K.1^9-2*K.1^-9,2*K.1^9+2*K.1^-9,2*K.1^15+2*K.1^-15,2*K.1^15+2*K.1^-15,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^15-2*K.1^-15,-2*K.1^3-2*K.1^-3,-2*K.1^15-2*K.1^-15,2*K.1^9+2*K.1^-9,-2*K.1^3-2*K.1^-3,0,0,0,0,0,0,K.1^18+K.1^-18,K.1^12+K.1^-12,-1*K.1^12-K.1^-12,-1*K.1^6-K.1^-6,K.1^12+K.1^-12,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-1*K.1^6-K.1^-6,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^6+K.1^-6,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-1*K.1^18-K.1^-18,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-1*K.1^18-K.1^-18,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^9-K.1^-9,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-1*K.1^15-K.1^-15,-1*K.1^15-K.1^-15,-1*K.1^9-K.1^-9,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-1*K.1^3-K.1^-3,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,-1*K.1^3-K.1^-3,K.1^15+K.1^-15,K.1^9+K.1^-9,K.1^3+K.1^-3,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,K.1^15+K.1^-15,K.1^5-K.1^9+K.1^19+2*K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,K.1^3+K.1^-3,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,K.1^9+K.1^-9,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,2-4*K.1^14,-2+4*K.1^14,2,2,-2,2-4*K.1^14,-2+4*K.1^14,0,0,0,0,0,0,0,0,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,0,0,0,0,0,0,0,0,2*K.1^18+2*K.1^-18,-2*K.1^12-2*K.1^-12,2*K.1^6+2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,2*K.1^18+2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^6+2*K.1^-6,-2*K.1^12-2*K.1^-12,0,0,0,0,0,0,-1*K.1^12-K.1^-12,K.1^18+K.1^-18,K.1^6+K.1^-6,2*K.1^9+2*K.1^-9,2*K.1^9+2*K.1^-9,-2*K.1^9-2*K.1^-9,-2*K.1^15-2*K.1^-15,-2*K.1^15-2*K.1^-15,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^15+2*K.1^-15,2*K.1^3+2*K.1^-3,2*K.1^15+2*K.1^-15,-2*K.1^9-2*K.1^-9,2*K.1^3+2*K.1^-3,0,0,0,0,0,0,K.1^18+K.1^-18,K.1^12+K.1^-12,-1*K.1^12-K.1^-12,-1*K.1^6-K.1^-6,K.1^12+K.1^-12,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-1*K.1^6-K.1^-6,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^6+K.1^-6,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-1*K.1^18-K.1^-18,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-1*K.1^18-K.1^-18,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^9+K.1^-9,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^15+K.1^-15,K.1^15+K.1^-15,K.1^9+K.1^-9,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^3+K.1^-3,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^3+K.1^-3,-1*K.1^15-K.1^-15,-1*K.1^9-K.1^-9,-1*K.1^3-K.1^-3,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^15-K.1^-15,K.1^5-K.1^9+K.1^19+2*K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1^3-K.1^-3,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^9-K.1^-9,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,-2+4*K.1^14,2-4*K.1^14,2,2,-2,-2+4*K.1^14,2-4*K.1^14,0,0,0,0,0,0,0,0,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,0,0,0,0,0,0,0,0,2*K.1^18+2*K.1^-18,-2*K.1^12-2*K.1^-12,2*K.1^6+2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,2*K.1^18+2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^6+2*K.1^-6,-2*K.1^12-2*K.1^-12,0,0,0,0,0,0,-1*K.1^12-K.1^-12,K.1^18+K.1^-18,K.1^6+K.1^-6,2*K.1^9+2*K.1^-9,2*K.1^9+2*K.1^-9,-2*K.1^9-2*K.1^-9,-2*K.1^15-2*K.1^-15,-2*K.1^15-2*K.1^-15,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^15+2*K.1^-15,2*K.1^3+2*K.1^-3,2*K.1^15+2*K.1^-15,-2*K.1^9-2*K.1^-9,2*K.1^3+2*K.1^-3,0,0,0,0,0,0,K.1^18+K.1^-18,K.1^12+K.1^-12,-1*K.1^12-K.1^-12,-1*K.1^6-K.1^-6,K.1^12+K.1^-12,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-1*K.1^6-K.1^-6,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^6+K.1^-6,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-1*K.1^18-K.1^-18,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