Groups#

Permutation groups#

A permutation group is a subgroup of some symmetric group $S_{n}$ . Sage has a Python class PermutationGroup, so you can work with such groups directly:

sage: G = PermutationGroup(['(1,2,3)(4,5)'])
sage: G
Permutation Group with generators [(1,2,3)(4,5)]
sage: g = G.gens()[0]; g
(1,2,3)(4,5)
sage: g*g
(1,3,2)
sage: G = PermutationGroup(['(1,2,3)'])
sage: g = G.gens()[0]; g
(1,2,3)
sage: g.order()
3

For the example of the Rubik’s cube group (a permutation subgroup of $S_{48}$ , where the non-center facets of the Rubik’s cube are labeled $1, 2, . . ., 48$ in some fixed way), you can use the GAP-Sage interface as follows.

sage: cube = "cubegp := Group(
( 1, 3, 8, 6)( 2, 5, 7, 4)( 9,33,25,17)(10,34,26,18)(11,35,27,19),
( 9,11,16,14)(10,13,15,12)( 1,17,41,40)( 4,20,44,37)( 6,22,46,35),
(17,19,24,22)(18,21,23,20)( 6,25,43,16)( 7,28,42,13)( 8,30,41,11),
(25,27,32,30)(26,29,31,28)( 3,38,43,19)( 5,36,45,21)( 8,33,48,24),
(33,35,40,38)(34,37,39,36)( 3, 9,46,32)( 2,12,47,29)( 1,14,48,27),
(41,43,48,46)(42,45,47,44)(14,22,30,38)(15,23,31,39)(16,24,32,40) )"
sage: gap(cube)
'permutation group with 6 generators'
sage: gap("Size(cubegp)")
43252003274489856000'

Another way you can choose to do this:

Create a file cubegroup.py containing the lines:

cube = "cubegp := Group(
( 1, 3, 8, 6)( 2, 5, 7, 4)( 9,33,25,17)(10,34,26,18)(11,35,27,19),
( 9,11,16,14)(10,13,15,12)( 1,17,41,40)( 4,20,44,37)( 6,22,46,35),
(17,19,24,22)(18,21,23,20)( 6,25,43,16)( 7,28,42,13)( 8,30,41,11),
(25,27,32,30)(26,29,31,28)( 3,38,43,19)( 5,36,45,21)( 8,33,48,24),
(33,35,40,38)(34,37,39,36)( 3, 9,46,32)( 2,12,47,29)( 1,14,48,27),
(41,43,48,46)(42,45,47,44)(14,22,30,38)(15,23,31,39)(16,24,32,40) )"

Then place the file in the subdirectory $SAGE_ROOT/local/lib/python2.4/site-packages/sage of your Sage home directory. Last, read (i.e., import) it into Sage:

sage: import sage.cubegroup
sage: sage.cubegroup.cube
'cubegp := Group(( 1, 3, 8, 6)( 2, 5, 7, 4)( 9,33,25,17)(10,34,26,18)
(11,35,27,19),( 9,11,16,14)(10,13,15,12)( 1,17,41,40)( 4,20,44,37)
( 6,22,46,35),(17,19,24,22)(18,21,23,20)( 6,25,43,16)( 7,28,42,13)
( 8,30,41,11),(25,27,32,30)(26,29,31,28)( 3,38,43,19)( 5,36,45,21)
( 8,33,48,24),(33,35,40,38)(34,37,39,36)( 3, 9,46,32)( 2,12,47,29)
( 1,14,48,27),(41,43,48,46)(42,45,47,44)(14,22,30,38)(15,23,31,39)
(16,24,32,40) )'
sage: gap(sage.cubegroup.cube)
'permutation group with 6 generators'
sage: gap("Size(cubegp)")
'43252003274489856000'

(You will have line wrap instead of the above carriage returns in your Sage output.)

Use the CubeGroup class:
```
sage: rubik = CubeGroup()
sage: rubik
The Rubik's cube group with generators R,L,F,B,U,D in SymmetricGroup(48).
sage: rubik.order()
43252003274489856000
```
(1) has implemented classical groups (such as $G U (3, F_{5})$ ) and matrix groups over a finite field with user-defined generators.

