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Code snippets from snippet-generate action #6934

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4 changes: 2 additions & 2 deletions lmfdb/tests/snippet_tests/elliptic_curves/code-11.a-gp.log
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6 changes: 3 additions & 3 deletions lmfdb/tests/snippet_tests/galois_groups/code-11T5-gap.log
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Original file line number Diff line number Diff line change
@@ -1,14 +1,14 @@
# snippet evaluation file generated by generate_snippet_tests.py
gap> G := TransitiveGroup(11, 5);
gap> G := TransitiveGroup(11, 5);
L(11)=PSL(2,11)(11)
gap> IdGroup(G);
[ 660, 13 ]
gap> Order(G);
660
gap> IsCyclic(G);
false
gap> IsAbelian(G);
false
gap> IsAbelian(G);
false
gap> IsSolvable(G);
false
gap> if IsNilpotentGroup(G) then NilpotencyClassOfGroup(G); fi;
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2 changes: 1 addition & 1 deletion lmfdb/tests/snippet_tests/galois_groups/code-11T5-sage.log
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Expand Up @@ -23,7 +23,7 @@ True
sage: SymmetricGroup(11).centralizer(G).order()
1
sage: G.gens()
((2,10)(3,4)(5,9)(6,7), (1,2,3,4,5,6,7,8,9,10,11))
((1,2,3,4,5,6,7,8,9,10,11), (2,10)(3,4)(5,9)(6,7))
sage: G.conjugacy_classes()
[Conjugacy class of () in Transitive group number 5 of degree 11,
Conjugacy class of (3,4)(5,7)(6,9)(8,11) in Transitive group number 5 of degree 11,
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10 changes: 5 additions & 5 deletions lmfdb/tests/snippet_tests/galois_groups/code-4T2-gap.log
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Expand Up @@ -16,16 +16,16 @@
4
gap> TransitiveIdentification(G);
2
gap> ForAll(GeneratorsOfGroup(G), g -> SignPerm(g) = 1);
true
gap> ForAll(GeneratorsOfGroup(G), g -> SignPerm(g) = 1);
true
gap> IsPrimitive(G);
false
gap> Order(Centralizer(SymmetricGroup(4), G));
4
gap> GeneratorsOfGroup(G);
[ (1,4)(2,3), (1,2)(3,4) ]
gap> ConjugacyClasses(G);
[ ()^G, (1,2)(3,4)^G, (1,3)(2,4)^G, (1,4)(2,3)^G ]
gap> ConjugacyClasses(G);
[ ()^G, (1,2)(3,4)^G, (1,3)(2,4)^G, (1,4)(2,3)^G ]
gap> CharacterTable(G);
CharacterTable( E(4) = 2[x]2 )
gap>
gap> 
2 changes: 1 addition & 1 deletion lmfdb/tests/snippet_tests/galois_groups/code-4T2-sage.log
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Expand Up @@ -23,7 +23,7 @@ False
sage: SymmetricGroup(4).centralizer(G).order()
4
sage: G.gens()
((1,2)(3,4), (1,4)(2,3))
((1,4)(2,3), (1,2)(3,4))
sage: G.conjugacy_classes()
[Conjugacy class of () in Transitive group number 2 of degree 4,
Conjugacy class of (1,2)(3,4) in Transitive group number 2 of degree 4,
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34 changes: 17 additions & 17 deletions lmfdb/tests/snippet_tests/groups/abstract/code-A5-gap.log
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Expand Up @@ -12,12 +12,12 @@
gap> CompositionSeries(G);
[ Alt( [ 1 .. 5 ] ), Group(()) ]
gap> if IsNilpotentGroup(G) then NilpotencyClassOfGroup(G); fi;
gap> DerivedLength(G);
0
gap> DerivedLength(G);
0
gap> IsAbelian(G);
false
gap> IsCyclic(G);
false
gap> IsCyclic(G);
false
gap> IsElementaryAbelian(G);
false
gap> IsMonomialGroup(G);
Expand Down Expand Up @@ -112,24 +112,24 @@
t30n9
gap> AbelianInvariants(G);
[ ]
gap> FactorGroup(G, DerivedSubgroup(G));
Group(())
gap> FactorGroup(G, DerivedSubgroup(G));
Group(())
gap> AbelianInvariantsMultiplier(G);
[ 2 ]
gap> CommutatorLength(G);
1
gap> AllSubgroups(G);
[ Group(()), Group([ (2,3)(4,5) ]), Group([ (2,4)(3,5) ]), Group([ (2,5)(3,4) ]), Group([ (1,2)(4,5) ]), Group([ (1,2)(3,4) ]), Group([ (1,2)(3,5) ]), Group([ (1,3)(4,5) ]), Group([ (1,3)(2,4) ]), Group([ (1,3)(2,5) ]), Group([ (1,4)(3,5) ]), Group([ (1,4)(2,3) ]),