-1*K.1^18-K.1^-18,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^9+K.1^-9,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,K.1^15+K.1^-15,K.1^15+K.1^-15,K.1^9+K.1^-9,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,K.1^3+K.1^-3,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,K.1^3+K.1^-3,-1*K.1^15-K.1^-15,-1*K.1^9-K.1^-9,-1*K.1^3-K.1^-3,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,-1*K.1^15-K.1^-15,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23,-1*K.1^3-K.1^-3,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-1*K.1^9-K.1^-9,K.1^5-K.1^9+K.1^19+2*K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,2-4*K.1^14,-2+4*K.1^14,2,2,-2,2-4*K.1^14,-2+4*K.1^14,0,0,0,0,0,0,0,0,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,0,0,0,0,0,0,0,0,-2*K.1^12-2*K.1^-12,2*K.1^6+2*K.1^-6,2*K.1^18+2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^12-2*K.1^-12,-2*K.1^18-2*K.1^-18,2*K.1^18+2*K.1^-18,2*K.1^6+2*K.1^-6,0,0,0,0,0,0,K.1^6+K.1^-6,-1*K.1^12-K.1^-12,K.1^18+K.1^-18,-2*K.1^15-2*K.1^-15,-2*K.1^15-2*K.1^-15,2*K.1^15+2*K.1^-15,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^9-2*K.1^-9,-2*K.1^9-2*K.1^-9,-2*K.1^3-2*K.1^-3,2*K.1^9+2*K.1^-9,-2*K.1^3-2*K.1^-3,2*K.1^15+2*K.1^-15,2*K.1^9+2*K.1^-9,0,0,0,0,0,0,-1*K.1^12-K.1^-12,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^18-K.1^-18,-1*K.1^6-K.1^-6,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^18-K.1^-18,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,K.1^18+K.1^-18,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^12+K.1^-12,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^12+K.1^-12,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^15-K.1^-15,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^15-K.1^-15,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1^9+K.1^-9,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,K.1^9+K.1^-9,K.1^3+K.1^-3,K.1^15+K.1^-15,-1*K.1^9-K.1^-9,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^3+K.1^-3,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,-1*K.1^9-K.1^-9,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,K.1^15+K.1^-15,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,-2+4*K.1^14,2-4*K.1^14,2,2,-2,-2+4*K.1^14,2-4*K.1^14,0,0,0,0,0,0,0,0,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,0,0,0,0,0,0,0,0,-2*K.1^12-2*K.1^-12,2*K.1^6+2*K.1^-6,2*K.1^18+2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^12-2*K.1^-12,-2*K.1^18-2*K.1^-18,2*K.1^18+2*K.1^-18,2*K.1^6+2*K.1^-6,0,0,0,0,0,0,K.1^6+K.1^-6,-1*K.1^12-K.1^-12,K.1^18+K.1^-18,-2*K.1^15-2*K.1^-15,-2*K.1^15-2*K.1^-15,2*K.1^15+2*K.1^-15,2*K.1^3+2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^9-2*K.1^-9,-2*K.1^9-2*K.1^-9,-2*K.1^3-2*K.1^-3,2*K.1^9+2*K.1^-9,-2*K.1^3-2*K.1^-3,2*K.1^15+2*K.1^-15,2*K.1^9+2*K.1^-9,0,0,0,0,0,0,-1*K.1^12-K.1^-12,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^18-K.1^-18,-1*K.1^6-K.1^-6,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-1*K.1^18-K.1^-18,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,K.1^18+K.1^-18,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^12+K.1^-12,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^12+K.1^-12,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^15-K.1^-15,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1^3-K.1^-3,-1*K.1^3-K.1^-3,-1*K.1^15-K.1^-15,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,K.1^9+K.1^-9,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^9+K.1^-9,K.1^3+K.1^-3,K.1^15+K.1^-15,-1*K.1^9-K.1^-9,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,K.1^3+K.1^-3,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^9-K.1^-9,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1^15+K.1^-15,