Properties

Label 43T2
Degree $43$
Order $86$
Cyclic no
Abelian no
Solvable yes
Primitive yes
$p$-group no
Group: $D_{43}$

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Show commands: Magma

magma: G := TransitiveGroup(43, 2);
 

Group action invariants

Degree $n$:  $43$
magma: t, n := TransitiveGroupIdentification(G); n;
 
Transitive number $t$:  $2$
magma: t, n := TransitiveGroupIdentification(G); t;
 
Group:  $D_{43}$
Parity:  $-1$
magma: IsEven(G);
 
Primitive:  yes
magma: IsPrimitive(G);
 
magma: NilpotencyClass(G);
 
$\card{\Aut(F/K)}$:  $1$
magma: Order(Centralizer(SymmetricGroup(n), G));
 
Generators:  (1,42)(2,41)(3,40)(4,39)(5,38)(6,37)(7,36)(8,35)(9,34)(10,33)(11,32)(12,31)(13,30)(14,29)(15,28)(16,27)(17,26)(18,25)(19,24)(20,23)(21,22), (1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16,17,18,19,20,21,22,23,24,25,26,27,28,29,30,31,32,33,34,35,36,37,38,39,40,41,42,43)
magma: Generators(G);
 

Low degree resolvents

|G/N|Galois groups for stem field(s)
$2$:  $C_2$

Resolvents shown for degrees $\leq 47$

Subfields

Prime degree - none

Low degree siblings

There are no siblings with degree $\leq 47$
A number field with this Galois group has no arithmetically equivalent fields.