Group([ (1,4)(2,5) ]), Group([ (1,5)(3,4) ]), Group([ (1,5)(2,3) ]), Group([ (1,5)(2,4) ]), Group([ (3,4,5) ]), Group([ (2,3,4) ]), Group([ (2,5,3) ]), Group([ (2,4,5) ]), Group([ (1,2,3) ]), Group([ (1,4,2) ]), Group([ (1,2,5) ]), Group([ (1,3,4) ]), Group([ (1,5,3) ]), Group([ (1,4,5) ]), Group([ (2,3)(4,5), (2,4)(3,5) ]), Group([ (1,2)(4,5), (1,4)(2,5) ]), Group([ (1,2)(3,4), (1,3)(2,4) ]), Group([ (1,5)(2,3), (1,3)(2,5) ]), Group([ (1,5)(3,4), (1,4)(3,5) ]), Group([ (1,2,3,4,5) ]), Group([ (1,5,2,4,3) ]), Group([ (1,2,4,5,3) ]), Group([ (1,4,5,2,3) ]), Group([ (1,4,2,3,5) ]), Group([ (1,2,5,3,4) ]), Group([ (1,2)(4,5), (3,4,5) ]), Group([ (2,3)(4,5), (1,2,3) ]), Group([ (1,5)(2,3), (1,4,5) ]), Group([ (1,5)(3,4), (2,3,4) ]), Group([ (1,4)(3,5), (2,5,3) ]),
Group([ (1,3)(2,5), (2,4,5) ]), Group([ (2,4)(3,5), (1,4,2) ]), Group([ (1,3)(2,4), (1,5,3) ]), Group([ (1,2)(3,4), (1,2,5) ]), Group([ (1,4)(2,5), (1,3,4) ]), Group([ (1,5)(2,4), (1,4)(3,5) ]), Group([ (1,2)(3,5), (1,4)(2,5) ]), Group([ (1,3)(2,5), (1,5)(3,4) ]), Group([ (1,2)(3,4), (1,5)(2,3) ]), Group([ (1,3)(2,4), (1,2)(4,5) ]), Group([ (1,4)(2,3), (1,3)(4,5) ]), Group([ (3,4,5), (2,4)(3,5) ]), Group([ (1,4,5), (1,4)(3,5) ]), Group([ (2,3,4), (1,3)(2,4) ]), Group([ (1,2,3), (1,3)(2,5) ]), Group([ (1,2,5), (1,4)(2,5) ]), Group([ (2,4)(3,5), (1,2,5) ]) ]
Group([ (1,4)(2,5) ]), Group([ (1,5)(3,4) ]), Group([ (1,5)(2,3) ]), Group([ (1,5)(2,4) ]), Group([ (3,4,5) ]), Group([ (2,3,4) ]), Group([ (2,5,3) ]), Group([ (2,4,5) ]), Group([ (1,2,3) ]), Group([ (1,4,2) ]), Group([ (1,2,5) ]), Group([ (1,3,4) ]), Group([ (1,5,3) ]), Group([ (1,4,5) ]), Group([ (2,3)(4,5), (2,4)(3,5) ]), Group([ (1,2)(4,5), (1,4)(2,5) ]), Group([ (1,2)(3,4), (1,3)(2,4) ]), Group([ (1,5)(2,3), (1,3)(2,5) ]), Group([ (1,5)(3,4), (1,4)(3,5) ]), Group([ (1,2,3,4,5) ]), Group([ (1,5,2,4,3) ]), Group([ (1,2,4,5,3) ]), Group([ (1,4,5,2,3) ]), Group([ (1,4,2,3,5) ]), Group([ (1,2,5,3,4) ]), Group([ (3,4,5), (1,2)(4,5) ]), Group([ (1,2,3), (2,3)(4,5) ]), Group([ (1,4,5), (1,5)(2,3) ]), Group([ (2,3,4), (1,5)(3,4) ]), Group([ (2,5,3), (1,4)(3,5) ]),
Group([ (2,4,5), (1,3)(2,5) ]), Group([ (1,4,2), (2,4)(3,5) ]), Group([ (1,5,3), (1,3)(2,4) ]), Group([ (1,2,5), (1,2)(3,4) ]), Group([ (1,3,4), (1,4)(2,5) ]), Group([ (1,2,4,5,3), (2,3)(4,5) ]), Group([ (1,4,2,3,5), (1,5)(3,4) ]), Group([ (1,2,5,3,4), (2,4)(3,5) ]), Group([ (1,5,2,4,3), (1,3)(4,5) ]), Group([ (1,4,5,2,3), (1,4)(3,5) ]), Group([ (1,2,3,4,5), (2,5)(3,4) ]), Group([ (2,3)(4,5), (2,4)(3,5), (3,4,5) ]), Group([ (1,5)(3,4), (1,4)(3,5), (1,4,5) ]), Group([ (1,2)(3,4), (1,3)(2,4), (2,3,4) ]), Group([ (1,5)(2,3), (1,3)(2,5), (1,2,3) ]), Group([ (1,2)(4,5), (1,4)(2,5), (1,2,5) ]), Group([ (1,2,3,4,5), (3,4,5) ]) ]
gap> Center(G);
Group(())
gap> DerivedSubgroup(G);
Alt( [ 1 .. 5 ] )
gap> DerivedSubgroup(G);
Alt( [ 1 .. 5 ] )
gap> FrattiniSubgroup(G);
Group(())
gap> FittingSubgroup(G);
Group(())
gap> FittingSubgroup(G);
Group(())
gap> SolvableRadical(G);
Group(())
gap> Socle(G);
Expand All @@ -138,10 +138,10 @@
[ Alt( [ 1 .. 5 ] ) ]
gap> ChiefSeries(G);
[ Alt( [ 1 .. 5 ] ), Group(()) ]
gap> LowerCentralSeriesOfGroup(G);
[ Alt( [ 1 .. 5 ] ) ]
gap> UpperCentralSeriesOfGroup(G);
[ Group(()) ]
gap> LowerCentralSeriesOfGroup(G);
[ Alt( [ 1 .. 5 ] ) ]
gap> UpperCentralSeriesOfGroup(G);
[ Group(()) ]
gap> CharacterTable(G); # Output not guaranteed to exactly match the LMFDB table
CharacterTable( Alt( [ 1 .. 5 ] ) )
gap> 
gap> 
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