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,2-4*K.1^14,-2+4*K.1^14,2,2,-2,2-4*K.1^14,-2+4*K.1^14,0,0,0,0,0,0,0,0,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,0,0,0,0,0,0,0,0,-2*K.1^12-2*K.1^-12,2*K.1^6+2*K.1^-6,2*K.1^18+2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^12-2*K.1^-12,-2*K.1^18-2*K.1^-18,2*K.1^18+2*K.1^-18,2*K.1^6+2*K.1^-6,0,0,0,0,0,0,K.1^6+K.1^-6,-1*K.1^12-K.1^-12,K.1^18+K.1^-18,2*K.1^15+2*K.1^-15,2*K.1^15+2*K.1^-15,-2*K.1^15-2*K.1^-15,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^9+2*K.1^-9,2*K.1^9+2*K.1^-9,2*K.1^3+2*K.1^-3,-2*K.1^9-2*K.1^-9,2*K.1^3+2*K.1^-3,-2*K.1^15-2*K.1^-15,-2*K.1^9-2*K.1^-9,0,0,0,0,0,0,-1*K.1^12-K.1^-12,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^18-K.1^-18,-1*K.1^6-K.1^-6,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^18-K.1^-18,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,K.1^18+K.1^-18,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^12+K.1^-12,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^12+K.1^-12,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^15+K.1^-15,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^15+K.1^-15,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1^9-K.1^-9,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-1*K.1^9-K.1^-9,-1*K.1^3-K.1^-3,-1*K.1^15-K.1^-15,K.1^9+K.1^-9,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^3-K.1^-3,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,K.1^9+K.1^-9,K.1^5-K.1^9+K.1^19+2*K.1^23,-1*K.1^15-K.1^-15,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,-4,4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,-2+4*K.1^14,2-4*K.1^14,2,2,-2,-2+4*K.1^14,2-4*K.1^14,0,0,0,0,0,0,0,0,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,0,0,0,0,0,0,0,0,-2*K.1^12-2*K.1^-12,2*K.1^6+2*K.1^-6,2*K.1^18+2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^12-2*K.1^-12,-2*K.1^18-2*K.1^-18,2*K.1^18+2*K.1^-18,2*K.1^6+2*K.1^-6,0,0,0,0,0,0,K.1^6+K.1^-6,-1*K.1^12-K.1^-12,K.1^18+K.1^-18,2*K.1^15+2*K.1^-15,2*K.1^15+2*K.1^-15,-2*K.1^15-2*K.1^-15,-2*K.1^3-2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^9+2*K.1^-9,2*K.1^9+2*K.1^-9,2*K.1^3+2*K.1^-3,-2*K.1^9-2*K.1^-9,2*K.1^3+2*K.1^-3,-2*K.1^15-2*K.1^-15,-2*K.1^9-2*K.1^-9,0,0,0,0,0,0,-1*K.1^12-K.1^-12,-1*K.1^6-K.1^-6,K.1^6+K.1^-6,-1*K.1^18-K.1^-18,-1*K.1^6-K.1^-6,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-1*K.1^18-K.1^-18,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,K.1^18+K.1^-18,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^12+K.1^-12,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^12+K.1^-12,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^15+K.1^-15,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1^3+K.1^-3,K.1^3+K.1^-3,K.1^15+K.1^-15,K.1^5-K.1^9+K.1^19+2*K.1^23,-1*K.1^9-K.1^-9,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^9-K.1^-9,-1*K.1^3-K.1^-3,-1*K.1^15-K.1^-15,K.1^9+K.1^-9,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-1*K.1^3-K.1^-3,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^9+K.1^-9,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1^15-K.1^-15,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,2-4*K.1^14,-2+4*K.1^14,2,-2,2,-2+4*K.1^14,2-4*K.1^14,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,-2*K.1^18-2*K.1^-18,-2*K.1^12-2*K.1^-12,2*K.1^18+2*K.1^-18,2*K.1^6+2*K.1^-6,2*K.1^6+2*K.1^-6,-2*K.1^12-2*K.1^-12,2*K.1^12+2*K.1^-12,2*K.1^18+2*K.1^-18,0,0,0,0,0,0,K.1^18+K.1^-18,K.1^6+K.1^-6,-1*K.1^12-K.1^-12,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^9+2*K.1^-9,-2*K.1^9-2*K.1^-9,2*K.1^15+2*K.1^-15,-2*K.1^15-2*K.1^-15,-2*K.1^9-2*K.1^-9,2*K.1^15+2*K.1^-15,2*K.1^9+2*K.1^-9,2*K.1^3+2*K.1^-3,-2*K.1^15-2*K.1^-15,0,0,0,0,0,0,-1*K.1^6-K.1^-6,K.1^18+K.1^-18,-1*K.1^18-K