Conjugacy classes

LabelCycle TypeSizeOrderRepresentative
$ 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1 $ $1$ $1$ $()$
$ 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 1 $ $43$ $2$ $( 2,43)( 3,42)( 4,41)( 5,40)( 6,39)( 7,38)( 8,37)( 9,36)(10,35)(11,34)(12,33) (13,32)(14,31)(15,30)(16,29)(17,28)(18,27)(19,26)(20,25)(21,24)(22,23)$
$ 43 $ $2$ $43$ $( 1, 2, 3, 4, 5, 6, 7, 8, 9,10,11,12,13,14,15,16,17,18,19,20,21,22,23,24,25, 26,27,28,29,30,31,32,33,34,35,36,37,38,39,40,41,42,43)$
$ 43 $ $2$ $43$ $( 1, 3, 5, 7, 9,11,13,15,17,19,21,23,25,27,29,31,33,35,37,39,41,43, 2, 4, 6, 8,10,12,14,16,18,20,22,24,26,28,30,32,34,36,38,40,42)$
$ 43 $ $2$ $43$ $( 1, 4, 7,10,13,16,19,22,25,28,31,34,37,40,43, 3, 6, 9,12,15,18,21,24,27,30, 33,36,39,42, 2, 5, 8,11,14,17,20,23,26,29,32,35,38,41)$
$ 43 $ $2$ $43$ $( 1, 5, 9,13,17,21,25,29,33,37,41, 2, 6,10,14,18,22,26,30,34,38,42, 3, 7,11, 15,19,23,27,31,35,39,43, 4, 8,12,16,20,24,28,32,36,40)$
$ 43 $ $2$ $43$ $( 1, 6,11,16,21,26,31,36,41, 3, 8,13,18,23,28,33,38,43, 5,10,15,20,25,30,35, 40, 2, 7,12,17,22,27,32,37,42, 4, 9,14,19,24,29,34,39)$
$ 43 $ $2$ $43$ $( 1, 7,13,19,25,31,37,43, 6,12,18,24,30,36,42, 5,11,17,23,29,35,41, 4,10,16, 22,28,34,40, 3, 9,15,21,27,33,39, 2, 8,14,20,26,32,38)$
$ 43 $ $2$ $43$ $( 1, 8,15,22,29,36,43, 7,14,21,28,35,42, 6,13,20,27,34,41, 5,12,19,26,33,40, 4,11,18,25,32,39, 3,10,17,24,31,38, 2, 9,16,23,30,37)$
$ 43 $ $2$ $43$ $( 1, 9,17,25,33,41, 6,14,22,30,38, 3,11,19,27,35,43, 8,16,24,32,40, 5,13,21, 29,37, 2,10,18,26,34,42, 7,15,23,31,39, 4,12,20,28,36)$
$ 43 $ $2$ $43$ $( 1,10,19,28,37, 3,12,21,30,39, 5,14,23,32,41, 7,16,25,34,43, 9,18,27,36, 2, 11,20,29,38, 4,13,22,31,40, 6,15,24,33,42, 8,17,26,35)$
$ 43 $ $2$ $43$ $( 1,11,21,31,41, 8,18,28,38, 5,15,25,35, 2,12,22,32,42, 9,19,29,39, 6,16,26, 36, 3,13,23,33,43,10,20,30,40, 7,17,27,37, 4,14,24,34)$
$ 43 $ $2$ $43$ $( 1,12,23,34, 2,13,24,35, 3,14,25,36, 4,15,26,37, 5,16,27,38, 6,17,28,39, 7, 18,29,40, 8,19,30,41, 9,20,31,42,10,21,32,43,11,22,33)$
$ 43 $ $2$ $43$ $( 1,13,25,37, 6,18,30,42,11,23,35, 4,16,28,40, 9,21,33, 2,14,26,38, 7,19,31, 43,12,24,36, 5,17,29,41,10,22,34, 3,15,27,39, 8,20,32)$
$ 43 $ $2$ $43$ $( 1,14,27,40,10,23,36, 6,19,32, 2,15,28,41,11,24,37, 7,20,33, 3,16,29,42,12, 25,38, 8,21,34, 4,17,30,43,13,26,39, 9,22,35, 5,18,31)$
$ 43 $ $2$ $43$ $( 1,15,29,43,14,28,42,13,27,41,12,26,40,11,25,39,10,24,38, 9,23,37, 8,22,36, 7,21,35, 6,20,34, 5,19,33, 4,18,32, 3,17,31, 2,16,30)$
$ 43 $ $2$ $43$ $( 1,16,31, 3,18,33, 5,20,35, 7,22,37, 9,24,39,11,26,41,13,28,43,15,30, 2,17, 32, 4,19,34, 6,21,36, 8,23,38,10,25,40,12,27,42,14,29)$
$ 43 $ $2$ $43$ $( 1,17,33, 6,22,38,11,27,43,16,32, 5,21,37,10,26,42,15,31, 4,20,36, 9,25,41, 14,30, 3,19,35, 8,24,40,13,29, 2,18,34, 7,23,39,12,28)$
$ 43 $ $2$ $43$ $( 1,18,35, 9,26,43,17,34, 8,25,42,16,33, 7,24,41,15,32, 6,23,40,14,31, 5,22, 39,13,30, 4,21,38,12,29, 3,20,37,11,28, 2,19,36,10,27)$
$ 43 $ $2$ $43$ $( 1,19,37,12,30, 5,23,41,16,34, 9,27, 2,20,38,13,31, 6,24,42,17,35,10,28, 3, 21,39,14,32, 7,25,43,18,36,11,29, 4,22,40,15,33, 8,26)$
$ 43 $ $2$ $43$ $( 1,20,39,15,34,10,29, 5,24,43,19,38,14,33, 9,28, 4,23,42,18,37,13,32, 8,27, 3,22,41,17,36,12,31, 7,26, 2,21,40,16,35,11,30, 6,25)$
$ 43 $ $2$ $43$ $( 1,21,41,18,38,15,35,12,32, 9,29, 6,26, 3,23,43,20,40,17,37,14,34,11,31, 8, 28, 5,25, 2,22,42,19,39,16,36,13,33,10,30, 7,27, 4,24)$
$ 43 $ $2$ $43$ $( 1,22,43,21,42,20,41,19,40,18,39,17,38,16,37,15,36,14,35,13,34,12,33,11,32, 10,31, 9,30, 8,29, 7,28, 6,27, 5,26, 4,25, 3,24, 2,23)$

magma: ConjugacyClasses(G);
 

Group invariants

Order:  $86=2 \cdot 43$
magma: Order(G);
 
Cyclic:  no
magma: IsCyclic(G);
 
Abelian:  no
magma: IsAbelian(G);
 
Solvable:  yes
magma: IsSolvable(G);
 
Nilpotency class:   not nilpotent
Label:  86.1
magma: IdentifyGroup(G);
 
Character table:

