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##
#W  gp2up.gd                   GAP4 package `XMod'              Chris Wensley
#W                                                                & Murat Alp
##
##  This file contains declarations for UpMappings, Derivations and Sections
##
#Y  Copyright (C) 2001-2024, Chris Wensley et al,

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##
#C  IsUp2DimensionalMapping( <map> )
#R  IsUp2DimensionalMappingRep( <map> )
##
##  A section|derivation is determined by a cat1-group|xmod + generator images
##
DeclareCategory( "IsUp2DimensionalMapping", IsGeneralMapping );
DeclareRepresentation( "IsUp2DimensionalMappingRep",
    IsUp2DimensionalMapping and IsAttributeStoringRep,
    [ "Object2d", "UpGeneratorImages", "UpHomomorphism", "UpImagePositions" ] );

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##
#C  IsUp2DimensionalMappingCollection . . . . category of colls of up-2d-maps
#C  IsUp2DimensionalMappingCollColl . . . . . . .  category of colls of colls
#C  IsUp2DimensionalMappingCollCollColl . . . category of colls, colls, colls
#V  Up2DimensionalMappingFamily . . . . . family for derivations and sections
#T  Up2DimensionalMappingType( <map> )
##
DeclareCategoryCollections( "IsUp2DimensionalMapping" );
DeclareCategoryCollections( "IsUp2DimensionalMappingCollection" );
DeclareCategoryCollections( "IsUp2DimensionalMappingCollColl" );
BindGlobal( "Up2DimensionalMappingFamily",
    NewFamily( "Up2DimensionalMappingFamily", IsUp2DimensionalMapping,
               CanEasilySortElements, CanEasilySortElements ) );
BindGlobal( "Up2DimensionalMappingType",
            NewType( Up2DimensionalMappingFamily,
                     IsUp2DimensionalMappingRep ) );

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##
#A  Object2d( <map> )
#A  UpHomomorphism( <map> )
#A  UpGeneratorImages( <map> )
#A  UpImagePositions( <map> )
##
DeclareAttribute( "Object2d", IsObject );
DeclareAttribute( "UpHomomorphism", IsUp2DimensionalMapping );
DeclareAttribute( "UpGeneratorImages", IsUp2DimensionalMapping );
DeclareAttribute( "UpImagePositions", IsUp2DimensionalMapping );

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##
#P  IsDerivation( <map> )
#P  IsSection( <map> )
##
DeclareProperty( "IsDerivation", IsUp2DimensionalMapping );
DeclareProperty( "IsSection", IsUp2DimensionalMapping );

InstallTrueMethod( IsUp2DimensionalMapping, IsDerivation );
InstallTrueMethod( IsUp2DimensionalMapping, IsSection );

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##                               Derivations                               ##
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##
#O  DerivationByImages                                    sets up the mapping
#O  DerivationByImagesNC                                  sets up the mapping
##
DeclareOperation( "DerivationByImages",
    [ Is2DimensionalDomain, IsHomogeneousList ] );
DeclareOperation( "DerivationByImagesNC",
    [ Is2DimensionalDomain, IsHomogeneousList ] );
##  usage: DerivationByImages( XM, im, [, true|false ] )

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##
#O  DerivationImage                image of  r \in R  by the derivation  chi
##
DeclareOperation( "DerivationImage", [ IsDerivation, IsObject ] );

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#O  DerivationBySection    construct XMod derivation from cat1-group section
##
DeclareOperation( "DerivationBySection", [ IsSection ] );

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#O  IdentityDerivation        construct the identity derivation for an  XMod
#O  IdentitySection          construct the identity section for a cat1-group
##
DeclareAttribute( "IdentityDerivation", IsXMod );
DeclareAttribute( "IdentitySection", IsCat1Group );

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##
#O  PrincipalDerivation            derivation determined by choice of s in S
#A  PrincipalDerivations                     monoid of principal derivations
#A  PrincipalDerivationSubgroup          image of the Whitehead homomorphism
##
DeclareOperation( "PrincipalDerivation", [ IsXMod, IsObject ] );
DeclareAttribute( "PrincipalDerivations", IsXMod );
DeclareAttribute( "PrincipalDerivationSubgroup", IsXMod );

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#O  WhiteheadProduct      Whitehead composite of two derivations or sections
#O  WhiteheadOrder    order of derivation/section using the WhiteheadProduct
##
DeclareOperation( "WhiteheadProduct",
    [ IsUp2DimensionalMapping, IsUp2DimensionalMapping ] );
DeclareOperation( "WhiteheadOrder", [ IsUp2DimensionalMapping ] );

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#P  IsRegularDerivation                 so an element of the Whitehead group
##
DeclareProperty( "IsRegularDerivation", IsDerivation );

InstallTrueMethod( IsDerivation, IsRegularDerivation );

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##
#A  SourceEndomorphism     upmapping determines endomorphism of source group
#A  RangeEndomorphism      upmapping determines endomorphism of range group
#A  Object2dEndomorphism   upmapping determines endomorphism of xmod or cat1
##
DeclareAttribute( "SourceEndomorphism", IsUp2DimensionalMapping );
DeclareAttribute( "RangeEndomorphism", IsUp2DimensionalMapping );
DeclareAttribute( "Object2dEndomorphism", IsUp2DimensionalMapping );

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##                                 Sections                                ##
#############################################################################

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#O  SectionByHomomorphism               converts a homomorphism to a section
#O  SectionByHomomorphismNC             converts a homomorphism to a section
##
DeclareOperation( "SectionByHomomorphism",
    [ IsPreCat1Group, IsGroupHomomorphism ] );
DeclareOperation( "SectionByHomomorphismNC",
    [ IsPreCat1Group, IsGroupHomomorphism ] );