.1^-18,K.1^12+K.1^-12,-1*K.1^18-K.1^-18,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1*K.1^12-K.1^-12,K.1^6-K.1^8-2*K.1^20-K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,K.1^12+K.1^-12,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1*K.1^6-K.1^-6,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,K.1^6+K.1^-6,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^3+K.1^-3,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,K.1^9+K.1^-9,-1*K.1^9-K.1^-9,-1*K.1^3-K.1^-3,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,-1*K.1^15-K.1^-15,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1^15+K.1^-15,K.1^9+K.1^-9,-1*K.1^3-K.1^-3,K.1^15+K.1^-15,K.1^5-K.1^9+K.1^19+2*K.1^23,-1*K.1^9-K.1^-9,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-1*K.1^15-K.1^-15,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^3+K.1^-3,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,-2+4*K.1^14,2-4*K.1^14,2,-2,2,2-4*K.1^14,-2+4*K.1^14,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,-2*K.1^18-2*K.1^-18,-2*K.1^12-2*K.1^-12,2*K.1^18+2*K.1^-18,2*K.1^6+2*K.1^-6,2*K.1^6+2*K.1^-6,-2*K.1^12-2*K.1^-12,2*K.1^12+2*K.1^-12,2*K.1^18+2*K.1^-18,0,0,0,0,0,0,K.1^18+K.1^-18,K.1^6+K.1^-6,-1*K.1^12-K.1^-12,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^9+2*K.1^-9,-2*K.1^9-2*K.1^-9,2*K.1^15+2*K.1^-15,-2*K.1^15-2*K.1^-15,-2*K.1^9-2*K.1^-9,2*K.1^15+2*K.1^-15,2*K.1^9+2*K.1^-9,2*K.1^3+2*K.1^-3,-2*K.1^15-2*K.1^-15,0,0,0,0,0,0,-1*K.1^6-K.1^-6,K.1^18+K.1^-18,-1*K.1^18-K.1^-18,K.1^12+K.1^-12,-1*K.1^18-K.1^-18,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1*K.1^12-K.1^-12,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,K.1^12+K.1^-12,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1*K.1^6-K.1^-6,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,K.1^6+K.1^-6,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^3+K.1^-3,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^9+K.1^-9,-1*K.1^9-K.1^-9,-1*K.1^3-K.1^-3,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^15-K.1^-15,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,K.1^15+K.1^-15,K.1^9+K.1^-9,-1*K.1^3-K.1^-3,K.1^15+K.1^-15,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1^9-K.1^-9,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^15-K.1^-15,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,K.1^3+K.1^-3,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,2-4*K.1^14,-2+4*K.1^14,2,-2,2,-2+4*K.1^14,2-4*K.1^14,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,-2*K.1^18-2*K.1^-18,-2*K.1^12-2*K.1^-12,2*K.1^18+2*K.1^-18,2*K.1^6+2*K.1^-6,2*K.1^6+2*K.1^-6,-2*K.1^12-2*K.1^-12,2*K.1^12+2*K.1^-12,2*K.1^18+2*K.1^-18,0,0,0,0,0,0,K.1^18+K.1^-18,K.1^6+K.1^-6,-1*K.1^12-K.1^-12,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^9-2*K.1^-9,2*K.1^9+2*K.1^-9,-2*K.1^15-2*K.1^-15,2*K.1^15+2*K.1^-15,2*K.1^9+2*K.1^-9,-2*K.1^15-2*K.1^-15,-2*K.1^9-2*K.1^-9,-2*K.1^3-2*K.1^-3,2*K.1^15+2*K.1^-15,0,0,0,0,0,0,-1*K.1^6-K.1^-6,K.1^18+K.1^-18,-1*K.1^18-K.1^-18,K.1^12+K.1^-12,-1*K.1^18-K.1^-18,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1*K.1^12-K.1^-12,K.1^6-K.1^8-2*K.1^20-K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,K.1^12+K.1^-12,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1*K.1^6-K.1^-6,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,K.1^6+K.1^-6,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^3-K.1^-3,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,-1*K.1^9-K.1^-9,K.1^9+K.1^-9,K.1^3+K.1^-3,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,K.1^15+K.1^-15,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1^15-K.1^-15,-1*K.1^9-K.1^-9,K.1^3+K.1^-3,-1*K.1^15-K.1^-15,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,K.1^9+K.1^-9,