1A 2A 43A1 43A2 43A3 43A4 43A5 43A6 43A7 43A8 43A9 43A10 43A11 43A12 43A13 43A14 43A15 43A16 43A17 43A18 43A19 43A20 43A21
Size 1 43 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2
2 P 1A 1A 43A4 43A5 43A1 43A18 43A19 43A13 43A14 43A8 43A16 43A15 43A21 43A20 43A17 43A7 43A6 43A12 43A11 43A9 43A2 43A3 43A10
43 P 1A 2A 43A6 43A14 43A20 43A16 43A7 43A2 43A21 43A12 43A19 43A1 43A10 43A13 43A4 43A11 43A9 43A18 43A5 43A8 43A3 43A17 43A15
Type
86.1.1a R 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1
86.1.1b R 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1
86.1.2a1 R 2 0 ζ4321+ζ4321 ζ431+ζ43 ζ4320+ζ4320 ζ432+ζ432 ζ4319+ζ4319 ζ433+ζ433 ζ4318+ζ4318 ζ434+ζ434 ζ4317+ζ4317 ζ435+ζ435 ζ4316+ζ4316 ζ436+ζ436 ζ4315+ζ4315 ζ437+ζ437 ζ4314+ζ4314 ζ438+ζ438 ζ4313+ζ4313 ζ439+ζ439 ζ4312+ζ4312 ζ4310+ζ4310 ζ4311+ζ4311
86.1.2a2 R 2 0 ζ4320+ζ4320 ζ433+ζ433 ζ4317+ζ4317 ζ436+ζ436 ζ4314+ζ4314 ζ439+ζ439 ζ4311+ζ4311 ζ4312+ζ4312 ζ438+ζ438 ζ4315+ζ4315 ζ435+ζ435 ζ4318+ζ4318 ζ432+ζ432 ζ4321+ζ4321 ζ431+ζ43 ζ4319+ζ4319 ζ434+ζ434 ζ4316+ζ4316 ζ437+ζ437 ζ4313+ζ4313 ζ4310+ζ4310
86.1.2a3 R 2 0 ζ4319+ζ4319 ζ435+ζ435 ζ4314+ζ4314 ζ4310+ζ4310 ζ439+ζ439 ζ4315+ζ4315 ζ434+ζ434 ζ4320+ζ4320 ζ431+ζ43 ζ4318+ζ4318 ζ436+ζ436 ζ4313+ζ4313 ζ4311+ζ4311 ζ438+ζ438 ζ4316+ζ4316 ζ433+ζ433 ζ4321+ζ4321 ζ432+ζ432 ζ4317+ζ4317 ζ437+ζ437 ζ4312+ζ4312
86.1.2a4 R 2 0 ζ4318+ζ4318 ζ437+ζ437 ζ4311+ζ4311 ζ4314+ζ4314 ζ434+ζ434 ζ4321+ζ4321 ζ433+ζ433 ζ4315+ζ4315 ζ4310+ζ4310 ζ438+ζ438 ζ4317+ζ4317 ζ431+ζ43 ζ4319+ζ4319 ζ436+ζ436 ζ4312+ζ4312 ζ4313+ζ4313 ζ435+ζ435 ζ4320+ζ4320 ζ432+ζ432 ζ4316+ζ4316 ζ439+ζ439
86.1.2a5 R 2 0 ζ4317+ζ4317 ζ439+ζ439 ζ438+ζ438 ζ4318+ζ4318 ζ431+ζ43 ζ4316+ζ4316 ζ4310+ζ4310 ζ437+ζ437 ζ4319+ζ4319 ζ432+ζ432 ζ4315+ζ4315 ζ4311+ζ4311 ζ436+ζ436 ζ4320+ζ4320 ζ433+ζ433 ζ4314+ζ4314 ζ4312+ζ4312 ζ435+ζ435 ζ4321+ζ4321 ζ434+ζ434 ζ4313+ζ4313