(2) also has implemented finite and infinite (but finitely generated) abelian groups.

Conjugacy classes#

You can compute conjugacy classes of a finite group using “natively”:

sage: G = PermutationGroup(['(1,2,3)', '(1,2)(3,4)', '(1,7)'])
sage: CG = G.conjugacy_classes_representatives()
sage: gamma = CG[2]
sage: CG; gamma
[(), (4,7), (3,4,7), (2,3)(4,7), (2,3,4,7), (1,2)(3,4,7), (1,2,3,4,7)]
(3,4,7)

You can use the Sage-GAP interface:

sage: gap.eval("G := Group((1,2)(3,4),(1,2,3))")
'Group([ (1,2)(3,4), (1,2,3) ])'
sage: gap.eval("CG := ConjugacyClasses(G)")
'[ ()^G, (2,3,4)^G, (2,4,3)^G, (1,2)(3,4)^G ]'
sage: gap.eval("gamma := CG[3]")
'(2,4,3)^G'
sage: gap.eval("g := Representative(gamma)")
'(2,4,3)'

Or, here’s another (more “pythonic”) way to do this type of computation:

sage: G = gap.Group('[(1,2,3), (1,2)(3,4), (1,7)]')
sage: CG = G.ConjugacyClasses()
sage: gamma = CG[2]
sage: g = gamma.Representative()
sage: CG; gamma; g
[ ConjugacyClass( SymmetricGroup( [ 1, 2, 3, 4, 7 ] ), () ),
  ConjugacyClass( SymmetricGroup( [ 1, 2, 3, 4, 7 ] ), (4,7) ),
  ConjugacyClass( SymmetricGroup( [ 1, 2, 3, 4, 7 ] ), (3,4,7) ),
  ConjugacyClass( SymmetricGroup( [ 1, 2, 3, 4, 7 ] ), (2,3)(4,7) ),
  ConjugacyClass( SymmetricGroup( [ 1, 2, 3, 4, 7 ] ), (2,3,4,7) ),
  ConjugacyClass( SymmetricGroup( [ 1, 2, 3, 4, 7 ] ), (1,2)(3,4,7) ),
  ConjugacyClass( SymmetricGroup( [ 1, 2, 3, 4, 7 ] ), (1,2,3,4,7) ) ]
ConjugacyClass( SymmetricGroup( [ 1, 2, 3, 4, 7 ] ), (4,7) )
(4,7)

Normal subgroups#

If you want to find all the normal subgroups of a permutation group $G$ (up to conjugacy), you can use Sage’s interface to GAP:

sage: G = AlternatingGroup( 5 )
sage: gap(G).NormalSubgroups()
[ AlternatingGroup( [ 1 .. 5 ] ), Group( () ) ]

sage: G = gap("AlternatingGroup( 5 )")
sage: G.NormalSubgroups()
[ AlternatingGroup( [ 1 .. 5 ] ), Group( () ) ]

Here’s another way, working more directly with GAP:

sage: print(gap.eval("G := AlternatingGroup( 5 )"))
Alt( [ 1 .. 5 ] )
sage: print(gap.eval("normal := NormalSubgroups( G )"))
[ Alt( [ 1 .. 5 ] ), Group(()) ]
sage: G = gap.new("DihedralGroup( 10 )")
sage: G.NormalSubgroups()
[ Group( [ f1, f2 ] ), Group( [ f2 ] ), Group( <identity> of ... ) ]
sage: print(gap.eval("G := SymmetricGroup( 4 )"))
Sym( [ 1 .. 4 ] )
sage: print(gap.eval("normal := NormalSubgroups( G );"))
[ Sym( [ 1 .. 4 ] ), Alt( [ 1 .. 4 ] ), Group([ (1,4)(2,3),  ... ]),
      Group(()) ]

Centers#

How do you compute the center of a group in Sage?

