| Quellcodebibliothek Statistik Leitseite products/sources/formale Sprachen/GAP/pkg/xmod/doc/ (Algebra von RWTH Aachen Version 4.15.1©) Datei vom 10.6.2025 mit Größe 34 kB |
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Quelle manual.lab Sprache: unbekannt |
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\GAPDocLabFile{xmod}
\makelabel{xmod:Title page}{}{X7D2C85EC87DD46E5} \makelabel{xmod:Abstract}{}{X7AA6C5737B711C89} \makelabel{xmod:Copyright}{}{X81488B807F2A1CF1} \makelabel{xmod:Acknowledgements}{}{X82A988D47DFAFCFA} \makelabel{xmod:Table of Contents}{}{X8537FEB07AF2BEC8} \makelabel{xmod:Introduction}{1}{X7DFB63A97E67C0A1} \makelabel{xmod:2d-groups : crossed modules and cat1-groups}{2}{X7EB8288E8424F39F} \makelabel{xmod:Constructions for crossed modules}{2.1}{X7BAD9A7F7AFEEC89} \makelabel{xmod:Properties of crossed modules}{2.2}{X7CF622538749FE73} \makelabel{xmod:Pre-crossed modules}{2.3}{X7D435B6279032D4D} \makelabel{xmod:Cat1-groups and pre-cat1-groups}{2.4}{X7AAABC1D7E110988} \makelabel{xmod:Properties of cat1-groups and pre-cat1-groups}{2.5}{X8317816A8361F88 \makelabel{xmod:Enumerating cat1-groups with a given source}{2.6}{X80D6CB4080417BFA} \makelabel{xmod:Selection of a small cat1-group}{2.7}{X7A6A70BD86DE458D} \makelabel{xmod:More functions for crossed modules and cat1-groups}{2.8}{X8614CDCF8063 \makelabel{xmod:The group groupoid associated to a cat1-group}{2.9}{X7CFAB044817E5E91} \makelabel{xmod:2d-mappings}{3}{X815144D67C1D1AE3} \makelabel{xmod:Morphisms of 2-dimensional groups}{3.1}{X7BBEA95E7AE1F317} \makelabel{xmod:Morphisms of pre-crossed modules}{3.2}{X78CADE4D7EB1EA44} \makelabel{xmod:Morphisms of pre-cat1-groups}{3.3}{X7B9D3C1F7A395FF2} \makelabel{xmod:Operations on morphisms}{3.4}{X7B09A28579707CAF} \makelabel{xmod:Quasi-isomorphisms}{3.5}{X79C47E3D7855A117} \makelabel{xmod:Isoclinism of groups and crossed modules}{4}{X802AFE8E7EDB435E} \makelabel{xmod:More operations for crossed modules}{4.1}{X7E373BF3836B3A9C} \makelabel{xmod:Isoclinism for groups}{4.2}{X7B0D511A82FD945E} \makelabel{xmod:Isoclinism for crossed modules}{4.3}{X81338C977972AD83} \makelabel{xmod:Whitehead group of a crossed module}{5}{X85CD9A43847AE1B8} \makelabel{xmod:Derivations and Sections}{5.1}{X7C01AE7783898705} \makelabel{xmod:Whitehead Monoids and Groups}{5.2}{X861A52407D3C627D} \makelabel{xmod:Endomorphisms determined by a derivation}{5.3}{X7E53AF1884B2D03D} \makelabel{xmod:Whitehead groups for cat1-groups}{5.4}{X820501BF83D1D6D7} \makelabel{xmod:Actors of 2d-groups}{6}{X84C872BB7F1E5F25} \makelabel{xmod:Actor of a crossed module}{6.1}{X7B853602873FC7AB} \makelabel{xmod:Actor of a cat1-group}{6.2}{X81BFAD86831097E3} \makelabel{xmod:Induced constructions}{7}{X8339DF98872D2E1C} \makelabel{xmod:Coproducts of crossed modules}{7.1}{X80D3C8F97A10D5E5} \makelabel{xmod:Induced crossed modules}{7.2}{X7966FF497C36C465} \makelabel{xmod:Induced cat1-groups}{7.3}{X814A695779706E22} \makelabel{xmod:Crossed squares and Cat2-groups}{8}{X780368C083C76EDC} \makelabel{xmod:Definition of a crossed square and a crossed n-cube of groups}{8.1}{X7C4AF \makelabel{xmod:Constructions for crossed squares}{8.2}{X820A7D30847BC828} \makelabel{xmod:Substructures of Crossed Squares}{8.3}{X79A59CED7C69BF18} \makelabel{xmod:Morphisms of crossed squares}{8.4}{X78A79A7E85128C7B} \makelabel{xmod:Definitions and constructions for cat2-groups and their morphisms}{8.5} \makelabel{xmod:Enumerating cat2-groups with a given source}{8.6}{X80FB2B328578DE42} \makelabel{xmod:Cat3-groups and Crossed cubes}{9}{X7DBA3A7E81C71A64} \makelabel{xmod:Functions for (pre-)cat3-groups}{9.1}{X7CC52AF4840F478E} \makelabel{xmod:Enumerating cat3-groups with a given source}{9.2}{X80E074E37D02B2F6} \makelabel{xmod:Definition and constructions for catn-groups and their morphisms}{9.3}{ \makelabel{xmod:Crossed modules of groupoids}{10}{X80B3A81B7E5CA3A9} \makelabel{xmod:Constructions for crossed modules of groupoids}{10.1}{X847F4ED77F5052 \makelabel{xmod:Double Groupoids}{11}{X83B7E8A287C9284A} \makelabel{xmod:Constructions for Double Groupoids}{11.1}{X87AC8EF586C35CD4} \makelabel{xmod:Conversion of Basic Double Groupoids}{11.2}{X7D69B5A680FE4C81} \makelabel{xmod:Commutative double groupoids}{11.3}{X853B15F483477D5C} \makelabel{xmod:Applications}{12}{X7DD7F0847FF2B96C} \makelabel{xmod:Free Loop Spaces}{12.1}{X8575260A80F735BD} \makelabel{xmod:Interaction with HAP}{13}{X81EC8C8A82C15298} \makelabel{xmod:Calling