LMFDB - Abstract group 1280.1106474: $C_2\wr C_2^2\times F

Show commands: Gap / Magma / SageMath

magma:G := SmallGroup(1280, 1106474);

gap:G := SmallGroup(1280, 1106474);

sage_gap:G = libgap.SmallGroup(1280, 1106474)

comment:Define the group as a permutation group

sage:G = PermutationGroup(['(5,8)(10,11,13,12)', '(1,2)(3,5)(4,6)(7,8)', '(1,3)(2,5)(4,7)(6,8)', '(10,12,13,11)', '(3,7)(5,8)', '(2,6)(5,8)', '(10,13)(11,12)', '(1,4)(2,6)(3,7)(5,8)', '(9,10,12,11,13)'])

Group information

Description:	$C_2\wr C_2^2\times F_5$
Order:	$1280$$\medspace = 2^{8} \cdot 5 $	comment:Order of the group magma:Order(G); gap:Order(G); sage:G.order() sage_gap:G.Order()
Exponent:	$20$$\medspace = 2^{2} \cdot 5 $	comment:Exponent of the group magma:Exponent(G); gap:Exponent(G); sage:G.exponent() sage_gap:G.Exponent()
Automorphism group:	$C_2^2\times C_2^4.(C_2\times S_3\times F_5)$, of order $15360$$\medspace = 2^{10} \cdot 3 \cdot 5 $	comment:Automorphism group gap:AutomorphismGroup(G); magma:AutomorphismGroup(G); sage_gap:G.AutomorphismGroup()
Composition factors:	$C_2$ x 8, $C_5$	comment:Composition factors of the group magma:CompositionFactors(G); gap:CompositionSeries(G); sage:G.composition_series() sage_gap:G.CompositionSeries()
Derived length:	$2$	comment:Derived length of the group magma:DerivedLength(G); gap:DerivedLength(G); sage_gap:G.DerivedLength()

This group is nonabelian, supersolvable (hence solvable and monomial), hyperelementary for $p = 2$, and metabelian.

comment:Determine if the group G is abelian

magma:IsAbelian(G);

gap:IsAbelian(G);

sage:G.is_abelian()

sage_gap:G.IsAbelian()

comment:Determine if the group G is cyclic

magma:IsCyclic(G);

gap:IsCyclic(G);

sage:G.is_cyclic()

sage_gap:G.IsCyclic()

comment:Determine if the group G is nilpotent

magma:IsNilpotent(G);

gap:IsNilpotentGroup(G);

sage:G.is_nilpotent()

sage_gap:G.IsNilpotentGroup()

comment:Determine if the group G is solvable

magma:IsSolvable(G);

gap:IsSolvableGroup(G);

sage:G.is_solvable()

sage_gap:G.IsSolvableGroup()

comment:Determine if the group G is supersolvable

gap:IsSupersolvableGroup(G);

sage:G.is_supersolvable()

sage_gap:G.IsSupersolvableGroup()

comment:Determine if the group G is simple

magma:IsSimple(G);

gap:IsSimpleGroup(G);

sage_gap:G.IsSimpleGroup()

Group statistics

comment:Compute statistics for the group G

magma:// Magma code to output the first two rows of the group statistics table element_orders := [Order(g) : g in G]; orders := Set(element_orders); printf "Orders: %o\n", orders; printf "Elements: %o %o\n", [#[x : x in element_orders | x eq n] : n in orders], Order(G); cc_orders := [cc[1] : cc in ConjugacyClasses(G)]; printf "Conjugacy classes: %o %o\n", [#[x : x in cc_orders | x eq n] : n in orders], #cc_orders;

gap:# Gap code to output the first two rows of the group statistics table element_orders := List(Elements(G), g -> Order(g)); orders := Set(element_orders); Print("Orders: ", orders, "\n"); element_counts := List(orders, n -> Length(Filtered(element_orders, x -> x = n))); Print("Elements: ", element_counts, " ", Size(G), "\n"); cc_orders := List(ConjugacyClasses(G), cc -> Order(Representative(cc))); cc_counts := List(orders, n -> Length(Filtered(cc_orders, x -> x = n))); Print("Conjugacy classes: ", cc_counts, " ", Length(ConjugacyClasses(G)), "\n");

sage:# Sage code to output the first two rows of the group statistics table element_orders = [g.order() for g in G] orders = sorted(list(set(element_orders))) print("Orders:", orders) print("Elements:", [element_orders.count(n) for n in orders], G.order()) cc_orders = [cc[0].order() for cc in G.conjugacy_classes()] print("Conjugacy classes:", [cc_orders.count(n) for n in orders], len(cc_orders))