Although Sage calls GAP to do the computation of the group center, center is “wrapped” (i.e., Sage has a class PermutationGroup with associated class method “center”), so the user does not need to use the gap command. Here’s an example:

sage: G = PermutationGroup(['(1,2,3)(4,5)', '(3,4)'])
sage: G.center()
Subgroup generated by [()] of (Permutation Group with generators [(3,4), (1,2,3)(4,5)])

A similar syntax for matrix groups also works:

sage: G = SL(2, GF(5) )
sage: G.center()
Subgroup with 1 generators (
[4 0]
[0 4]
) of Special Linear Group of degree 2 over Finite Field of size 5
sage: G = PSL(2, 5 )
sage: G.center()
Subgroup generated by [()] of (The projective special linear group of degree 2 over Finite Field of size 5)

Note

center can be spelled either way in GAP, not so in Sage.

The group id database#

The function group_id uses the Small Groups Library of E. A. O’Brien, B. Eick, and H. U. Besche, which is a part of GAP.

sage: G = PermutationGroup(['(1,2,3)(4,5)', '(3,4)'])
sage: G.order()
120
sage: G.group_id()
[120, 34]

Another example of using the small groups database: group_id

sage: gap_console()
┌───────┐   GAP 4.10.0 of 01-Nov-2018
│  GAP  │   https://www.gap-system.org
└───────┘   Architecture: x86_64-pc-linux-gnu-default64
Configuration:  gmp 6.0.0, readline
Loading the library and packages ...
Packages:   GAPDoc 1.6.2, PrimGrp 3.3.2, SmallGrp 1.3, TransGrp 2.0.4
Try '??help' for help. See also '?copyright', '?cite' and '?authors'
gap> G:=Group((4,6,5)(7,8,9),(1,7,2,4,6,9,5,3));
Group([ (4,6,5)(7,8,9), (1,7,2,4,6,9,5,3) ])
gap> StructureDescription(G);
"(C3 x C3) : GL(2,3)"

Construction instructions for every group of order less than 32#

AUTHORS:

Davis Shurbert

Every group of order less than 32 is implemented in Sage as a permutation group. They can all be created easily. We will first show how to build direct products and semidirect products, then give the commands necessary to build all of these small groups.

Let G1, G2, …, Gn be permutation groups already initialized in Sage. The following command can be used to take their direct product (where, of course, the ellipses are simply being used here as a notation, and you actually must enter every factor in your desired product explicitly).

sage: G = direct_product_permgroups([G1, G2, ..., Gn])

The semidirect product operation can be thought of as a generalization of the direct product operation. Given two groups, $H$ and $K$ , their semidirect product, $H ⋉_{ϕ} K$ , (where $ϕ : H \to A u t (K)$ is a homomorphism) is a group whose underlying set is the cartersian product of $H$ and $K$ , but with the operation:

(h_{1}, k_{1}) (h_{2}, k_{2}) = (h_{1} h_{2}, k_{1}^{ϕ (h_{2})} k_{2}) .

The output is not the group explicitly described in the definition of the operation, but rather an isomorphic group of permutations. In the routine below, assume H and K already have been defined and initialized in Sage. Also, phi is a list containing two sublists that define the underlying homomorphism by giving the images of a set of generators of H. For each semidirect product in the table below we will show you how to build phi, then assume you have read this passage and understand how to go from there.

sage: G = H.semidirect_product(K, phi)

To avoid unnecessary repetition, we will now give commands that one can use to create the cyclic group of order $n$ , $C_{n}$ , and the dihedral group on $n$ letters, $D_{n}$ . We will present one more example of each to ensure that the reader understands the command, then it will be withheld.

sage: G = CyclicPermutationGroup(n)

sage: G = DihedralGroup(n)

Note that exponential notation will be used for the direct product operation. For example, ${C_{2}}^{2} = C_{2} \times C_{2}$ . This table was crafted with the help of Group Tables, by AD Thomas and GV Wood (1980, Shiva Publishing).