HAP functions}{13.1}{X865CE53A827FBE6F} \makelabel{xmod:Utility functions}{14}{X810FFB1C8035C8BE} \makelabel{xmod:Mappings}{14.1}{X7C9734B880042C73} \makelabel{xmod:Abelian Modules}{14.2}{X852BD9CA84C2AFF0} \makelabel{xmod:Development history}{15}{X810C43BC7F63C4B4} \makelabel{xmod:Changes from version to version}{15.1}{X7ACE7E8384B73156} \makelabel{xmod:Version 1 for GAP 3}{15.1.1}{X848198AA862249C4} \makelabel{xmod:Version 2}{15.1.2}{X7CF8E72D80AAB54F} \makelabel{xmod:Version 2.001 for GAP 4}{15.1.3}{X7F9CE0487BB6F660} \makelabel{xmod:Induced crossed modules}{15.1.4}{X7966FF497C36C465} \makelabel{xmod:Versions 2.002 -- 2.006}{15.1.5}{X7E0B70FD82DC5BA8} \makelabel{xmod:Versions 2.007 -- 2.010}{15.1.6}{X7F6E650E85384C25} \makelabel{xmod:Versions for GAP [4.5 .. 4.12]}{15.2}{X80A8A3FB82048ADD} \makelabel{xmod:AllCat1s}{15.2.1}{X794BBE42839F2E18} \makelabel{xmod:Versions 2.43 - 2.56}{15.2.2}{X78C26CC27D48B1A8} \makelabel{xmod:Version 2.61}{15.2.3}{X8715310378F0F8D2} \makelabel{xmod:Versions 2.63 - 2.74}{15.2.4}{X87EE8E70786CAF46} \makelabel{xmod:Versions 2.75 - 2.85}{15.2.5}{X85F63D6979B72CA5} \makelabel{xmod:Versions 2.86 - 2.91}{15.2.6}{X81023EBF7CD2352E} \makelabel{xmod:Versions from 2.92}{15.2.7}{X87062F217BAC0B6E} \makelabel{xmod:What needs doing next?}{15.3}{X83D1530487593182} \makelabel{xmod:Bibliography}{Bib}{X7A6F98FD85F02BFE} \makelabel{xmod:References}{Bib}{X7A6F98FD85F02BFE} \makelabel{xmod:Index}{Ind}{X83A0356F839C696F} \makelabel{xmod:InfoXMod}{1}{X7DFB63A97E67C0A1} \makelabel{xmod:2d-domain}{2}{X7EB8288E8424F39F} \makelabel{xmod:2d-group}{2}{X7EB8288E8424F39F} \makelabel{xmod:crossed module}{2.1}{X7BAD9A7F7AFEEC89} \makelabel{xmod:XMod}{2.1.1}{X7C8175AE7F76B586} \makelabel{xmod:XModByBoundaryAndAction}{2.1.1}{X7C8175AE7F76B586} \makelabel{xmod:XModByNormalSubgroup}{2.1.2}{X83050ED686776933} \makelabel{xmod:XModByTrivialAction}{2.1.3}{X867B2D53832EF05E} \makelabel{xmod:XModByAutomorphismGroup}{2.1.4}{X78B14FDA817CCEEF} \makelabel{xmod:XModByInnerAutomorphismGroup}{2.1.4}{X78B14FDA817CCEEF} \makelabel{xmod:XModByGroupOfAutomorphisms}{2.1.4}{X78B14FDA817CCEEF} \makelabel{xmod:XModByCentralExtension}{2.1.5}{X7D0F6FAA7AF69844} \makelabel{xmod:XModByPullback}{2.1.6}{X84FA2B0A795B6997} \makelabel{xmod:XModByAbelianModule}{2.1.7}{X824631577864961E} \makelabel{xmod:DirectProduct for crossed modules}{2.1.8}{X81704DFB795C0D29} \makelabel{xmod:Source for crossed modules}{2.1.9}{X790248A67CB9C33A} \makelabel{xmod:Range for crossed modules}{2.1.9}{X790248A67CB9C33A} \makelabel{xmod:Boundary for crossed modules}{2.1.9}{X790248A67CB9C33A} \makelabel{xmod:XModAction for crossed modules of groups}{2.1.9}{X790248A67CB9C33A} \makelabel{xmod:AutoGroup}{2.1.9}{X790248A67CB9C33A} \makelabel{xmod:ImageElmXModAction}{2.1.10}{X7AF6602C87845F1D} \makelabel{xmod:Size2d for crossed modules}{2.1.11}{X7846A7D37957B89E} \makelabel{xmod:Name for crossed modules}{2.1.12}{X85516B19803C01C0} \makelabel{xmod:IdGroup for crossed modules}{2.1.12}{X85516B19803C01C0} \makelabel{xmod:ExternalSetXMod}{2.1.12}{X85516B19803C01C0} \makelabel{xmod:Display for a 2d-group}{2.1.12}{X85516B19803C01C0} \makelabel{xmod:Is2DimensionalDomain}{2.2}{X7CF622538749FE73} \makelabel{xmod:Is2DimensionalGroup}{2.2}{X7CF622538749FE73} \makelabel{xmod:IsTrivialAction2DimensionalGroup}{2.2}{X7CF622538749FE73} \makelabel{xmod:IsNormalSubgroup2DimensionalGroup}{2.2}{X7CF622538749FE73} \makelabel{xmod:IsCentralExtension2DimensionalGroup}{2.2}{X7CF622538749FE73} \makelabel{xmod:IsAutomorphismGroup2DimensionalGroup}{2.2}{X7CF622538749FE73} \makelabel{xmod:IsAbelianModule2DimensionalGroup}{2.2}{X7CF622538749FE73} \makelabel{xmod:IsXMod}{2.2.1}{X7E77E6B881B1CE50} \makelabel{xmod:IsPreXMod}{2.2.1}{X7E77E6B881B1CE50} \makelabel{xmod:Is2DimensionalGroup}{2.2.1}{X7E77E6B881B1CE50} \makelabel{xmod:IsPerm2DimensionalGroup}{2.2.1}{X7E77E6B881B1CE50} \makelabel{xmod:IsPc2DimensionalGroup}{2.2.1}{X7E77E6B881B1CE50} \makelabel{xmod:IsFp2DimensionalGroup}{2.2.1}{X7E77E6B881B1CE50} \makelabel{xmod:SubXMod}{2.2.2}{X7884284383284A87} \makelabel{xmod:TrivialSubXMod}{2.2.2}{X7884284383284A87} \makelabel{xmod:NormalSubXMods}{2.2.2}{X7884284383284A87} \makelabel{xmod:IsNormal for pre-crossed modules}{2.2.2}{X7884284383284A87} \makelabel{xmod:KernelCokernelXMod}{2.2.3}{X7D8165F77B23BCF6} \makelabel{xmod:pre-crossed