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,K.1^15+K.1^-15,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^3-K.1^-3,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,-2+4*K.1^14,2-4*K.1^14,2,-2,2,2-4*K.1^14,-2+4*K.1^14,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,0,0,0,0,0,0,0,0,-2*K.1^6-2*K.1^-6,-2*K.1^18-2*K.1^-18,-2*K.1^12-2*K.1^-12,2*K.1^18+2*K.1^-18,2*K.1^6+2*K.1^-6,2*K.1^6+2*K.1^-6,-2*K.1^12-2*K.1^-12,2*K.1^12+2*K.1^-12,2*K.1^18+2*K.1^-18,0,0,0,0,0,0,K.1^18+K.1^-18,K.1^6+K.1^-6,-1*K.1^12-K.1^-12,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,-2*K.1^9-2*K.1^-9,2*K.1^9+2*K.1^-9,-2*K.1^15-2*K.1^-15,2*K.1^15+2*K.1^-15,2*K.1^9+2*K.1^-9,-2*K.1^15-2*K.1^-15,-2*K.1^9-2*K.1^-9,-2*K.1^3-2*K.1^-3,2*K.1^15+2*K.1^-15,0,0,0,0,0,0,-1*K.1^6-K.1^-6,K.1^18+K.1^-18,-1*K.1^18-K.1^-18,K.1^12+K.1^-12,-1*K.1^18-K.1^-18,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1*K.1^12-K.1^-12,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,K.1^12+K.1^-12,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1*K.1^6-K.1^-6,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,K.1^6+K.1^-6,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^3-K.1^-3,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^9-K.1^-9,K.1^9+K.1^-9,K.1^3+K.1^-3,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^15+K.1^-15,K.1^5-K.1^9+K.1^19+2*K.1^23,-1*K.1^15-K.1^-15,-1*K.1^9-K.1^-9,K.1^3+K.1^-3,-1*K.1^15-K.1^-15,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1^9+K.1^-9,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^15+K.1^-15,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,-1*K.1^3-K.1^-3,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,2-4*K.1^14,-2+4*K.1^14,2,-2,2,-2+4*K.1^14,2-4*K.1^14,0,0,0,0,0,0,0,0,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,0,0,0,0,0,0,0,0,-2*K.1^18-2*K.1^-18,2*K.1^12+2*K.1^-12,2*K.1^6+2*K.1^-6,-2*K.1^12-2*K.1^-12,2*K.1^18+2*K.1^-18,2*K.1^18+2*K.1^-18,2*K.1^6+2*K.1^-6,-2*K.1^6-2*K.1^-6,-2*K.1^12-2*K.1^-12,0,0,0,0,0,0,-1*K.1^12-K.1^-12,K.1^18+K.1^-18,K.1^6+K.1^-6,-2*K.1^9-2*K.1^-9,2*K.1^9+2*K.1^-9,-2*K.1^9-2*K.1^-9,-2*K.1^15-2*K.1^-15,2*K.1^15+2*K.1^-15,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^15+2*K.1^-15,-2*K.1^3-2*K.1^-3,-2*K.1^15-2*K.1^-15,2*K.1^9+2*K.1^-9,2*K.1^3+2*K.1^-3,0,0,0,0,0,0,-1*K.1^18-K.1^-18,-1*K.1^12-K.1^-12,K.1^12+K.1^-12,-1*K.1^6-K.1^-6,K.1^12+K.1^-12,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,K.1^6+K.1^-6,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-1*K.1^6-K.1^-6,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-1*K.1^18-K.1^-18,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,K.1^18+K.1^-18,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^9+K.1^-9,K.1^5-K.1^9+K.1^19+2*K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-1*K.1^15-K.1^-15,K.1^15+K.1^-15,-1*K.1^9-K.1^-9,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,K.1^3+K.1^-3,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^3-K.1^-3,-1*K.1^15-K.1^-15,-1*K.1^9-K.1^-9,-1*K.1^3-K.1^-3,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,K.1^15+K.1^-15,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1^3+K.1^-3,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,K.1^9+K.1^-9,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,-2+4*K.1^14,2-4*K.1^14,2,-2,2,2-4*K.1^14,-2+4*K.1^14,0,0,0,0,0,0,0,0,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,0,0,0,0,0,0,0,0,-2*K.1^18-2*K.1^-18,2*K.1^12+2*K.1^-12,2*K.1^6+2*K.1^-6,-2*K.1^12-2*K.1^-12,2*K.1^18+2*K.1^-18,2*K.1^18+2*K.1^-18,2*K.1^6+2*K.1^-6,-2*K.1^6-2*K.1^-6,-2*K.1^12-2*K.1^-12,0,0,0,0,0,0,-1*K.1^12-K.1^-12,K.1^18+K.1^-18,K.1^6+K.1^-6,-2*K.1^9-2*K.1^-9,2*K.1^9+2*K.1^-9,-2*K.1^9-2*K.1^-9,-2*K.1^15-2*K.1^-15,2*K.1^15+2*K.1^-15,