Order	Group Description	Command(s)	GAP ID
1	The Trivial Group	sage: G = SymmetricGroup(1)	[1,1]
2	$C_{2}$	sage: G = SymmetricGroup(2)	[2,1]
3	$C_{3}$	sage: G = CyclicPermutationGroup(3)	[3,1]
4	$C_{4}$		[4,1]
4	$C_{2} \times C_{2}$	sage: G = KleinFourGroup()	[4,2]
5	$C_{5}$		[5,1]
6	$C_{6}$		[6,2]
6	$S_{3}$ (Symmetric Group on 3 letters)	sage: G = SymmetricGroup(3)	[6,1]
7	$C_{7}$		[7,1]
8	$C_{8}$		[8,1]
8	$C_{4} \times C_{2}$		[8,2]
8	$C_{2} \times C_{2} \times C_{2}$		[8,5]
8	$D_{4}$	sage: G = DihedralGroup(4)	[8,3]
8	The Quaternion Group (Q)	sage: G = QuaternionGroup()	[8,4]
9	$C_{9}$		[9,1]
9	$C_{3} \times C_{3}$		[9,2]
10	$C_{10}$		[10,2]
10	$D_{5}$		[10,1]
11	$C_{11}$		[11,1]
12	$C_{12}$		[12,2]
12	$C_{6} \times C_{2}$		[12,5]
12	$D_{6}$		[12,4]
12	$A_{4}$ (Alternating Group on 4 letters)	sage: G = AlternatingGroup(4)	[12,3]
12	$Q_{6}$ (DiCyclic group of order 12)	sage: G = DiCyclicGroup(3)	[12,1]
13	$C_{13}$		[13,1]
14	$C_{14}$		[14,2]
14	$D_{7}$		[14,1]
15	$C_{15}$		[15,1]
16	$C_{16}$		[16,1]
16	$C_{8} \times C_{2}$		[16,5]
16	$C_{4} \times C_{4}$		[16,2]
16	$C_{4} \times C_{2} \times C_{2}$		[16,10]
16	${C_{2}}^{4}$		[16,14]
16	$D_{4} \times C_{2}$		[16,11]
16	$Q \times C_{2}$		[16,12]
16	$D_{8}$		[16,7]
16	$Q_{8}$ (Dicyclic group of order 16)	sage: G = DiCyclicGroup(4)	[16,9]
16	Semidihedral Group of order $2^{4}$	sage: G = SemidihedralGroup(4)	[16,8]
16	Split Metacyclic Group of order $2^{4}$	sage: G = SplitMetacyclicGroup(2,4)	[16,6]
16	$(C_{4} \times C_{2}) ⋊_{ϕ} C_{2}$	sage: C2 = SymmetricGroup(2); C4 = CyclicPermutationGroup(4) sage: A = direct_product_permgroups([C2,C4]) sage: alpha = PermutationGroupMorphism(A,A,[A.gens()[0],A.gens()[0]^2*A.gens()[1]]) sage: phi = [[(1,2)],[alpha]]	[16,13]
16	$(C_{4} \times C_{2}) ⋊_{ϕ} C_{2}$	sage: C2 = SymmetricGroup(2); C4 = CyclicPermutationGroup(4) sage: A = direct_product_permgroups([C2,C4]) sage: alpha = PermutationGroupMorphism(A,A,[A.gens()[0]^3*A.gens()[1],A.gens()[1]]) sage: phi = [[(1,2)],[alpha]]	[16,3]
16	$C_{4} ⋊_{ϕ} C_{4}$	sage: C4 = CyclicPermutationGroup(4) sage: alpha = PermutationGroupMorphism(C4,C4,[C4.gen().inverse()]) sage: phi = [[(1,2,3,4)],[alpha]]	[16,4]
17	$C_{17}$		[17,1]
18	$C_{18}$		[18,2]
18	$C_{6} \times C_{3}$		[18,5]
18	$D_{9}$		[18,1]
18	$S_{3} \times C_{3}$		[18,3]
18	$D i h (C_{3} \times C_{3})$	sage: G = GeneralDihedralGroup([3,3])	[18,4]