module}{2.3}{X7D435B6279032D4D} \makelabel{xmod:PreXModByBoundaryAndAction}{2.3.1}{X8487BE427858C5C9} \makelabel{xmod:PreXModWithTrivialRange}{2.3.1}{X8487BE427858C5C9} \makelabel{xmod:SubPreXMod}{2.3.1}{X8487BE427858C5C9} \makelabel{xmod:Peiffer subgroup}{2.3.1}{X8487BE427858C5C9} \makelabel{xmod:PeifferSubgroup}{2.3.2}{X8527F4C07A8F359E} \makelabel{xmod:XModByPeifferQuotient}{2.3.2}{X8527F4C07A8F359E} \makelabel{xmod:cat1-group}{2.4}{X7AAABC1D7E110988} \makelabel{xmod:Cat1Group}{2.4.1}{X7CF4C37F87D27EBA} \makelabel{xmod:PreCat1Group}{2.4.1}{X7CF4C37F87D27EBA} \makelabel{xmod:PreCat1GroupByTailHeadEmbedding}{2.4.1}{X7CF4C37F87D27EBA} \makelabel{xmod:PreCat1GroupWithIdentityEmbedding}{2.4.1}{X7CF4C37F87D27EBA} \makelabel{xmod:Source for cat1-groups}{2.4.2}{X7C4FFC4086531157} \makelabel{xmod:Range for cat1-groups}{2.4.2}{X7C4FFC4086531157} \makelabel{xmod:TailMap}{2.4.2}{X7C4FFC4086531157} \makelabel{xmod:HeadMap}{2.4.2}{X7C4FFC4086531157} \makelabel{xmod:RangeEmbedding}{2.4.2}{X7C4FFC4086531157} \makelabel{xmod:KernelEmbedding}{2.4.2}{X7C4FFC4086531157} \makelabel{xmod:Boundary for cat1-groups}{2.4.2}{X7C4FFC4086531157} \makelabel{xmod:Name for cat1-groups}{2.4.2}{X7C4FFC4086531157} \makelabel{xmod:Size2d for cat1-groups}{2.4.2}{X7C4FFC4086531157} \makelabel{xmod:DiagonalCat1Group}{2.4.3}{X79944C7B87F767FD} \makelabel{xmod:TransposeCat1Group}{2.4.4}{X79385660821E54A3} \makelabel{xmod:TransposeIsomorphism}{2.4.4}{X79385660821E54A3} \makelabel{xmod:Cat1GroupByPeifferQuotient}{2.4.5}{X87544FAD873672E1} \makelabel{xmod:SubCat1Group}{2.4.6}{X85D9C5F881DBA9FC} \makelabel{xmod:SubPreCat1Group}{2.4.6}{X85D9C5F881DBA9FC} \makelabel{xmod:DirectProduct for cat1-groups}{2.4.7}{X7CE4F14585F6D473} \makelabel{xmod:IsCat1Group}{2.5.1}{X78E03FAB84A57D03} \makelabel{xmod:IsPreXCat1Group}{2.5.1}{X78E03FAB84A57D03} \makelabel{xmod:IsIdentityCat1Group}{2.5.1}{X78E03FAB84A57D03} \makelabel{xmod:IsPreCat1GroupWithIdentityEmbedding}{2.5.2}{X7B7CF88F83B0129D} \makelabel{xmod:IsomorphicPreCat1GroupWithIdentityEmbedding}{2.5.2}{X7B7CF88F83B \makelabel{xmod:IsomorphismToPreCat1GroupWithIdentityEmbedding}{2.5.2}{X7B7CF88F \makelabel{xmod:Cat1GroupOfXMod}{2.5.3}{X82F10A59867C765D} \makelabel{xmod:XModOfCat1Group}{2.5.3}{X82F10A59867C765D} \makelabel{xmod:PreCat1GroupRecordOfPreXMod}{2.5.3}{X82F10A59867C765D} \makelabel{xmod:PreXModRecordOfPreCat1Group}{2.5.3}{X82F10A59867C765D} \makelabel{xmod:AllCat1GroupsWithImage}{2.6.1}{X7BDEBBF17CE6A6D4} \makelabel{xmod:AllCat1GroupsWithImageIterator}{2.6.1}{X7BDEBBF17CE6A6D4} \makelabel{xmod:AllCat1GroupsWithImageNumber}{2.6.1}{X7BDEBBF17CE6A6D4} \makelabel{xmod:AllCat1GroupsWithImageUpToIsomorphism}{2.6.1}{X7BDEBBF17CE6A6D4} \makelabel{xmod:AllCat1GroupsMatrix}{2.6.2}{X7FBFC8C87FC1AC5A} \makelabel{xmod:AllCat1GroupsIterator}{2.6.3}{X7FEB2FCE7D9ADA85} \makelabel{xmod:AllCat1GroupsUpToIsomorphism}{2.6.3}{X7FEB2FCE7D9ADA85} \makelabel{xmod:AllCat1Groups}{2.6.3}{X7FEB2FCE7D9ADA85} \makelabel{xmod:CatnGroupNumbers for cat1-groups}{2.6.4}{X7C6346A17FEEDFA1} \makelabel{xmod:CatnGroupLists for cat1-groups}{2.6.4}{X7C6346A17FEEDFA1} \makelabel{xmod:InitCatnGroupRecords}{2.6.4}{X7C6346A17FEEDFA1} \makelabel{xmod:selection of a small cat1-group}{2.7}{X7A6A70BD86DE458D} \makelabel{xmod:CAT1LISTMAXSIZE}{2.7}{X7A6A70BD86DE458D} \makelabel{xmod:CAT1LISTNUMBERS}{2.7}{X7A6A70BD86DE458D} \makelabel{xmod:Cat1Select}{2.7.1}{X7B8E67D880E380C8} \makelabel{xmod:IdGroup for 2d-groups}{2.8.1}{X7831DB527CF9DD57} \makelabel{xmod:StructureDescription for 2d-groups}{2.8.1}{X7831DB527CF9DD57} \makelabel{xmod:IsSubXMod}{2.8.2}{X83BBC6818168C282} \makelabel{xmod:IsSubPreXMod}{2.8.2}{X83BBC6818168C282} \makelabel{xmod:IsSubCat1Group}{2.8.2}{X83BBC6818168C282} \makelabel{xmod:IsSubPreCat1Group}{2.8.2}{X83BBC6818168C282} \makelabel{xmod:IsSub2DimensionalGroup}{2.8.2}{X83BBC6818168C282} \makelabel{xmod:GroupGroupoid}{2.9.1}{X7AF5AF668331321E} \makelabel{xmod:GroupGroupoidElement}{2.9.2}{X8578AB6D7C1FC4F3} \makelabel{xmod:2d-mapping}{3}{X815144D67C1D1AE3} \makelabel{xmod:morphism of 2d-group}{3.1}{X7BBEA95E7AE1F317} \makelabel{xmod:crossed module morphism}{3.1}{X7BBEA95E7AE1F317} \makelabel{xmod:Source for 2d-group mappings}{3.1.1}{X7FFD094F7FFB1F17} \makelabel{xmod:Range for 2d-group mappings}{3.1.1}{X7FFD094F7FFB1F17} \makelabel{xmod:SourceHom}{3.1.1}{X7FFD094F7FFB1F17} \makelabel{xmod:RangeHom}{3.1.1}{X7FFD094F7FFB1F17} \makelabel{xmod:morphism}{3.2}{X78CADE4D7EB1EA44} \makelabel{xmod:IsXModMorphism}{3.2.1}{X82B912B18127A42A} \makelabel{xmod:IsPreXModMorphism}{3.2.1}{X82B912B18127A42A} \makelabel{xmod:IsInjective