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^15+2*K.1^-15,-2*K.1^3-2*K.1^-3,-2*K.1^15-2*K.1^-15,2*K.1^9+2*K.1^-9,2*K.1^3+2*K.1^-3,0,0,0,0,0,0,-1*K.1^18-K.1^-18,-1*K.1^12-K.1^-12,K.1^12+K.1^-12,-1*K.1^6-K.1^-6,K.1^12+K.1^-12,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,K.1^6+K.1^-6,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^6-K.1^-6,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-1*K.1^18-K.1^-18,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,K.1^18+K.1^-18,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^9+K.1^-9,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^15-K.1^-15,K.1^15+K.1^-15,-1*K.1^9-K.1^-9,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^3+K.1^-3,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,-1*K.1^3-K.1^-3,-1*K.1^15-K.1^-15,-1*K.1^9-K.1^-9,-1*K.1^3-K.1^-3,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^15+K.1^-15,K.1^5-K.1^9+K.1^19+2*K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,K.1^3+K.1^-3,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^9+K.1^-9,K.1^5-K.1^9+K.1^19+2*K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,2-4*K.1^14,-2+4*K.1^14,2,-2,2,-2+4*K.1^14,2-4*K.1^14,0,0,0,0,0,0,0,0,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,0,0,0,0,0,0,0,0,-2*K.1^18-2*K.1^-18,2*K.1^12+2*K.1^-12,2*K.1^6+2*K.1^-6,-2*K.1^12-2*K.1^-12,2*K.1^18+2*K.1^-18,2*K.1^18+2*K.1^-18,2*K.1^6+2*K.1^-6,-2*K.1^6-2*K.1^-6,-2*K.1^12-2*K.1^-12,0,0,0,0,0,0,-1*K.1^12-K.1^-12,K.1^18+K.1^-18,K.1^6+K.1^-6,2*K.1^9+2*K.1^-9,-2*K.1^9-2*K.1^-9,2*K.1^9+2*K.1^-9,2*K.1^15+2*K.1^-15,-2*K.1^15-2*K.1^-15,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^15-2*K.1^-15,2*K.1^3+2*K.1^-3,2*K.1^15+2*K.1^-15,-2*K.1^9-2*K.1^-9,-2*K.1^3-2*K.1^-3,0,0,0,0,0,0,-1*K.1^18-K.1^-18,-1*K.1^12-K.1^-12,K.1^12+K.1^-12,-1*K.1^6-K.1^-6,K.1^12+K.1^-12,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,K.1^6+K.1^-6,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-1*K.1^6-K.1^-6,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-1*K.1^18-K.1^-18,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,K.1^18+K.1^-18,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^9-K.1^-9,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,K.1^15+K.1^-15,-1*K.1^15-K.1^-15,K.1^9+K.1^-9,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-1*K.1^3-K.1^-3,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^3+K.1^-3,K.1^15+K.1^-15,K.1^9+K.1^-9,K.1^3+K.1^-3,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,-1*K.1^15-K.1^-15,K.1^5-K.1^9+K.1^19+2*K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1^3-K.1^-3,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-1*K.1^9-K.1^-9,K.1^5-K.1^9+K.1^19+2*K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,-2+4*K.1^14,2-4*K.1^14,2,-2,2,2-4*K.1^14,-2+4*K.1^14,0,0,0,0,0,0,0,0,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,2*K.1^12+2*K.1^-12,0,0,0,0,0,0,0,0,-2*K.1^18-2*K.1^-18,2*K.1^12+2*K.1^-12,2*K.1^6+2*K.1^-6,-2*K.1^12-2*K.1^-12,2*K.1^18+2*K.1^-18,2*K.1^18+2*K.1^-18,2*K.1^6+2*K.1^-6,-2*K.1^6-2*K.1^-6,-2*K.1^12-2*K.1^-12,0,0,0,0,0,0,-1*K.1^12-K.1^-12,K.1^18+K.1^-18,K.1^6+K.1^-6,2*K.1^9+2*K.1^-9,-2*K.1^9-2*K.1^-9,2*K.1^9+2*K.1^-9,2*K.1^15+2*K.1^-15,-2*K.1^15-2*K.1^-15,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^15-2*K.1^-15,2*K.1^3+2*K.1^-3,2*K.1^15+2*K.1^-15,-2*K.1^9-2*K.1^-9,-2*K.1^3-2*K.1^-3,0,0,0,0,0,0,-1*K.1^18-K.1^-18,-1*K.1^12-K.1^-12,K.1^12+K.1^-12,-1*K.1^6-K.1^-6,K.1^12+K.1^-12,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,K.1^6+K.1^-6,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^6-K.1^-6,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-1*K.1^18-K.1^-18,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,K.1^18+K.1^-18,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