19	$C_{19}$		[19,1]
20	$C_{20}$		[20,2]
20	$C_{10} \times C_{2}$		[20,5]
20	$D_{10}$		[20,4]
20	$Q_{10}$ (Dicyclic Group of order 20)		[20,1]
20	$H o l (C_{5})$	sage: C5 = CyclicPermutationGroup(5) sage: G = C5.holomorph()	[20,3]
21	$C_{21}$		[21,2]
21	$C_{7} ⋊_{ϕ} C_{3}$	sage: C7 = CyclicPermutationGroup(7) sage: alpha = PermutationGroupMorphism(C7,C7,[C7.gen()**4]) sage: phi = [[(1,2,3)],[alpha]]	[21,1]
22	$C_{22}$		[22,2]
22	$D_{11}$		[22,1]
23	$C_{23}$		[23,1]
24	$C_{24}$		[24,2]
24	$D_{12}$		[24,6]
24	$Q_{12}$ (DiCyclic Group of order 24)		[24,4]
24	$C_{12} \times C_{2}$		[24,9]
24	$C_{6} \times C_{2} \times C_{2}$		[24,15]
24	$S_{4}$ (Symmetric Group on 4 letters)	sage: G = SymmetricGroup(4)	[24,12]
24	$S_{3} \times C_{4}$		[24,5]
24	$S_{3} \times C_{2} \times C_{2}$		[24,14]
24	$D_{4} \times C_{3}$		[24,10]
24	$Q \times C_{3}$		[24,11]
24	$A_{4} \times C_{2}$		[24,13]
24	$Q_{6} \times C_{2}$		[24,7]
24	$Q ⋊_{ϕ} C_{3}$	sage: Q = QuaternionGroup() sage: alpha = PermutationGroupMorphism(Q,Q,[Q.gens()[0]*Q.gens()[1],Q.gens()[0].inverse()]) sage: phi = [[(1,2,3)],[alpha]]	[24,3]
24	$C_{3} ⋊_{ϕ} C_{8}$	sage: C3 = CyclicPermutationGroup(3) sage: alpha = PermutationGroupMorphism(C3,C3,[C3.gen().inverse()]) sage: phi = [[(1,2,3,4,5,6,7,8)],[alpha]]	[24,1]
24	$C_{3} ⋊_{ϕ} D_{4}$	sage: C3 = CyclicPermutationGroup(3) sage: alpha1 = PermutationGroupMorphism(C3,C3,[C3.gen().inverse()]) sage: alpha2 = PermutationGroupMorphism(C3,C3,[C3.gen()]) sage: phi = [[(1,2,3,4),(1,3)],[alpha1,alpha2]]	[24,8]
25	$C_{25}$		[25,1]
25	$C_{5} \times C_{5}$		[25,2]
26	$C_{26}$		[26,2]
26	$D_{13}$		[26,1]
27	$C_{27}$		[27,1]
27	$C_{9} \times C_{3}$		[27,2]
27	$C_{3} \times C_{3} \times C_{3}$		[27,5]
27	Split Metacyclic Group of order $3^{3}$	sage: G = SplitMetacyclicGroup(3,3)	[27,4]
27	$(C_{3} \times C_{3}) ⋊_{ϕ} C_{3}$	sage: C3 = CyclicPermutationGroup(3) sage: A = direct_product_permgroups([C3,C3]) sage: alpha = PermutationGroupMorphism(A,A,[A.gens()[0]*A.gens()[1].inverse(),A.gens()[1]]) sage: phi = [[(1,2,3)],[alpha]]	[27,3]
28	$C_{28}$		[28,2]
28	$C_{14} \times C_{2}$		[28,4]
28	$D_{14}$		[28,3]
28	$Q_{14}$ (DiCyclic Group of order 28)		[28,1]
29	$C_{29}$		[29,1]
30	$C_{30}$		[30,4]
30	$D_{15}$		[30,3]
30	$D_{5} \times C_{3}$		[30,2]
30	$D_{3} \times C_{5}$		[30,1]
31	$C_{31}$		[31,1]