for pre-xmod morphisms}{3.2.2}{X7E078F497F4EFA9F} \makelabel{xmod:IsSurjective for pre-xmod morphisms}{3.2.2}{X7E078F497F4EFA9F} \makelabel{xmod:IsSingleValued for pre-xmod morphisms}{3.2.2}{X7E078F497F4EFA9F} \makelabel{xmod:IsTotal for pre-xmod morphisms}{3.2.2}{X7E078F497F4EFA9F} \makelabel{xmod:IsBijective for pre-xmod morphisms}{3.2.2}{X7E078F497F4EFA9F} \makelabel{xmod:IsEndo2DimensionalMapping}{3.2.2}{X7E078F497F4EFA9F} \makelabel{xmod:XModMorphism}{3.2.3}{X7CEABD6487CF2A38} \makelabel{xmod:XModMorphismByGroupHomomorphisms}{3.2.3}{X7CEABD6487CF2A38} \makelabel{xmod:PreXModMorphism}{3.2.3}{X7CEABD6487CF2A38} \makelabel{xmod:PreXModMorphismByGroupHomomorphisms}{3.2.3}{X7CEABD6487CF2A38} \makelabel{xmod:InclusionMorphism2DimensionalDomains for crossed modules}{3.2.3}{X7 \makelabel{xmod:InnerAutomorphismXMod}{3.2.3}{X7CEABD6487CF2A38} \makelabel{xmod:IdentityMapping for pre-xmods}{3.2.3}{X7CEABD6487CF2A38} \makelabel{xmod:display a 2d-mapping}{3.2.3}{X7CEABD6487CF2A38} \makelabel{xmod:order of a 2d-automorphism}{3.2.3}{X7CEABD6487CF2A38} \makelabel{xmod:IsomorphismPerm2DimensionalGroup for pre-xmod morphisms}{3.2.4}{X85 \makelabel{xmod:IsomorphismPc2DimensionalGroup for pre-xmod morphisms}{3.2.4}{X854F \makelabel{xmod:IsomorphismByIsomorphisms}{3.2.4}{X854FC0C781AD62EC} \makelabel{xmod:MorphismOfPullback for a crossed module by pullback}{3.2.5}{X87BCAAF78 \makelabel{xmod:IsCat1GroupMorphism}{3.3.1}{X7C47D0EC782D4C40} \makelabel{xmod:IsPreCat1GroupMorphism}{3.3.1}{X7C47D0EC782D4C40} \makelabel{xmod:Cat1GroupMorphism}{3.3.1}{X7C47D0EC782D4C40} \makelabel{xmod:Cat1GroupMorphismByGroupHomomorphisms}{3.3.1}{X7C47D0EC782D4C40} \makelabel{xmod:PreCat1GroupMorphism}{3.3.1}{X7C47D0EC782D4C40} \makelabel{xmod:PreCat1GroupMorphismByGroupHomomorphisms}{3.3.1}{X7C47D0EC782D4C \makelabel{xmod:InclusionMorphism2DimensionalDomains for cat1-groups}{3.3.1}{X7C47 \makelabel{xmod:InnerAutomorphismCat1}{3.3.1}{X7C47D0EC782D4C40} \makelabel{xmod:IdentityMapping for precat1-morphisms}{3.3.1}{X7C47D0EC782D4C40} \makelabel{xmod:Cat1GroupMorphismOfXModMorphism}{3.3.2}{X7D7459E67B568B44} \makelabel{xmod:XModMorphismOfCat1GroupMorphism}{3.3.2}{X7D7459E67B568B44} \makelabel{xmod:IsomorphismPermObject}{3.3.3}{X7C6AF7C285D546B2} \makelabel{xmod:IsomorphismPerm2DimensionalGroup for pre-cat1 morphisms}{3.3.3}{X7C \makelabel{xmod:IsomorphismFp2DimensionalGroup for pre-cat1 morphisms}{3.3.3}{X7C6A \makelabel{xmod:IsomorphismPc2DimensionalGroup for pre-cat1 morphisms}{3.3.3}{X7C6A \makelabel{xmod:RegularActionHomomorphism2DimensionalGroup for pre-cat1 morphisms}{ \makelabel{xmod:SmallerDegreePermutationRepresentation2DimensionalGroup for perm 2d \makelabel{xmod:operations on morphisms}{3.4}{X7B09A28579707CAF} \makelabel{xmod:CompositionMorphism}{3.4.1}{X811F886081AAB95F} \makelabel{xmod:Kernel for 2d-mappings}{3.4.2}{X83C3A2478159DE76} \makelabel{xmod:Kernel2DimensionalMapping}{3.4.2}{X83C3A2478159DE76} \makelabel{xmod:quasi isomorphisms}{3.5}{X79C47E3D7855A117} \makelabel{xmod:QuotientQuasiIsomorphism}{3.5.1}{X86F08B1981618400} \makelabel{xmod:SubQuasiIsomorphism}{3.5.2}{X7C4C1C587B8932A7} \makelabel{xmod:QuasiIsomorphism}{3.5.3}{X83365AF2812E5C04} \makelabel{xmod:FactorPreXMod}{4.1.1}{X873ED97185D9176E} \makelabel{xmod:NaturalMorphismByNormalSubPreXMod}{4.1.1}{X873ED97185D9176E} \makelabel{xmod:IntersectionSubXMods}{4.1.2}{X8591E25680C5C575} \makelabel{xmod:Displacement}{4.1.3}{X7E20208279038BB8} \makelabel{xmod:DisplacementGroup}{4.1.3}{X7E20208279038BB8} \makelabel{xmod:DisplacementSubgroup}{4.1.3}{X7E20208279038BB8} \makelabel{xmod:CommutatorSubXMod}{4.1.4}{X86ACB83E7D70C625} \makelabel{xmod:CrossActionSubgroup}{4.1.4}{X86ACB83E7D70C625} \makelabel{xmod:DerivedSubXMod}{4.1.5}{X86E0804B780A7FD6} \makelabel{xmod:FixedPointSubgroupXMod}{4.1.6}{X85640DD17F5A2949} \makelabel{xmod:StabilizerSubgroupXMod}{4.1.6}{X85640DD17F5A2949} \makelabel{xmod:CentreXMod}{4.1.7}{X7B57446086BA1BF0} \makelabel{xmod:Centralizer}{4.1.7}{X7B57446086BA1BF0} \makelabel{xmod:Normalizer}{4.1.7}{X7B57446086BA1BF0} \makelabel{xmod:CentralQuotient}{4.1.8}{X814D9E1E78EEE665} \makelabel{xmod:IsAbelian2DimensionalGroup}{4.1.9}{X7F4222757B0E08B6} \makelabel{xmod:IsAspherical2DimensionalGroup}{4.1.9}{X7F4222757B0E08B6} \makelabel{xmod:IsSimplyConnected2DimensionalGroup}{4.1.9}{X7F4222757B0E08B6} \makelabel{xmod:IsFaithful2DimensionalGroup}{4.1.9}{X7F4222757B0E08B6} \makelabel{xmod:LowerCentralSeriesOfXMod}{4.1.10}{X87C524C08588AAC0} \makelabel{xmod:IsNilpotent2DimensionalGroup}{4.1.10}{X87C524C08588AAC0} \makelabel{xmod:NilpotencyClass2DimensionalGroup}{4.1.10}{X87C524C08588AAC0} \makelabel{xmod:IsomorphismXMods}{4.1.11}{X7C67623F797A0301} \makelabel{xmod:AllXMods}{4.1.12}{X81EE2188863E6E85} \makelabel{xmod:AllXModsWithGroups}{4.1.12}{X81EE2188863E6E85} \makelabel{xmod:AllXModsUpToIsomorphism}{4.1.12}{X81EE2188863E6E85} \makelabel{xmod:IsomorphismClassRepresentatives2dGroups}{4.1.12}{X81EE2188863E6E \makelabel{xmod:Isoclinism for groups}{4.2.1}{X7B0D511A82FD945E} \makelabel{xmod:AreIsoclinicDomains for groups}{4.2.1}{X7B0D511A82FD945E} \makelabel{xmod:IsStemDomain for groups}{4.2.2}{X7C72991985B58DB8} \makelabel{xmod:IsoclinicStemDomain for groups}{4.2.2}{X7C72991985B58DB8} \makelabel{xmod:AllStemGroupIds}{4.2.2}{X7C72991985B58DB8} \makelabel{xmod:AllStemGroupFamilies}{4.2.2}{X7C72991985B58DB8} \makelabel{xmod:IsoclinicRank for groups}{4.2.3}{X82DD52587F81C95C} \makelabel{xmod:IsoclinicMiddleLength for groups}{4.2.3}{X82DD52587F81C95C} \makelabel{xmod:Isoclinism for crossed modules}{4.3.1}{X81338C977972AD83} \makelabel{xmod:AreIsoclinicDomains for crossed modules of groups}{4.3.1}{X81338C9779 \makelabel{xmod:IsStemDomain for crossed modules of groups}{4.3.2}{X7E86DCB083CA5915} \makelabel{xmod:IsoclinicStemDomain for crossed modules of groups}{4.3.2}{X7E86DCB083 \makelabel{xmod:IsoclinicRank for crossed modules of groups}{4.3.3}{X820C412679910975 \makelabel{xmod:IsoclinicMiddleLength for crossed modules of groups}{4.3.3}{X820C4126 \makelabel{xmod:up 2d-mapping of 2d-group}{5}{X85CD9A43847AE1B8} \makelabel{xmod:derivation, of crossed module}{5.1}{X7C01AE7783898705} \makelabel{xmod:Whitehead monoid}{5.1}{X7C01AE7783898705} \makelabel{xmod:regular derivation}{5.1}{X7C01AE7783898705} \makelabel{xmod:Whitehead group}{5.1}{X7C01AE7783898705} \makelabel{xmod:section, of cat1-group}{5.1}{X7C01AE7783898705} \makelabel{xmod:Whitehead multiplication}{5.1}{X7C01AE7783898705} \makelabel{xmod:DerivationByImages}{5.1.1}{X83EC6F7780F5636E} \makelabel{xmod:IsDerivation}{5.1.1}{X83EC6F7780F5636E} \makelabel{xmod:IsUp2DimensionalMapping}{5.1.1}{X83EC6F7780F5636E} \makelabel{xmod:UpGeneratorImages}{5.1.1}{X83EC6F7780F5636E} \makelabel{xmod:UpImagePositions}{5.1.1}{X83EC6F7780F5636E} \makelabel{xmod:Object2d}{5.1.1}{X83EC6F7780F5636E} \makelabel{xmod:DerivationImage}{5.1.1}{X83EC6F7780F5636E} \makelabel{xmod:PrincipalDerivation}{5.1.2}{X7F119F9580C150B1} \makelabel{xmod:SectionByHomomorphism}{5.1.3}{X7E1C72897CD31D66} \makelabel{xmod:IsSection}{5.1.3}{X7E1C72897CD31D66} \makelabel{xmod:UpHomomorphism}{5.1.3}{X7E1C72897CD31D66} \makelabel{xmod:SectionByDerivation}{5.1.3}{X7E1C72897CD31D66} \makelabel{xmod:DerivationBySection}{5.1.3}{X7E1C72897CD31D66} \makelabel{xmod:IdentityDerivation}{5.1.4}{X87D9F7257DFF0236} \makelabel{xmod:IdentitySection}{5.1.4}{X87D9F7257DFF0236} \makelabel{xmod:WhiteheadProduct}{5.1.5}{X7AD6E23F8254F400} \makelabel{xmod:WhiteheadOrder}{5.1.5}{X7AD6E23F8254F400} \makelabel{xmod:IsMonoidOfUp2DimensionalMappingsObj}{5.2}{X861A52407D3C627D} \makelabel{xmod:AllDerivations}{5.2.1}{X788884E48534F7CB} \makelabel{xmod:ImagesList}{5.2.1}{X788884E48534F7CB} \makelabel{xmod:DerivationClass}{5.2.1}{X788884E48534F7CB} \makelabel{xmod:ImagesTable}{5.2.1}{X788884E48534F7CB} \makelabel{xmod:WhiteheadMonoidTable}{5.2.2}{X7CB1614E7EC58A84} \makelabel{xmod:WhiteheadTransformationMonoid}{5.2.2}{X7CB1614E7EC58A84} \makelabel{xmod:RegularDerivations}{5.2.3}{X84CD856C84BDB019} \makelabel{xmod:WhiteheadGroupTable}{5.2.3}{X84CD856C84BDB019} \makelabel{xmod:WhiteheadPermGroup}{5.2.3}{X84CD856C84BDB019} \makelabel{xmod:IsWhiteheadPermGroup}{5.2.3}{X84CD856C84BDB019} \makelabel{xmod:WhiteheadRegularGroup}{5.2.3}{X84CD856C84BDB019} \makelabel{xmod:WhiteheadGroupIsomorphism}{5.2.3}{X84CD856C84BDB019} \makelabel{xmod:PrincipalDerivations}{5.2.4}{X8452E45878691CD3} \makelabel{xmod:PrincipalDerivationSubgroup}{5.2.4}{X8452E45878691CD3} \makelabel{xmod:WhiteheadHomomorphism}{5.2.4}{X8452E45878691CD3} \makelabel{xmod:SourceEndomorphism}{5.3.1}{X86AF32CA84217C46} \makelabel{xmod:RangeEndomorphism}{5.3.2}{X84463DE2872AA709} \makelabel{xmod:Object2dEndomorphism}{5.3.3}{X7E27AE6478566A94} \makelabel{xmod:AllSections}{5.4.1}{X813CAA17855172E4} \makelabel{xmod:RegularSections}{5.4.1}{X813CAA17855172E4} \makelabel{xmod:actor}{6.1}{X7B853602873FC7AB} \makelabel{xmod:AutomorphismPermGroup}{6.1.1}{X80F121357F06E72D} \makelabel{xmod:GeneratingAutomorphisms}{6.1.1}{X80F121357F06E72D} \makelabel{xmod:PermAutomorphismAs2dGroupMorphism}{6.1.1}{X80F121357F06E72D} \makelabel{xmod:WhiteheadXMod}{6.1.2}{X790EBC7C7D320C03} \makelabel{xmod:LueXMod}{6.1.2}{X790EBC7C7D320C03} \makelabel{xmod:NorrieXMod}{6.1.2}{X790EBC7C7D320C03} \makelabel{xmod:ActorXMod}{6.1.2}{X790EBC7C7D320C03} \makelabel{xmod:crossed