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##
#O  SectionByDerivation    the cat1-group section determined by a derivation
##
DeclareOperation( "SectionByDerivation", [ IsDerivation ] );

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#O  CompositeSection                     Whitehead composite of two sections
##
DeclareOperation( "CompositeSection", [ IsSection, IsSection ] );

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##                      Monoids of Derivations or Sections                 ##
#############################################################################

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#P  IsMonoidOfUp2DimensionalMappings( <obj> )
#R  IsMonoidOfUp2DimensionalMappingsObj( <obj> )
##
##  Up2DimensionalMappings record stores images lists and composition table
##
DeclareProperty( "IsMonoidOfUp2DimensionalMappings", IsObject );
DeclareRepresentation( "IsMonoidOfUp2DimensionalMappingsObj",
    IsMonoidOfUp2DimensionalMappings and IsAttributeStoringRep,
    [ "Object2d", "ImagesList" ] );

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##
#A  ImagesList                              returns list of DerivationImages
#A  DerivationClass                               type of derivations record
#A  ImagesTable                                 returns lists of image lists
##
DeclareAttribute( "ImagesList", IsMonoidOfUp2DimensionalMappings );
DeclareAttribute( "DerivationClass", IsMonoidOfUp2DimensionalMappings );
DeclareAttribute( "ImagesTable", IsMonoidOfUp2DimensionalMappings );

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##
#O  MonoidOfUp2DimensionalMappingsObj( <obj>, <images>, <str> )
#F  MonoidOfUp2DimensionalMappingsFamily . . . family for up-mappings monoid
#T  MonoidOfUp2DimensionalMappingsType . . . . . type for up-mappings monoid
#P  IsMonoidOfDerivations
#P  IsMonoidOfSections
##
DeclareOperation( "MonoidOfUp2DimensionalMappingsObj",
    [ Is2DimensionalDomain, IsHomogeneousList, IsString ] );
MonoidOfUp2DimensionalMappingsFamily :=
    CollectionsFamily( Up2DimensionalMappingFamily );
BindGlobal( "MonoidOfUp2DimensionalMappingsType",
            NewType( MonoidOfUp2DimensionalMappingsFamily,
                     IsMonoidOfUp2DimensionalMappingsObj ) );
DeclareProperty( "IsMonoidOfDerivations", IsMonoidOfUp2DimensionalMappings );
DeclareProperty( "IsMonoidOfSections", IsMonoidOfUp2DimensionalMappings );

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##
#A  RegularDerivations  find all invertible derivations for a crossed module
#A  AllDerivations                 find all derivations for a crossed module
#A  RegularSections            find all invertible sections for a cat1-group
#A  AllSections                           find all sections for a cat1-group
##
DeclareAttribute( "RegularDerivations", IsXMod );
DeclareAttribute( "AllDerivations", IsXMod );
DeclareAttribute( "RegularSections", IsCat1Group );
DeclareAttribute( "AllSections", IsCat1Group );

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##
#O  BacktrackDerivationsJ        recursive function for BacktrackDerivations
#O  BacktrackDerivations          recursive construction for all derivations
#O  BacktrackSectionsJ       recursion used by RegularSections & AllSections
##
DeclareOperation( "BacktrackDerivationsJ",  [ IsXMod, IsHomogeneousList,
    IsHomogeneousList, IsHomogeneousList, IsInt, IsString ] );
DeclareOperation( "BacktrackDerivations", [ IsXMod, IsString ] );
DeclareOperation( "BacktrackSectionsJ",
                  [ IsRecord, IsInt, IsObject, IsInt ] );

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##
#A  WhiteheadMonoidTable( XM )              Table of products of derivations
#A  WhiteheadGroupTable( XM )       Table of products of regular derivations
##
DeclareAttribute( "WhiteheadMonoidTable", Is2DimensionalDomain );
DeclareAttribute( "WhiteheadGroupTable", Is2DimensionalDomain );

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#A  WhiteheadRegularGroup( XM )         a regular permutation representation
#A  WhiteheadPermGroup( XM )                    a permutation representation
#P  IsWhiteheadPermGroup                       property of these perm groups
#A  WhiteheadGroupIsomorphism( XM )                smaller group isomorphism
#A  WhiteheadGroupInverseIsomorphism( XM )      inverse of this isomorphmism
#A  WhiteheadGroupGeneratingUpMappings                   generators for W(X)
#A  WhiteheadGroupGeneratorPositions        positions of generators for W(X)
#A  WhiteheadTransformationMonoid( XM )      a transformation representation
#A  WhiteheadHomomorphism( XM )                       homomorphism S -> W(X)
##
DeclareAttribute( "WhiteheadRegularGroup", Is2DimensionalDomain );
DeclareAttribute( "WhiteheadPermGroup", Is2DimensionalDomain );
DeclareProperty( "IsWhiteheadPermGroup", IsGroup );
DeclareAttribute( "WhiteheadGroupIsomorphism", Is2DimensionalDomain );
DeclareAttribute( "WhiteheadGroupInverseIsomorphism", Is2DimensionalDomain );
DeclareAttribute( "WhiteheadGroupGeneratingUpMappings",
                  Is2DimensionalDomain );
DeclareAttribute( "WhiteheadGroupGeneratorPositions", Is2DimensionalDomain );
DeclareAttribute( "WhiteheadTransformationMonoid", Is2DimensionalDomain );
DeclareAttribute( "WhiteheadHomomorphism", Is2DimensionalDomain );

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