Quelle twistedconjugation.gi
Sprache: unbekannt
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###############################################################################
##
## TwistedConjugation( hom1, hom2 )
##
## INPUT:
## hom1: group homomorphism H -> G
## hom2: group homomorphism H -> G (optional)
##
## OUTPUT:
## tc: function (g,h) -> (h^hom1)^-1 * g * (h^hom2)
##
BindGlobal(
"TwistedConjugation",
function( hom1, arg... )
local hom2;
if Length( arg ) = 0 then
return { g, h } -> ImagesRepresentative( hom1, h ) ^ -1 * g * h;
else
hom2 := arg[1];
return function( g, h )
return ImagesRepresentative( hom1, h ) ^ -1 * g *
ImagesRepresentative( hom2, h );
end;
fi;
end
);
###############################################################################
##
## IsTwistedConjugate( hom1, hom2, g1, g2 )
##
## INPUT:
## hom1: group homomorphism H -> G
## hom2: group homomorphism H -> G (optional)
## g1: element of G
## g2: element of G (optional)
##
## OUTPUT:
## bool: true if there exists an element h of H such that
## (h^hom1)^-1 * g_1 * h^hom2 = g_2, or false otherwise.
##
## REMARKS:
## If no hom2 is given, it is assumed that hom1 is an endomorphism G -> G
## and hom2 is assumed to be the identity mapping of G. If no g2 is given,
## it is assumed to be 1.
##
BindGlobal(
"IsTwistedConjugate",
function( arg... )
return CallFuncList( RepresentativeTwistedConjugation, arg ) <> fail;
end
);
###############################################################################
##
## RepresentativeTwistedConjugation( hom1, hom2, g1, g2 )
##
## INPUT:
## hom1: group homomorphism H -> G
## hom2: group homomorphism H -> G (optional)
## g1: element of G
## g2: element of G (optional)
##
## OUTPUT:
## h: element of H such that (h^hom1)^-1 * g_1 * h^hom2 = g_2, or
## fail if no such element exists
##
## REMARKS:
## If no hom2 is given, it is assumed that hom1 is an endomorphism G -> G
## and hom2 is assumed to be the identity mapping of G. If no g2 is given,
## it is assumed to be 1.
##
BindGlobal(
"RepresentativeTwistedConjugation",
function( arg... )
local n, G, c, i, tc, im;
if ForAll( arg, IsList ) then
n := Length( arg[1] );
if Length( arg ) < 4 then
G := Range( arg[1][1] );
if arg[2][1] in G then
Add(
arg,
ListWithIdenticalEntries( n, IdentityMapping( G ) ),
2
);
fi;
fi;
c := CallFuncList( RepresentativeTwistedConjugationOp, arg );
else
n := 1;
if Length( arg ) < 4 then
G := Range( arg[1] );
if arg[2] in G then
Add( arg, IdentityMapping( G ), 2 );
fi;
fi;
c := CallFuncList( RepresentativeTwistedConjugationOp, arg );
arg := List( arg, x -> [ x ] );
fi;
if TWC.ASSERT and c <> fail then
for i in [ 1 .. n ] do
tc := TwistedConjugation( arg[1][i], arg[2][i] );
im := tc( arg[3][i], c );
if (
( Length( arg ) = 4 and im <> arg[4][i] ) or
( Length( arg ) = 3 and not IsOne( im ) )
) then Error( "Assertion failure" ); fi;
od;
fi;
return c;
end
);