^9-K.1^-9,K.1^5-K.1^9+K.1^19+2*K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^15+K.1^-15,-1*K.1^15-K.1^-15,K.1^9+K.1^-9,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^3-K.1^-3,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,K.1^3+K.1^-3,K.1^15+K.1^-15,K.1^9+K.1^-9,K.1^3+K.1^-3,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^15-K.1^-15,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23,-1*K.1^3-K.1^-3,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^9-K.1^-9,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,2-4*K.1^14,-2+4*K.1^14,2,-2,2,-2+4*K.1^14,2-4*K.1^14,0,0,0,0,0,0,0,0,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,0,0,0,0,0,0,0,0,2*K.1^12+2*K.1^-12,-2*K.1^6-2*K.1^-6,2*K.1^18+2*K.1^-18,2*K.1^6+2*K.1^-6,-2*K.1^12-2*K.1^-12,-2*K.1^12-2*K.1^-12,2*K.1^18+2*K.1^-18,-2*K.1^18-2*K.1^-18,2*K.1^6+2*K.1^-6,0,0,0,0,0,0,K.1^6+K.1^-6,-1*K.1^12-K.1^-12,K.1^18+K.1^-18,-2*K.1^15-2*K.1^-15,2*K.1^15+2*K.1^-15,-2*K.1^15-2*K.1^-15,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^9+2*K.1^-9,-2*K.1^9-2*K.1^-9,2*K.1^3+2*K.1^-3,2*K.1^9+2*K.1^-9,-2*K.1^3-2*K.1^-3,2*K.1^15+2*K.1^-15,-2*K.1^9-2*K.1^-9,0,0,0,0,0,0,K.1^12+K.1^-12,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^18-K.1^-18,-1*K.1^6-K.1^-6,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^18+K.1^-18,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1*K.1^18-K.1^-18,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^12+K.1^-12,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-1*K.1^12-K.1^-12,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^15+K.1^-15,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^15-K.1^-15,K.1^5-K.1^9+K.1^19+2*K.1^23,-1*K.1^9-K.1^-9,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,K.1^9+K.1^-9,-1*K.1^3-K.1^-3,-1*K.1^15-K.1^-15,K.1^9+K.1^-9,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,K.1^3+K.1^-3,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,-1*K.1^9-K.1^-9,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1^15+K.1^-15,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,-2+4*K.1^14,2-4*K.1^14,2,-2,2,2-4*K.1^14,-2+4*K.1^14,0,0,0,0,0,0,0,0,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,0,0,0,0,0,0,0,0,2*K.1^12+2*K.1^-12,-2*K.1^6-2*K.1^-6,2*K.1^18+2*K.1^-18,2*K.1^6+2*K.1^-6,-2*K.1^12-2*K.1^-12,-2*K.1^12-2*K.1^-12,2*K.1^18+2*K.1^-18,-2*K.1^18-2*K.1^-18,2*K.1^6+2*K.1^-6,0,0,0,0,0,0,K.1^6+K.1^-6,-1*K.1^12-K.1^-12,K.1^18+K.1^-18,-2*K.1^15-2*K.1^-15,2*K.1^15+2*K.1^-15,-2*K.1^15-2*K.1^-15,-2*K.1^3-2*K.1^-3,2*K.1^3+2*K.1^-3,2*K.1^9+2*K.1^-9,-2*K.1^9-2*K.1^-9,2*K.1^3+2*K.1^-3,2*K.1^9+2*K.1^-9,-2*K.1^3-2*K.1^-3,2*K.1^15+2*K.1^-15,-2*K.1^9-2*K.1^-9,0,0,0,0,0,0,K.1^12+K.1^-12,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^18-K.1^-18,-1*K.1^6-K.1^-6,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^18+K.1^-18,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1*K.1^18-K.1^-18,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^12+K.1^-12,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^12-K.1^-12,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^15+K.1^-15,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23,-1*K.1^3-K.1^-3,K.1^3+K.1^-3,-1*K.1^15-K.1^-15,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1^9-K.1^-9,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^9+K.1^-9,-1*K.1^3-K.1^-3,-1*K.1^15-K.1^-15,K.1^9+K.1^-9,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,K.1^3+K.1^-3,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1^9-K.1^-9,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,K.1^15+K.1^-15,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,2-4*K.1^14,-2+4*K.1^14,2,-2,2,-2+4*K.1^14,2-4*K.1^14,0,0,0,0,0,0,0,0,