square}{6.1.2}{X790EBC7C7D320C03} \makelabel{xmod:XModCentre}{6.1.3}{X85CF21F57F0F1329} \makelabel{xmod:InnerActorXMod}{6.1.3}{X85CF21F57F0F1329} \makelabel{xmod:InnerMorphism}{6.1.3}{X85CF21F57F0F1329} \makelabel{xmod:ActorCat1Group}{6.2.1}{X82097EE1866D0C2B} \makelabel{xmod:InnerActorCat1Group}{6.2.1}{X82097EE1866D0C2B} \makelabel{xmod:Actor}{6.2.2}{X7FE056707BB983B3} \makelabel{xmod:InnerActor}{6.2.2}{X7FE056707BB983B3} \makelabel{xmod:CoproductXMod}{7.1.1}{X7C01F5D98046E44B} \makelabel{xmod:CoproductInfo}{7.1.1}{X7C01F5D98046E44B} \makelabel{xmod:induced crossed module}{7.2}{X7966FF497C36C465} \makelabel{xmod:InducedXMod}{7.2.1}{X874CB2A278AADE3A} \makelabel{xmod:IsInducedXMod}{7.2.1}{X874CB2A278AADE3A} \makelabel{xmod:InducedXModBySurjection}{7.2.1}{X874CB2A278AADE3A} \makelabel{xmod:InducedXModByCopower}{7.2.1}{X874CB2A278AADE3A} \makelabel{xmod:MorphismOfInducedXMod}{7.2.1}{X874CB2A278AADE3A} \makelabel{xmod:AllInducedXMods}{7.2.2}{X7B24D47F8078540F} \makelabel{xmod:induced cat1-groups}{7.3}{X814A695779706E22} \makelabel{xmod:InducedCat1Group}{7.3.1}{X7BCE57BE7F6E6B08} \makelabel{xmod:InducedCat1GroupByFreeProduct}{7.3.1}{X7BCE57BE7F6E6B08} \makelabel{xmod:3d-group}{8}{X780368C083C76EDC} \makelabel{xmod:3d-domain}{8}{X780368C083C76EDC} \makelabel{xmod:crossed square}{8.1}{X7C4AFE8D85848C8F} \makelabel{xmod:crossed pairing}{8.1}{X7C4AFE8D85848C8F} \makelabel{xmod:crossed n-cube}{8.1}{X7C4AFE8D85848C8F} \makelabel{xmod:CrossedSquareByXMods}{8.2.1}{X866A7FAC7FCB62C2} \makelabel{xmod:PreCrossedSquareByPreXMods}{8.2.1}{X866A7FAC7FCB62C2} \makelabel{xmod:Display for a 3d-group}{8.2.1}{X866A7FAC7FCB62C2} \makelabel{xmod:Size3d for 3d-objects}{8.2.2}{X7FA98BD47FF9B044} \makelabel{xmod:CrossedSquareByNormalSubgroups}{8.2.3}{X7896DAF786F46234} \makelabel{xmod:CrossedPairingByCommutators}{8.2.3}{X7896DAF786F46234} \makelabel{xmod:CrossedSquareByNormalSubXMod}{8.2.4}{X7FA367977B1895A7} \makelabel{xmod:CrossedPairingBySingleXModAction}{8.2.4}{X7FA367977B1895A7} \makelabel{xmod:ActorCrossedSquare}{8.2.5}{X833362FE87ED3C48} \makelabel{xmod:CrossedPairingByDerivations}{8.2.5}{X833362FE87ED3C48} \makelabel{xmod:CrossedSquareByAutomorphismGroup}{8.2.6}{X82E4EA93824F7B26} \makelabel{xmod:CrossedPairingByConjugators}{8.2.6}{X82E4EA93824F7B26} \makelabel{xmod:CrossedSquareByPullback}{8.2.7}{X839E065783795CB8} \makelabel{xmod:CrossedSquareByXModSplitting}{8.2.8}{X7F5554907AF73190} \makelabel{xmod:CrossedPairingByPreImages}{8.2.8}{X7F5554907AF73190} \makelabel{xmod:CrossedSquare}{8.2.9}{X87FBE3CE87DC8CD5} \makelabel{xmod:Transpose3DimensionalGroup for crossed squares}{8.2.10}{X7F94830681 \makelabel{xmod:CentralQuotient for crossed modules}{8.2.11}{X7C2647CB82DDD065} \makelabel{xmod:IsCrossedSquare}{8.2.12}{X8645AA3686F126D5} \makelabel{xmod:IsPreCrossedSquare}{8.2.12}{X8645AA3686F126D5} \makelabel{xmod:Is3dObject}{8.2.12}{X8645AA3686F126D5} \makelabel{xmod:IsPerm3dObject}{8.2.12}{X8645AA3686F126D5} \makelabel{xmod:IsPc3dObject}{8.2.12}{X8645AA3686F126D5} \makelabel{xmod:IsFp3dObject}{8.2.12}{X8645AA3686F126D5} \makelabel{xmod:Up2DimensionalGroup for crossed squares}{8.2.13}{X828CFC5A83097189} \makelabel{xmod:Left2DimensionalGroup for crossed squares}{8.2.13}{X828CFC5A8309718 \makelabel{xmod:Down2DimensionalGroup for crossed squares}{8.2.13}{X828CFC5A8309718 \makelabel{xmod:Right2DimensionalGroup for crossed squares}{8.2.13}{X828CFC5A830971 \makelabel{xmod:CrossDiagonalActions for crossed squares}{8.2.13}{X828CFC5A83097189 \makelabel{xmod:Diagonal2DimensionalGroup for crossed squares}{8.2.13}{X828CFC5A830 \makelabel{xmod:Name}{8.2.13}{X828CFC5A83097189} \makelabel{xmod:IsSymmetric3DimensionalGroup}{8.2.14}{X7F81DA90820F4405} \makelabel{xmod:IsAbelian3DimensionalGroup}{8.2.14}{X7F81DA90820F4405} \makelabel{xmod:IsTrivialAction3DimensionalGroup}{8.2.14}{X7F81DA90820F4405} \makelabel{xmod:IsNormalSub3DimensionalGroup}{8.2.14}{X7F81DA90820F4405} \makelabel{xmod:IsCentralExtension3DimensionalGroup}{8.2.14}{X7F81DA90820F4405} \makelabel{xmod:IsAutomorphismGroup3DimensionalGroup}{8.2.14}{X7F81DA90820F4405} \makelabel{xmod:Crossed