86.1.2a6 R 2 0 ζ4316+ζ4316 ζ4311+ζ4311 ζ435+ζ435 ζ4321+ζ4321 ζ436+ζ436 ζ4310+ζ4310 ζ4317+ζ4317 ζ431+ζ43 ζ4315+ζ4315 ζ4312+ζ4312 ζ434+ζ434 ζ4320+ζ4320 ζ437+ζ437 ζ439+ζ439 ζ4318+ζ4318 ζ432+ζ432 ζ4314+ζ4314 ζ4313+ζ4313 ζ433+ζ433 ζ4319+ζ4319 ζ438+ζ438
86.1.2a7 R 2 0 ζ4315+ζ4315 ζ4313+ζ4313 ζ432+ζ432 ζ4317+ζ4317 ζ4311+ζ4311 ζ434+ζ434 ζ4319+ζ4319 ζ439+ζ439 ζ436+ζ436 ζ4321+ζ4321 ζ437+ζ437 ζ438+ζ438 ζ4320+ζ4320 ζ435+ζ435 ζ4310+ζ4310 ζ4318+ζ4318 ζ433+ζ433 ζ4312+ζ4312 ζ4316+ζ4316 ζ431+ζ43 ζ4314+ζ4314
86.1.2a8 R 2 0 ζ4314+ζ4314 ζ4315+ζ4315 ζ431+ζ43 ζ4313+ζ4313 ζ4316+ζ4316 ζ432+ζ432 ζ4312+ζ4312 ζ4317+ζ4317 ζ433+ζ433 ζ4311+ζ4311 ζ4318+ζ4318 ζ434+ζ434 ζ4310+ζ4310 ζ4319+ζ4319 ζ435+ζ435 ζ439+ζ439 ζ4320+ζ4320 ζ436+ζ436 ζ438+ζ438 ζ4321+ζ4321 ζ437+ζ437
86.1.2a9 R 2 0 ζ4313+ζ4313 ζ4317+ζ4317 ζ434+ζ434 ζ439+ζ439 ζ4321+ζ4321 ζ438+ζ438 ζ435+ζ435 ζ4318+ζ4318 ζ4312+ζ4312 ζ431+ζ43 ζ4314+ζ4314 ζ4316+ζ4316 ζ433+ζ433 ζ4310+ζ4310 ζ4320+ζ4320 ζ437+ζ437 ζ436+ζ436 ζ4319+ζ4319 ζ4311+ζ4311 ζ432+ζ432 ζ4315+ζ4315
86.1.2a10 R 2 0 ζ4312+ζ4312 ζ4319+ζ4319 ζ437+ζ437 ζ435+ζ435 ζ4317+ζ4317 ζ4314+ζ4314 ζ432+ζ432 ζ4310+ζ4310 ζ4321+ζ4321 ζ439+ζ439 ζ433+ζ433 ζ4315+ζ4315 ζ4316+ζ4316 ζ434+ζ434 ζ438+ζ438 ζ4320+ζ4320 ζ4311+ζ4311 ζ431+ζ43 ζ4313+ζ4313 ζ4318+ζ4318 ζ436+ζ436
86.1.2a11 R 2 0 ζ4311+ζ4311 ζ4321+ζ4321 ζ4310+ζ4310 ζ431+ζ43 ζ4312+ζ4312 ζ4320+ζ4320 ζ439+ζ439 ζ432+ζ432 ζ4313+ζ4313 ζ4319+ζ4319 ζ438+ζ438 ζ433+ζ433 ζ4314+ζ4314 ζ4318+ζ4318 ζ437+ζ437 ζ434+ζ434 ζ4315+ζ4315 ζ4317+ζ4317 ζ436+ζ436 ζ435+ζ435 ζ4316+ζ4316
86.1.2a12 R 2 0 ζ4310+ζ4310 ζ4320+ζ4320 ζ4313+ζ4313 ζ433+ζ433 ζ437+ζ437 ζ4317+ζ4317 ζ4316+ζ4316 ζ436+ζ436 ζ434+ζ434 ζ4314+ζ4314 ζ4319+ζ4319 ζ439+ζ439 ζ431+ζ43 ζ4311+ζ4311 ζ4321+ζ4321 ζ4312+ζ4312 ζ432+ζ432 ζ438+ζ438 ζ4318+ζ4318 ζ4315+ζ4315 ζ435+ζ435
86.1.2a13 R 2 0 ζ439+ζ439 ζ4318+ζ4318 ζ4316+ζ4316 ζ437+ζ437 ζ432+ζ432 ζ4311+ζ4311 ζ4320+ζ4320 ζ4314+ζ4314 ζ435+ζ435 ζ434+ζ434 ζ4313+ζ4313 ζ4321+ζ4321 ζ4312+ζ4312 ζ433+ζ433 ζ436+ζ436 ζ4315+ζ4315 ζ4319+ζ4319 ζ4310+ζ4310 ζ431+ζ43 ζ438+ζ438 ζ4317+ζ4317
