| Quellcodebibliothek Statistik Leitseite products/Sources/formale Sprachen/GAP/pkg/format/tst/ (Algebra von RWTH Aachen Version 4.15.1©) Datei vom 9.0.2024 mit Größe 4 kB |
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Quelle manual.example-6.tst Sprache: unbekannt |
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gap> START_TEST("");
# gap> G := SymmetricGroup(4); Sym( [ 1 .. 4 ] ) gap> SystemNormalizer(G); CarterSubgroup(G); Group([ (3,4) ]) Group([ (3,4), (1,3)(2,4), (1,2)(3,4) ]) gap> sup := Formation("Supersolvable"); formation of Supersolvable groups gap> KnownAttributesOfObject(sup); KnownPropertiesOfObject(sup); [ "NameOfFormation", "ScreenOfFormation" ] [ "IsIntegrated" ] gap> ScreenOfFormation(sup); <Operation "AbelianExponentResidual"> gap> ScreenOfFormation(sup)(G,2); ScreenOfFormation(sup)(G,3); Group([ (3,4), (2,4,3), (1,4)(2,3), (1,3)(2,4) ]) Group([ (2,4,3), (1,4)(2,3), (1,3)(2,4) ]) gap> ResidualWrtFormation(G, sup); Group([ (1,4)(2,3), (1,2)(3,4) ]) gap> KnownAttributesOfObject(sup); [ "NameOfFormation", "ScreenOfFormation", "ResidualFunctionOfFormation" ] gap> FNormalizerWrtFormation(G, sup); Group([ (3,4), (2,4,3) ]) gap> CoveringSubgroupWrtFormation(G, sup); Group([ (3,4), (2,4,3) ]) gap> ComputedResidualWrtFormations(G); [ formation of Supersolvable groups, Group([ (1,4)(2,3), (1,2)(3,4) ]) ] gap> ComputedFNormalizerWrtFormations(G); [ formation of Nilpotent groups, Group([ (3,4) ]), formation of Supersolvable groups, Group([ (3,4), (2,4,3) ]) ] gap> ComputedCoveringSubgroup2s(G); [ ] gap> ComputedCoveringSubgroup1s(G); [ formation of Nilpotent groups, Group([ (3,4), (1,3)(2,4), (1,2)(3,4) ]), formation of Supersolvable groups, Group([ (3,4), (2,4,3) ]) ] gap> s4 := SmallGroup(IdGroup(G)); <pc group of size 24 with 4 generators> gap> SystemNormalizer(s4); CarterSubgroup(s4); Group([ f1 ]) Group([ f1, f4, f3*f4 ]) gap> sl := SpecialLinearGroup(2,3); SL(2,3) gap> h := SmallGroup(IdGroup(sl)); <pc group of size 24 with 4 generators> gap> CarterSubgroup(sl); Size(last); <group of 2x2 matrices over GF(3)> 6 gap> SystemNormalizer(h); CarterSubgroup(h); Group([ f1, f4 ]) Group([ f1, f4 ]) gap> ab := Formation("Abelian"); formation of Abelian groups gap> KnownPropertiesOfObject(ab); KnownAttributesOfObject(ab); [ ] [ "NameOfFormation", "ResidualFunctionOfFormation" ] gap> nil2 := Formation("PNilpotent",2); formation of 2Nilpotent groups gap> KnownPropertiesOfObject(nil2); KnownAttributesOfObject(nil2); [ "IsIntegrated" ] [ "NameOfFormation", "ScreenOfFormation", "ResidualFunctionOfFormation" ] gap> form := ProductOfFormations(ab, nil2); formation of (AbelianBy2Nilpotent) groups gap> KnownAttributesOfObject(form); [ "NameOfFormation", "ResidualFunctionOfFormation" ] gap> form2 := ProductOfFormations(nil2, ab); formation of (2NilpotentByAbelian) groups gap> KnownAttributesOfObject(form2); [ "NameOfFormation", "ScreenOfFormation", "ResidualFunctionOfFormation" ] gap> ResidualWrtFormation(G, form); ResidualWrtFormation(G, form2); Group(()) Group([ (1,4)(2,3), (1,2)(3,4) ]) gap> KnownPropertiesOfObject(form2); [ ] gap> Integrated(form2); formation of (2NilpotentByAbelian)Int groups gap> FNormalizerWrtFormation(G, form2); CoveringSubgroupWrtFormation(G, form2); Group([ (3,4), (2,4,3) ]) Group([ (3,4), (2,4,3) ]) gap> KnownPropertiesOfObject(form2); [ ] gap> ComputedCoveringSubgroup1s(G); [ formation of (2NilpotentByAbelian)Int groups, Group([ (3,4), (2,4,3) ]), formation of Nilpotent groups, Group([ (3,4), (1,3)(2,4), (1,2)(3,4) ]), formation of Supersolvable groups, Group([ (3,4), (2,4,3) ]) ] gap> Length(ComputedResidualWrtFormations(G)); 10 gap> pig := Formation("PiGroups", [2,5]); formation of (2,5)-Group groups with support [ 2, 5 ] gap> form := Intersection(pig, nil2); formation of ((2,5)-GroupAnd2Nilpotent) groups with support [ 2, 5 ] gap> KnownAttributesOfObject(form); [ "NameOfFormation", "ScreenOfFormation", "SupportOfFormation", "ResidualFunctionOfFormation" ] gap> form3 := ChangedSupport(nil2, [2,5]); formation of Changed2Nilpotent[ 2, 5 ] groups gap> SupportOfFormation(form3); [ 2, 5 ] gap> form = form3; false gap> ProductOfFormations(Intersection(pig, nil2), sup); formation of (((2,5)-GroupAnd2Nilpotent)BySupersolvable) groups gap> Intersection(pig, ProductOfFormations(nil2, sup)); formation of ((2,5)-GroupAnd(2NilpotentBySupersolvable)) groups with support [ 2, 5 ] gap> preform := rec( name := "MyOwn", > fScreen := function( G, p) > return DerivedSubgroup( G ); > end); rec( fScreen := function( G, p ) ... end, name := "MyOwn" ) gap> form := Formation(preform); formation of MyOwn groups gap> KnownAttributesOfObject(form); KnownPropertiesOfObject(form); [ "NameOfFormation", "ScreenOfFormation" ] [ ] gap> SetIsIntegrated(form, true); gap> ResidualWrtFormation(G, form); Group([ (1,4)(2,3), (1,2)(3,4) ]) gap> FNormalizerWrtFormation(G, form); Group([ (3,4), (2,4,3) ]) gap> CoveringSubgroup1(G, form); Group([ (3,4), (2,4,3) ]) # gap> STOP_TEST( "" ,1); [ Dauer der Verarbeitung: 0.28 Sekunden (vorverarbeitet) ] |
2026-03-28