Order	1	2	4	5	10	20
Elements	1	167	856	4	108	144	1280
Conjugacy classes	1	19	44	1	9	6	80
Divisions	1	19	28	1	9	6	64
Autjugacy classes	1	9	16	1	4	2	33

comment:Compute statistics about the characters of G

magma:// Outputs [<d_1,c_1>, <d_2,c_2>, ...] where c_i is the number of irr. complex chars. of G with degree d_i CharacterDegrees(G);

gap:# Outputs [[d_1,c_1], [d_2,c_2], ...] where c_i is the number of irr. complex chars. of G with degree d_i CharacterDegrees(G);

sage:# Outputs [[d_1,c_1], [d_2,c_2], ...] where c_i is the number of irr. complex chars. of G with degree d_i character_degrees = [c[0] for c in G.character_table()] [[n, character_degrees.count(n)] for n in set(character_degrees)]

sage_gap:G.CharacterDegrees()

Dimension	1	2	4	8	16
Irr. complex chars.	32	24	16	6	2	80
Irr. rational chars.	16	20	18	8	2	64

Minimal presentations

Permutation degree:	$13$
Transitive degree:	$40$
Rank:	$4$
Inequivalent generating quadruples:	$53329920$

Minimal degrees of faithful linear representations

	Over $\mathbb{C}$	Over $\mathbb{R}$	Over $\mathbb{Q}$
Irreducible	16	16	16
Arbitrary	not computed	not computed	not computed

Constructions

Show commands: Gap / Magma / SageMath

Presentation:	${\langle a, b, c, d, e \mid a^{4}=b^{2}=c^{4}=d^{2}=e^{20}=[a,b]=[a,d]=[b,d]= \!\cdots\! \rangle}$ < a, b, c, d, e \| a^4,b^2,c^4,d^2,e^20,[a,b],[a,d],[b,d],[d,e], c^3a^-1c^-1a, de^7a^-1e^-1a, c^3b^-1c^-1b, de^11b^-1e^-1b, de^10c^-1d^-1c, dec^-1e^-1c >
comment:Define the group with the given generators and relations magma:G := PCGroup([9, -2, -2, -2, -2, -2, -2, 2, -2, -5, 18, 867, 237, 102, 4568, 30246, 18159, 11616, 789, 2814, 186, 64519, 41488, 214, 41480, 41489]); a,b,c,d,e := Explode([G.1, G.3, G.4, G.6, G.7]); AssignNames(~G, ["a", "a2", "b", "c", "c2", "d", "e", "e2", "e4"]); gap:G := PcGroupCode(1312429271993126973981309792531379524659444412797102863280041623555,1280); a := G.1; b := G.3; c := G.4; d := G.6; e := G.7; sage:# This uses Sage's interface to GAP, as Sage (currently) has no native support for PC groups G = gap.new('PcGroupCode(1312429271993126973981309792531379524659444412797102863280041623555,1280)'); a = G.1; b = G.3; c = G.4; d = G.6; e = G.7; sage_gap:# This uses Sage's interface to GAP, as Sage (currently) has no native support for PC groups G = gap.new('PcGroupCode(1312429271993126973981309792531379524659444412797102863280041623555,1280)'); a = G.1; b = G.3; c = G.4; d = G.6; e = G.7;
Permutation group:	Degree $13$ $\langle(5,8)(10,11,13,12), (1,2)(3,5)(4,6)(7,8), (1,3)(2,5)(4,7)(6,8), (10,12,13,11) \!\cdots\! \rangle$ (5,8)(10,11,13,12), (1,2)(3,5)(4,6)(7,8), (1,3)(2,5)(4,7)(6,8), (10,12,13,11), (3,7)(5,8), (2,6)(5,8), (10,13)(11,12), (1,4)(2,6)(3,7)(5,8), (9,10,12,11,13)
comment:Define the group as a permutation group magma:G := PermutationGroup< 13 \| (5,8)(10,11,13,12), (1,2)(3,5)(4,6)(7,8), (1,3)(2,5)(4,7)(6,8), (10,12,13,11), (3,7)(5,8), (2,6)(5,8), (10,13)(11,12), (1,4)(2,6)(3,7)(5,8), (9,10,12,11,13) >; gap:G := Group( (5,8)(10,11,13,12), (1,2)(3,5)(4,6)(7,8), (1,3)(2,5)(4,7)(6,8), (10,12,13,11), (3,7)(5,8), (2,6)(5,8), (10,13)(11,12), (1,4)(2,6)(3,7)(5,8), (9,10,12,11,13) ); sage:G = PermutationGroup(['(5,8)(10,11,13,12)', '(1,2)(3,5)(4,6)(7,8)', '(1,3)(2,5)(4,7)(6,8)', '(10,12,13,11)', '(3,7)(5,8)', '(2,6)(5,8)', '(10,13)(11,12)', '(1,4)(2,6)(3,7)(5,8)', '(9,10,12,11,13)'])
Transitive group:	40T1057	40T1118			more information
Direct product:	$F_5$ $\, \times\, $ $(C_2\wr C_2^2)$
Semidirect product:	$(D_{10}.D_4)$ $\,\rtimes\,$ $D_4$	$(C_2^3\times F_5)$ $\,\rtimes\,$ $D_4$	$(C_2^3:F_5)$ $\,\rtimes\,$ $D_4$	$C_2^3$ $\,\rtimes\,$ $(D_4\times F_5)$	all 44
Trans. wreath product:	not isomorphic to a non-trivial transitive wreath product
Non-split product:	$D_5$ . $(C_2^4:D_4)$	$(D_4\times D_{10})$ . $C_2^3$	$(D_{10}.D_4)$ . $C_2^3$	$D_{10}$ . $(C_2^3:D_4)$	all 35
Aut. group:	$\Aut(C_{10}:Q_8)$	$\Aut(C_2\times D_{20})$	$\Aut(C_2^3.D_{10})$	$\Aut(D_{10}:C_8)$	all 9