Pairing}{8.2.15}{X7AE671C7798F99FD} \makelabel{xmod:SubCrossedSquare}{8.3.1}{X83F16E94857407F3} \makelabel{xmod:IsSubCrossedSquare}{8.3.1}{X83F16E94857407F3} \makelabel{xmod:SubPreCrossedSquare}{8.3.1}{X83F16E94857407F3} \makelabel{xmod:IsSubPreCrossedSquare}{8.3.1}{X83F16E94857407F3} \makelabel{xmod:TrivialSub3DimensionalGroup}{8.3.2}{X7D0D7F787D438D9A} \makelabel{xmod:TrivialSubCrossedSquare}{8.3.2}{X7D0D7F787D438D9A} \makelabel{xmod:TrivialSubPreCrossedSquare}{8.3.2}{X7D0D7F787D438D9A} \makelabel{xmod:morphism of 3d-group}{8.4}{X78A79A7E85128C7B} \makelabel{xmod:crossed square morphism}{8.4}{X78A79A7E85128C7B} \makelabel{xmod:3d-mapping}{8.4}{X78A79A7E85128C7B} \makelabel{xmod:CrossedSquareMorphism}{8.4.1}{X83E733547A14FD61} \makelabel{xmod:CrossedSquareMorphismByXModMorphisms}{8.4.1}{X83E733547A14FD61} \makelabel{xmod:CrossedSquareMorphismByGroupHomomorphisms}{8.4.1}{X83E733547A14F \makelabel{xmod:PreCrossedSquareMorphismByPreXModMorphisms}{8.4.1}{X83E733547A14 \makelabel{xmod:PreCrossedSquareMorphismByGroupHomomorphisms}{8.4.1}{X83E733547A \makelabel{xmod:Source}{8.4.2}{X7DE8173F80E07AB1} \makelabel{xmod:Range}{8.4.2}{X7DE8173F80E07AB1} \makelabel{xmod:Up2DimensionalMorphism}{8.4.2}{X7DE8173F80E07AB1} \makelabel{xmod:Left2DimensionalMorphism}{8.4.2}{X7DE8173F80E07AB1} \makelabel{xmod:Down2DimensionalMorphism}{8.4.2}{X7DE8173F80E07AB1} \makelabel{xmod:Right2DimensionalMorphism}{8.4.2}{X7DE8173F80E07AB1} \makelabel{xmod:IsCrossedSquareMorphism}{8.4.3}{X8284240C7B9BB783} \makelabel{xmod:IsPreCrossedSquareMorphism}{8.4.3}{X8284240C7B9BB783} \makelabel{xmod:IsBijective}{8.4.3}{X8284240C7B9BB783} \makelabel{xmod:IsEndomorphism3dObject}{8.4.3}{X8284240C7B9BB783} \makelabel{xmod:IsAutomorphism3dObject}{8.4.3}{X8284240C7B9BB783} \makelabel{xmod:InclusionMorphismHigherDimensionalDomains}{8.4.4}{X8614E38E7A676 \makelabel{xmod:cat2-group}{8.5}{X86D5AA247B64ED51} \makelabel{xmod:Cat2Group}{8.5.1}{X849D845586F92444} \makelabel{xmod:PreCat2Group}{8.5.1}{X849D845586F92444} \makelabel{xmod:IsCat2Group}{8.5.1}{X849D845586F92444} \makelabel{xmod:PreCat2GroupByPreCat1Groups}{8.5.1}{X849D845586F92444} \makelabel{xmod:Up2DimensionalGroup for cat2-groups}{8.5.2}{X81BD4011837BCC2E} \makelabel{xmod:Left2DimensionalGroup for cat2-groups}{8.5.2}{X81BD4011837BCC2E} \makelabel{xmod:Down2DimensionalGroup for cat2-groups}{8.5.2}{X81BD4011837BCC2E} \makelabel{xmod:Right2DimensionalGroup for cat2-groups}{8.5.2}{X81BD4011837BCC2E} \makelabel{xmod:Diagonal2DimensionalGroup for cat2-groups}{8.5.2}{X81BD4011837BCC2 \makelabel{xmod:DirectProduct}{8.5.3}{X861BA02C7902A4F4} \makelabel{xmod:DisplayLeadMaps}{8.5.4}{X85713B1C7C34324E} \makelabel{xmod:Transpose3DimensionalGroup for cat2-groups}{8.5.5}{X864B346686AAA5 \makelabel{xmod:Cat2GroupMorphism}{8.5.6}{X83616C237F4745FB} \makelabel{xmod:Cat2GroupMorphismByCat1GroupMorphisms}{8.5.6}{X83616C237F4745FB} \makelabel{xmod:Cat2GroupMorphismByGroupHomomorphisms}{8.5.6}{X83616C237F4745FB} \makelabel{xmod:PreCat2GroupMorphism}{8.5.6}{X83616C237F4745FB} \makelabel{xmod:PreCat2GroupMorphismByPreCat1GroupMorphisms}{8.5.6}{X83616C237F4 \makelabel{xmod:PreCat2GroupMorphismByGroupHomomorphisms}{8.5.6}{X83616C237F4745 \makelabel{xmod:Cat2GroupOfCrossedSquare}{8.5.7}{X7D46CB517FCAA83B} \makelabel{xmod:CrossedSquareOfCat2Group}{8.5.7}{X7D46CB517FCAA83B} \makelabel{xmod:Subdiagonal2DimensionalGroup}{8.5.8}{X82F896C7851294B7} \makelabel{xmod:SubCat2Group}{8.5.9}{X7DB082D282C52855} \makelabel{xmod:IsSubCat2Group}{8.5.9}{X7DB082D282C52855} \makelabel{xmod:SubPreCat2Group}{8.5.9}{X7DB082D282C52855} \makelabel{xmod:IsSubPreCat2Group}{8.5.9}{X7DB082D282C52855} \makelabel{xmod:TrivialSubCat2Group}{8.5.10}{X838423B47FEE09B2} \makelabel{xmod:TrivialSubPreCat2Group}{8.5.10}{X838423B47FEE09B2} \makelabel{xmod:AllCat2GroupsWithImagesIterator}{8.6.1}{X7D421DE57B44F37A} \makelabel{xmod:AllCat2GroupsWithImagesNumber}{8.6.1}{X7D421DE57B44F37A} \makelabel{xmod:AllCat2GroupsWithImages}{8.6.1}{X7D421DE57B44F37A} \makelabel{xmod:AllCat2GroupsWithImagesUpToIsomorphism}{8.6.1}{X7D421DE57B44F37A \makelabel{xmod:AllCat2GroupsWithFixedUp}{8.6.2}{X783F7FEB7B79B062} \makelabel{xmod:AllCat2GroupsWithFixedUpAndLeftRange}{8.6.2}{X783F7FEB7B79B062} \makelabel{xmod:AllCat2GroupsMatrix}{8.6.3}{X84636E047CDF2DF3} \makelabel{xmod:AllCat2GroupsIterator}{8.6.4}{X7EFCF9697E845B2C} \makelabel{xmod:AllCat2Groups}{8.6.4}{X7EFCF9697E845B2C} \makelabel{xmod:AllCat2GroupsUpToIsomorphism}{8.6.4}{X7EFCF9697E845B2C} \makelabel{xmod:AllCat2GroupFamilies}{8.6.4}{X7EFCF9697E845B2C} \makelabel{xmod:CatnGroupNumbers