Table By Kevin Halasz

Construction instructions for every finitely presented group of order 15 or less#

Sage has the capability to easily construct every group of order 15 or less as a finitely presented group. We will begin with some discussion on creating finitely generated abelian groups, as well as direct and semidirect products of finitely presented groups.

All finitely generated abelian groups can be created using the groups.presentation.FGAbelian(ls) command, where ls is a list of non-negative integers which gets reduced to invariants defining the group to be returned. For example, to construct $C_{4} \times C_{2} \times C_{2} \times C_{2}$ we can simply use:

sage: A = groups.presentation.FGAbelian([4,2,2,2])

The output for a given group is the same regardless of the input list of integers. The following example yields identical presentations for the cyclic group of order 30.

sage: A = groups.presentation.FGAbelian([2,3,5])
sage: B = groups.presentation.FGAbelian([30])

If G and H are finitely presented groups, we can use the following code to create the direct product of G and H, $G \times H$ .

sage: D = G.direct_product(H)

Suppose there exists a homomorphism $ϕ$ from a group $G$ to the automorphism group of a group $H$ . Define the semidirect product of $G$ with $H$ via $ϕ$ , as the Cartesian product of $G$ and $H$ , with the operation $(g_{1}, h_{1}) (g_{2}, h_{2}) = (g_{1} g_{2}, ϕ_{h_{1}} (g_{2}) h_{2})$ where $ϕ_{h} = ϕ (h)$ . To construct this product in Sage for two finitely presented groups, we must define $ϕ$ manually using a pair of lists. The first list consists of generators of the group $G$ , while the second list consists of images of the corresponding generators in the first list. These automorphisms are similarly defined as a pair of lists, generators in one and images in the other. As an example, we construct the dihedral group of order 16 as a semidirect product of cyclic groups.

sage: C2 = groups.presentation.Cyclic(2)
sage: C8 = groups.presentation.Cyclic(8)
sage: hom = (C2.gens(), [ ([C8([1])], [C8([-1])]) ])
sage: D = C2.semidirect_product(C8, hom)

The following table shows the groups of order 15 or less, and how to construct them in Sage. Repeated commands have been omitted but instead are described by the following examples.

The cyclic group of order $n$ can be created with a single command:

sage: C = groups.presentation.Cyclic(n)

Similarly for the dihedral group of order $2 n$ :

sage: D = groups.presentation.Dihedral(n)

This table was modeled after the preceding table created by Kevin Halasz.

Order	Group Description	Command(s)	GAP ID
1	The Trivial Group	sage: G = groups.presentation.Symmetric(1)	[1,1]
2	$C_{2}$	sage: G = groups.presentation.Symmetric(2)	[2,1]
3	$C_{3}$	sage: G = groups.presentation.Cyclic(3)	[3,1]
4	$C_{4}$		[4,1]
4	$C_{2} \times C_{2}$	sage: G = groups.presentation.Klein()	[4,2]
5	$C_{5}$		[5,1]
6	$C_{6}$		[6,2]
6	$S_{3}$ (Symmetric Group on 3 letters)	sage: G = groups.presentation.Symmetric(3)	[6,1]
7	$C_{7}$		[7,1]
8	$C_{8}$		[8,1]
8	$C_{4} \times C_{2}$	sage: G = groups.presentation.FGAbelian([4,2])	[8,2]
8	$C_{2} \times C_{2} \times C_{2}$	sage: G = groups.presentation.FGAbelian([2,2,2])	[8,5]
8	$D_{4}$	sage: G = groups.presentation.Dihedral(4)	[8,3]
8	The Quaternion Group (Q)	sage: G = groups.presentation.Quaternion()	[8,4]
9	$C_{9}$		[9,1]
9	$C_{3} \times C_{3}$		[9,2]
10	$C_{10}$		[10,2]
10	$D_{5}$		[10,1]
11	$C_{11}$		[11,1]
12	$C_{12}$		[12,2]
12	$C_{6} \times C_{2}$		[12,5]
12	$D_{6}$		[12,4]
12	$A_{4}$ (Alternating Group on 4 letters)	sage: G = groups.presentation.Alternating(4)	[12,3]
12	$Q_{6}$ (DiCyclic group of order 12)	sage: G = groups.presentation.DiCyclic(3)	[12,1]
13	$C_{13}$		[13,1]
14	$C_{14}$		[14,2]
14	$D_{7}$		[14,1]
15	$C_{15}$		[15,1]