Elements of the group are displayed as permutations of degree 13.

Homology

Abelianization:	$C_{2}^{3} \times C_{4} $	comment:The abelianization of the group magma:quo< G \| CommutatorSubgroup(G) >; gap:FactorGroup(G, DerivedSubgroup(G)); sage:G.quotient(G.commutator())
Schur multiplier:	$C_{2}^{7}$	comment:The Schur multiplier of the group gap:AbelianInvariantsMultiplier(G); sage:G.homology(2) sage_gap:G.AbelianInvariantsMultiplier()
Commutator length:	$1$	comment:The commutator length of the group gap:CommutatorLength(G); sage_gap:G.CommutatorLength()

Subgroups

comment:List of subgroups of the group

magma:Subgroups(G);

gap:AllSubgroups(G);

sage:G.subgroups()

sage_gap:G.AllSubgroups()

There are 13446 subgroups in 1910 conjugacy classes, 216 normal (28 characteristic).

Characteristic subgroups are shown in this color. Normal (but not characteristic) subgroups are shown in this color.

Special subgroups

Center:	$Z \simeq$ $C_2$	$G/Z \simeq$ $C_2^2\wr C_2\times F_5$	comment:Center of the group magma:Center(G); gap:Center(G); sage:G.center() sage_gap:G.Center()
Commutator:	$G' \simeq$ $C_2^2\times C_{10}$	$G/G' \simeq$ $C_2^3\times C_4$	comment:Commutator subgroup of the group G magma:CommutatorSubgroup(G); gap:DerivedSubgroup(G); sage:G.commutator() sage_gap:G.DerivedSubgroup()
Frattini:	$\Phi \simeq$ $C_2^3$	$G/\Phi \simeq$ $C_2^3\times F_5$	comment:Frattini subgroup of the group G magma:FrattiniSubgroup(G); gap:FrattiniSubgroup(G); sage:G.frattini_subgroup() sage_gap:G.FrattiniSubgroup()
Fitting:	$\operatorname{Fit} \simeq$ $C_2\wr C_2^2\times C_5$	$G/\operatorname{Fit} \simeq$ $C_4$	comment:Fitting subgroup of the group G magma:FittingSubgroup(G); gap:FittingSubgroup(G); sage:G.fitting_subgroup() sage_gap:G.FittingSubgroup()
Radical:	$R \simeq$ $C_2\wr C_2^2\times F_5$	$G/R \simeq$ $C_1$	comment:Radical of the group G magma:Radical(G); gap:SolvableRadical(G); sage_gap:G.SolvableRadical()
Socle:	$\operatorname{soc} \simeq$ $C_{10}$	$G/\operatorname{soc} \simeq$ $C_2^3.C_2^4$	comment:Socle of the group G magma:Socle(G); gap:Socle(G); sage:G.socle() sage_gap:G.Socle()
2-Sylow subgroup:	$P_{ 2 } \simeq$ $C_2^4.C_2^4$
5-Sylow subgroup:	$P_{ 5 } \simeq$ $C_5$

Subgroup diagram and profile

For the default diagram, subgroups are sorted vertically by the number of prime divisors (counted with multiplicity) in their orders.
To see subgroups sorted vertically by order instead, check this box.