for cat2-groups}{8.6.4}{X7EFCF9697E845B2C} \makelabel{xmod:CatnGroupLists for cat2-groups}{8.6.4}{X7EFCF9697E845B2C} \makelabel{xmod:4d-group}{9}{X7DBA3A7E81C71A64} \makelabel{xmod:4d-domain}{9}{X7DBA3A7E81C71A64} \makelabel{xmod:cat3-group}{9}{X7DBA3A7E81C71A64} \makelabel{xmod:Cat3Group}{9.1.1}{X7828496F7D72E232} \makelabel{xmod:PreCat3Group}{9.1.1}{X7828496F7D72E232} \makelabel{xmod:IsCat3Group}{9.1.1}{X7828496F7D72E232} \makelabel{xmod:PreCat3GroupByPreCat2Groups}{9.1.1}{X7828496F7D72E232} \makelabel{xmod:Front3DimensionalGroup for cat3-groups}{9.1.2}{X85A5A6967D942463} \makelabel{xmod:Left3DimensionalGroup for cat3-groups}{9.1.2}{X85A5A6967D942463} \makelabel{xmod:Up3DimensionalGroup for cat3-groups}{9.1.2}{X85A5A6967D942463} \makelabel{xmod:Right3DimensionalGroup for cat3-groups}{9.1.2}{X85A5A6967D942463} \makelabel{xmod:Down3DimensionalGroup for cat3-groups}{9.1.2}{X85A5A6967D942463} \makelabel{xmod:Back3DimensionalGroup for cat3-groups}{9.1.2}{X85A5A6967D942463} \makelabel{xmod:AllCat3GroupTriples}{9.2.1}{X83E4A7367DD13598} \makelabel{xmod:AllCat3GroupsNumber}{9.2.1}{X83E4A7367DD13598} \makelabel{xmod:AllCat3Groups}{9.2.1}{X83E4A7367DD13598} \makelabel{xmod:catn-group}{9.3}{X7F8538B580847268} \makelabel{xmod:PreCatnGroup}{9.3.1}{X81C3D39A81B20D76} \makelabel{xmod:CatnGroup}{9.3.1}{X81C3D39A81B20D76} \makelabel{xmod:crossed module of groupoids}{10}{X80B3A81B7E5CA3A9} \makelabel{xmod:crossed module over a groupoid}{10.1}{X847F4ED77F50528C} \makelabel{xmod:2dimensional-domain with objects}{10.1}{X847F4ED77F50528C} \makelabel{xmod:PreXModWithObjectsByBoundaryAndAction}{10.1.1}{X78F89CAB7A281B8F \makelabel{xmod:SinglePiecePreXModWithObjects}{10.1.2}{X86CD034F82F5F029} \makelabel{xmod:IsXModWithObjects}{10.1.3}{X7B76F2BF82E075FF} \makelabel{xmod:IsPreXModWithObjects}{10.1.3}{X7B76F2BF82E075FF} \makelabel{xmod:IsDirectProductWithCompleteDigraphDomain}{10.1.3}{X7B76F2BF82E07 \makelabel{xmod:Is2DimensionalGroupWithObjects}{10.1.3}{X7B76F2BF82E075FF} \makelabel{xmod:IsPermPreXModWithObjects}{10.1.4}{X858EB4F97D04D012} \makelabel{xmod:IsPcPreXModWithObjects}{10.1.4}{X858EB4F97D04D012} \makelabel{xmod:IsFpPreXModWithObjects}{10.1.4}{X858EB4F97D04D012} \makelabel{xmod:Root2dGroup}{10.1.5}{X797B1CD07C3682EE} \makelabel{xmod:XModAction for crossed modules of groupoids}{10.1.5}{X797B1CD07C3682E \makelabel{xmod:ObjectList}{10.1.5}{X797B1CD07C3682EE} \makelabel{xmod:SinglePieceDoubleGroupoid}{11.1.1}{X78936F448231692E} \makelabel{xmod:SquareOfArrows}{11.1.2}{X823A3A7481B90EB7} \makelabel{xmod:HorizontalProduct}{11.1.3}{X7D3737FA7E9E3ECA} \makelabel{xmod:VerticalProduct}{11.1.4}{X873F01287A2DC41F} \makelabel{xmod:EnhancedBasicDoubleGroupoid}{11.2.1}{X7CB177EF78B559DB} \makelabel{xmod:DoubleGroupoidWithZeroBoundary}{11.3.1}{X7DC35C557E498880} \makelabel{xmod:loop space}{12.1}{X8575260A80F735BD} \makelabel{xmod:free loop space}{12.1}{X8575260A80F735BD} \makelabel{xmod:LoopClasses}{12.1.1}{X87781C76804E783E} \makelabel{xmod:LoopsXMod}{12.1.1}{X87781C76804E783E} \makelabel{xmod:AllLoopsXMod}{12.1.1}{X87781C76804E783E} \makelabel{xmod:SmallCat1Group}{13.1.1}{X8699357D7DC6279E} \makelabel{xmod:CatOneGroupToXMod}{13.1.2}{X7B00E3FB82DC305D} \makelabel{xmod:Cat1GroupToHAP}{13.1.2}{X7B00E3FB82DC305D} \makelabel{xmod:IdCat1Group}{13.1.3}{X84B7160284FD454A} \makelabel{xmod:inclusion mapping}{14.1}{X7C9734B880042C73} \makelabel{xmod:restriction mapping}{14.1}{X7C9734B880042C73} \makelabel{xmod:InclusionMappingGroups}{14.1.1}{X7F8E297F7C84DE51} \makelabel{xmod:MappingToOne}{14.1.1}{X7F8E297F7C84DE51} \makelabel{xmod:InnerAutomorphismsByNormalSubgroup}{14.1.2}{X81D29E737F3D4878} \makelabel{xmod:IsGroupOfAutomorphisms}{14.1.3}{X7FC631B786C1DC8B} \makelabel{xmod:abelian module}{14.2}{X852BD9CA84C2AFF0} \makelabel{xmod:AbelianModuleObject}{14.2.1}{X806DEFCC859BB4F1} \makelabel{xmod:IsAbelianModule}{14.2.1}{X806DEFCC859BB4F1} \makelabel{xmod:AbelianModuleGroup}{14.2.1}{X806DEFCC859BB4F1} \makelabel{xmod:AbelianModuleAction}{14.2.1}{X806DEFCC859BB4F1} \makelabel{xmod:version 1 for GAP 3}{15.1.1}{X848198AA862249C4} \makelabel{xmod:version 2.001 for GAP 4}{15.1.3}{X7F9CE0487BB6F660} [ Dauer der Verarbeitung: 0.23 Sekunden (vorverarbeitet) ] |
2026-03-28