86.1.2a14 R 2 0 ζ438+ζ438 ζ4316+ζ4316 ζ4319+ζ4319 ζ4311+ζ4311 ζ433+ζ433 ζ435+ζ435 ζ4313+ζ4313 ζ4321+ζ4321 ζ4314+ζ4314 ζ436+ζ436 ζ432+ζ432 ζ4310+ζ4310 ζ4318+ζ4318 ζ4317+ζ4317 ζ439+ζ439 ζ431+ζ43 ζ437+ζ437 ζ4315+ζ4315 ζ4320+ζ4320 ζ4312+ζ4312 ζ434+ζ434
86.1.2a15 R 2 0 ζ437+ζ437 ζ4314+ζ4314 ζ4321+ζ4321 ζ4315+ζ4315 ζ438+ζ438 ζ431+ζ43 ζ436+ζ436 ζ4313+ζ4313 ζ4320+ζ4320 ζ4316+ζ4316 ζ439+ζ439 ζ432+ζ432 ζ435+ζ435 ζ4312+ζ4312 ζ4319+ζ4319 ζ4317+ζ4317 ζ4310+ζ4310 ζ433+ζ433 ζ434+ζ434 ζ4311+ζ4311 ζ4318+ζ4318
86.1.2a16 R 2 0 ζ436+ζ436 ζ4312+ζ4312 ζ4318+ζ4318 ζ4319+ζ4319 ζ4313+ζ4313 ζ437+ζ437 ζ431+ζ43 ζ435+ζ435 ζ4311+ζ4311 ζ4317+ζ4317 ζ4320+ζ4320 ζ4314+ζ4314 ζ438+ζ438 ζ432+ζ432 ζ434+ζ434 ζ4310+ζ4310 ζ4316+ζ4316 ζ4321+ζ4321 ζ4315+ζ4315 ζ439+ζ439 ζ433+ζ433
86.1.2a17 R 2 0 ζ435+ζ435 ζ4310+ζ4310 ζ4315+ζ4315 ζ4320+ζ4320 ζ4318+ζ4318 ζ4313+ζ4313 ζ438+ζ438 ζ433+ζ433 ζ432+ζ432 ζ437+ζ437 ζ4312+ζ4312 ζ4317+ζ4317 ζ4321+ζ4321 ζ4316+ζ4316 ζ4311+ζ4311 ζ436+ζ436 ζ431+ζ43 ζ434+ζ434 ζ439+ζ439 ζ4314+ζ4314 ζ4319+ζ4319
86.1.2a18 R 2 0 ζ434+ζ434 ζ438+ζ438 ζ4312+ζ4312 ζ4316+ζ4316 ζ4320+ζ4320 ζ4319+ζ4319 ζ4315+ζ4315 ζ4311+ζ4311 ζ437+ζ437 ζ433+ζ433 ζ431+ζ43 ζ435+ζ435 ζ439+ζ439 ζ4313+ζ4313 ζ4317+ζ4317 ζ4321+ζ4321 ζ4318+ζ4318 ζ4314+ζ4314 ζ4310+ζ4310 ζ436+ζ436 ζ432+ζ432
86.1.2a19 R 2 0 ζ433+ζ433 ζ436+ζ436 ζ439+ζ439 ζ4312+ζ4312 ζ4315+ζ4315 ζ4318+ζ4318 ζ4321+ζ4321 ζ4319+ζ4319 ζ4316+ζ4316 ζ4313+ζ4313 ζ4310+ζ4310 ζ437+ζ437 ζ434+ζ434 ζ431+ζ43 ζ432+ζ432 ζ435+ζ435 ζ438+ζ438 ζ4311+ζ4311 ζ4314+ζ4314 ζ4317+ζ4317 ζ4320+ζ4320
86.1.2a20 R 2 0 ζ432+ζ432 ζ434+ζ434 ζ436+ζ436 ζ438+ζ438 ζ4310+ζ4310 ζ4312+ζ4312 ζ4314+ζ4314 ζ4316+ζ4316 ζ4318+ζ4318 ζ4320+ζ4320 ζ4321+ζ4321 ζ4319+ζ4319 ζ4317+ζ4317 ζ4315+ζ4315 ζ4313+ζ4313 ζ4311+ζ4311 ζ439+ζ439 ζ437+ζ437 ζ435+ζ435 ζ433+ζ433 ζ431+ζ43
86.1.2a21 R 2 0 ζ431+ζ43 ζ432+ζ432 ζ433+ζ433 ζ434+ζ434 ζ435+ζ435 ζ436+ζ436 ζ437+ζ437 ζ438+ζ438 ζ439+ζ439 ζ4310+ζ4310 ζ4311+ζ4311 ζ4312+ζ4312 ζ4313+ζ4313 ζ4314+ζ4314 ζ4315+ζ4315 ζ4316+ζ4316 ζ4317+ζ4317 ζ4318+ζ4318 ζ4319+ζ4319 ζ4320+ζ4320 ζ4321+ζ4321

magma: CharacterTable(G);