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,0,0,0,0,0,0,0,0,2*K.1^12+2*K.1^-12,-2*K.1^6-2*K.1^-6,2*K.1^18+2*K.1^-18,2*K.1^6+2*K.1^-6,-2*K.1^12-2*K.1^-12,-2*K.1^12-2*K.1^-12,2*K.1^18+2*K.1^-18,-2*K.1^18-2*K.1^-18,2*K.1^6+2*K.1^-6,0,0,0,0,0,0,K.1^6+K.1^-6,-1*K.1^12-K.1^-12,K.1^18+K.1^-18,2*K.1^15+2*K.1^-15,-2*K.1^15-2*K.1^-15,2*K.1^15+2*K.1^-15,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^9-2*K.1^-9,2*K.1^9+2*K.1^-9,-2*K.1^3-2*K.1^-3,-2*K.1^9-2*K.1^-9,2*K.1^3+2*K.1^-3,-2*K.1^15-2*K.1^-15,2*K.1^9+2*K.1^-9,0,0,0,0,0,0,K.1^12+K.1^-12,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^18-K.1^-18,-1*K.1^6-K.1^-6,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^18+K.1^-18,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1*K.1^18-K.1^-18,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^12+K.1^-12,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,-1*K.1^12-K.1^-12,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^15-K.1^-15,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^15+K.1^-15,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,K.1^9+K.1^-9,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-1*K.1^9-K.1^-9,K.1^3+K.1^-3,K.1^15+K.1^-15,-1*K.1^9-K.1^-9,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-1*K.1^3-K.1^-3,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,K.1^9+K.1^-9,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1^15-K.1^-15,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
K := CyclotomicField(84: Sparse := true);
S := [ K |4,-4,4,-4,0,0,0,0,0,0,0,0,-2,0,0,0,0,0,0,-2+4*K.1^14,2-4*K.1^14,2,-2,2,2-4*K.1^14,-2+4*K.1^14,0,0,0,0,0,0,0,0,2*K.1^12+2*K.1^-12,-2*K.1^18-2*K.1^-18,-2*K.1^6-2*K.1^-6,0,0,0,0,0,0,0,0,2*K.1^12+2*K.1^-12,-2*K.1^6-2*K.1^-6,2*K.1^18+2*K.1^-18,2*K.1^6+2*K.1^-6,-2*K.1^12-2*K.1^-12,-2*K.1^12-2*K.1^-12,2*K.1^18+2*K.1^-18,-2*K.1^18-2*K.1^-18,2*K.1^6+2*K.1^-6,0,0,0,0,0,0,K.1^6+K.1^-6,-1*K.1^12-K.1^-12,K.1^18+K.1^-18,2*K.1^15+2*K.1^-15,-2*K.1^15-2*K.1^-15,2*K.1^15+2*K.1^-15,2*K.1^3+2*K.1^-3,-2*K.1^3-2*K.1^-3,-2*K.1^9-2*K.1^-9,2*K.1^9+2*K.1^-9,-2*K.1^3-2*K.1^-3,-2*K.1^9-2*K.1^-9,2*K.1^3+2*K.1^-3,-2*K.1^15-2*K.1^-15,2*K.1^9+2*K.1^-9,0,0,0,0,0,0,K.1^12+K.1^-12,K.1^6+K.1^-6,-1*K.1^6-K.1^-6,-1*K.1^18-K.1^-18,-1*K.1^6-K.1^-6,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,1+K.1^2-2*K.1^4-K.1^6-K.1^8+2*K.1^10+K.1^12-K.1^16+K.1^22,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^18+K.1^-18,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1-K.1^2+2*K.1^4+K.1^6+K.1^8-2*K.1^10-K.1^12+K.1^16-K.1^22,-1*K.1^18-K.1^-18,K.1^6-K.1^8-2*K.1^20-K.1^22,K.1^12+K.1^-12,-1*K.1^6+K.1^8+2*K.1^20+K.1^22,K.1^6-K.1^8-2*K.1^20-K.1^22,-1*K.1^12-K.1^-12,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,2+K.1^2-2*K.1^4-2*K.1^6+2*K.1^10+K.1^12-2*K.1^14-K.1^16+2*K.1^20+2*K.1^22,-2-K.1^2+2*K.1^4+2*K.1^6-2*K.1^10-K.1^12+2*K.1^14+K.1^16-2*K.1^20-2*K.1^22,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^15-K.1^-15,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,-1*K.1^5+K.1^9-K.1^19-2*K.1^23,K.1^3+K.1^-3,-1*K.1^3-K.1^-3,K.1^15+K.1^-15,K.1^5-K.1^9+K.1^19+2*K.1^23,K.1^9+K.1^-9,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^9-K.1^-9,K.1^3+K.1^-3,K.1^15+K.1^-15,-1*K.1^9-K.1^-9,K.1+2*K.1^3-K.1^7-K.1^9-K.1^11+K.1^13-3*K.1^17-K.1^19+K.1^23,-1*K.1^3-K.1^-3,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23,-3*K.1+K.1^5+K.1^7-K.1^11+K.1^13+2*K.1^15+K.1^17-K.1^21-K.1^23,K.1^9+K.1^-9,K.1^5-K.1^9+K.1^19+2*K.1^23,-1*K.1^15-K.1^-15,3*K.1-K.1^5-K.1^7+K.1^11-K.1^13-2*K.1^15-K.1^17+K.1^21+K.1^23,-1*K.1-2*K.1^3+K.1^7+K.1^9+K.1^11-K.1^13+3*K.1^17+K.1^19-K.1^23]; 
x := CR!S; 
x`IsCharacter := true;
x`Schur := 0;
x`IsIrreducible := true; 
_ := CharacterTable(G : Check := 0); 
chartbl_1344_8738:= KnownIrreducibles(CR);