See a full page version of the diagram

Subgroup information

Click on a subgroup in the diagram to see information about it.

Series

Derived series

$C_2\wr C_2^2\times F_5$

$\rhd$

$C_2^2\times C_{10}$

$\rhd$

$C_1$

comment:Derived series of the group GF

magma:DerivedSeries(G);

gap:DerivedSeriesOfGroup(G);

sage:G.derived_series()

sage_gap:G.DerivedSeriesOfGroup()

Chief series

$C_2\wr C_2^2\times F_5$

$\rhd$

$C_2^2\wr C_2\times F_5$

$\rhd$

$C_2^4\times F_5$

$\rhd$

$C_2^3\times F_5$

$\rhd$

$C_2^2\times D_{10}$

$\rhd$

$C_2^2\times C_{10}$

$\rhd$

$C_2\times C_{10}$

$\rhd$

$C_{10}$

$\rhd$

$C_5$

$\rhd$

$C_1$

comment:Chief series of the group G

magma:ChiefSeries(G);

gap:ChiefSeries(G);

sage_gap:G.ChiefSeries()

Lower central series

$C_2\wr C_2^2\times F_5$

$\rhd$

$C_2^2\times C_{10}$

$\rhd$

$C_{10}$

$\rhd$

$C_5$

comment:The lower central series of the group G

magma:LowerCentralSeries(G);

gap:LowerCentralSeriesOfGroup(G);

sage:G.lower_central_series()

sage_gap:G.LowerCentralSeriesOfGroup()

Upper central series

$C_1$

$\lhd$

$C_2$

$\lhd$

$C_2^3$

$\lhd$

$C_2\wr C_2^2$

comment:The upper central series of the group G

magma:UpperCentralSeries(G);

gap:UpperCentralSeriesOfGroup(G);

sage:G.upper_central_series()

sage_gap:G.UpperCentralSeriesOfGroup()

Supergroups

This group is a maximal subgroup of 10 larger groups in the database.

This group is a maximal quotient of 7 larger groups in the database.

Character theory

comment:Character table

magma:CharacterTable(G); // Output not guaranteed to exactly match the LMFDB table

gap:CharacterTable(G); # Output not guaranteed to exactly match the LMFDB table

sage:G.character_table() # Output not guaranteed to exactly match the LMFDB table

sage_gap:G.CharacterTable() # Output not guaranteed to exactly match the LMFDB table

Complex character table

See the $80 \times 80$ character table. Alternatively, you may search for characters of this group with desired properties.

Rational character table

See the $64 \times 64$ rational character table.

Overview	Random
Universe	Knowledge

Classical	Maass
Hilbert	Bianchi

Elliptic curves over $\Q$
Elliptic curves over $\Q(\alpha)$
Genus 2 curves over $\Q$
Higher genus families
Abelian varieties over $\F_{q}$
Belyi maps

Label	1280.1106474
Order	\( 2^{8} \cdot 5 \)
Exponent	\( 2^{2} \cdot 5 \)

Nilpotent	no
Solvable	yes
$\card{G^{\mathrm{ab}}}$	\( 2^{5} \)
$\card{Z(G)}$	\( 2 \)
$\card{\Aut(G)}$	\( 2^{10} \cdot 3 \cdot 5 \)
$\card{\mathrm{Out}(G)}$	\( 2^{3} \cdot 3 \)
Perm deg.	$13$
Trans deg.	$40$
Rank	$4$

Introduction

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Modular forms

Varieties

Fields

Representations

Groups

Database

Properties

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Group information

Group statistics

Minimal presentations

Minimal degrees of faithful linear representations

Constructions

Homology

Subgroups

Special subgroups

Subgroup diagram and profile

Classes of subgroups up to conjugation

Classes of subgroups up to automorphism

Normal subgroups

Normal subgroups up to automorphism

Subgroup information

Classes of subgroups up to conjugation

Classes of subgroups up to automorphism

Normal subgroups (quotient in parentheses)

Normal subgroups up to automorphism (quotient in parentheses)

Series

Supergroups

Character theory

Complex character table

Rational character table

This project is supported by grants from the US National Science Foundation, the UK Engineering and Physical Sciences Research Council, and the Simons Foundation.