###############################################################################
##
## RepresentativeTwistedConjugationOp( hom1, hom2, g1, g2 )
##
## INPUT:
## hom1: group homomorphism H -> G
## hom2: group homomorphism H -> G
## g1: element of G
## g2: element of G (optional)
##
## OUTPUT:
## h: element of H such that (h^hom1)^-1 * g_1 * h^hom2 = g_2, or
## fail if no such element exists
##
## REMARKS:
## If no g2 is given, it is assumed to be 1.
##
InstallMethod(
RepresentativeTwistedConjugationOp,
"for two homomorphisms and two elements",
[ IsGroupHomomorphism, IsGroupHomomorphism,
IsMultiplicativeElementWithInverse, IsMultiplicativeElementWithInverse ],
function( hom1, hom2, g1, g2 )
local G, inn;
G := Range( hom1 );
inn := InnerAutomorphismNC( G, g2 );
return RepresentativeTwistedConjugationOp(
hom1 * inn, hom2, g2 ^ -1 * g1
);
end
);
InstallOtherMethod(
RepresentativeTwistedConjugationOp,
"for trivial element",
[ IsGroupHomomorphism, IsGroupHomomorphism,
IsMultiplicativeElementWithInverse ],
7,
function( hom1, _hom2, g )
local H;
if not IsOne( g ) then TryNextMethod(); fi;
H := Source( hom1 );
return One( H );
end
);
InstallOtherMethod(
RepresentativeTwistedConjugationOp,
"for abelian range",
[ IsGroupHomomorphism, IsGroupHomomorphism,
IsMultiplicativeElementWithInverse ],
5,
function( hom1, hom2, g )
local G, H, diff;
G := Range( hom1 );
if not IsAbelian( G ) then TryNextMethod(); fi;
H := Source( hom1 );
diff := TWC.DifferenceGroupHomomorphisms( hom1, hom2, H, G );
# TODO: Replace this by PreImagesRepresentative (without NC) eventually
if not g in ImagesSource( diff ) then
return fail;
fi;
return PreImagesRepresentativeNC( diff, g );
end
);
InstallOtherMethod(
RepresentativeTwistedConjugationOp,
"for finite source",
[ IsGroupHomomorphism, IsGroupHomomorphism,
IsMultiplicativeElementWithInverse ],
4,
function( hom1, hom2, g )
local H, tc, d, todo, conj, trail, h, i, k, gens, l;
H := Source( hom1 );
if not IsFinite( H ) then TryNextMethod(); fi;
tc := TwistedConjugation( hom1, hom2 );
g := Immutable( g );
d := NewDictionary( g, true );
AddDictionary( d, g, 0 );
todo := [ g ];
conj := [];
trail := [];
while not IsEmpty( todo ) do
k := Remove( todo );
if CanEasilyComputePcgs( H ) then
gens := Pcgs( H );
else
gens := SmallGeneratingSet( H );
fi;
for h in gens do
l := Immutable( tc( k, h ) );
if IsOne( l ) then
while k <> g do
i := LookupDictionary( d, k );
k := trail[i];
h := conj[i] * h;
od;
return h;
elif not KnowsDictionary( d, l ) then
Add( trail, k );
Add( todo, l );
Add( conj, h );
AddDictionary( d, l, Length( trail ) );
fi;
od;
od;
return fail;
end
);
InstallOtherMethod(
RepresentativeTwistedConjugationOp,
"for two lists of homomorphisms and two lists of elements",
[ IsList, IsList, IsList, IsList ],
function( hom1L, hom2L, g1L, g2L )
local n, ighom1L, gL, i, G, inn;
n := Length( hom1L );
ighom1L := ShallowCopy( hom1L );
gL := ShallowCopy( g1L );
for i in [ 1 .. n ] do
G := Range( hom1L[i] );
inn := InnerAutomorphismNC( G, g2L[i] );
ighom1L[i] := hom1L[i] * inn;
gL[i] := g2L[i] ^ -1 * g1L[i];
od;
return RepresentativeTwistedConjugationOp( ighom1L, hom2L, gL );
end
);
InstallOtherMethod(
RepresentativeTwistedConjugationOp,
"for two lists of homomorphisms and one list of elements",
[ IsList, IsList, IsList ],
function( hom1L, hom2L, gL )
local hom1, hom2, h, n, i, Coin, tc, g, G, hi;
hom1 := hom1L[1];
hom2 := hom2L[1];
h := RepresentativeTwistedConjugationOp( hom1, hom2, gL[1] );
if h = fail then
return fail;
fi;
n := Length( hom1L );
for i in [ 2 .. n ] do
Coin := CoincidenceGroup2( hom1, hom2 );
hom1 := hom1L[i];
hom2 := hom2L[i];
tc := TwistedConjugation( hom1, hom2 );
g := tc( gL[i], h );
G := Range( hom1 );
hom1 := RestrictedHomomorphism( hom1, Coin, G );
hom2 := RestrictedHomomorphism( hom2, Coin, G );
hi := RepresentativeTwistedConjugationOp( hom1, hom2, g );
if hi = fail then
return fail;
fi;
h := h * hi;
od;
return h;
end
);
[ Dauer der Verarbeitung: 0.3 Sekunden
(vorverarbeitet)
]
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2026-04-02
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