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Quelle semilinear.gi
Sprache: unbekannt
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#############################################################################
##
## This file is part of recog, a package for the GAP computer algebra system
## which provides a collection of methods for the constructive recognition
## of groups.
##
## This files's authors include Max Neunhöffer, Ákos Seress.
##
## Copyright of recog belongs to its developers whose names are too numerous
## to list here. Please refer to the COPYRIGHT file for details.
##
## SPDX-License-Identifier: GPL-3.0-or-later
##
##
## Handle the (projective) semilinear case.
##
#############################################################################
RECOG.WriteOverBiggerFieldWithSmallerDegree :=
function( inforec, gen )
# inforec needs:
# bas, basi, sample, newdim, FF, d, qd from the Finder
local i,k,newgen,row,t,val;
gen := inforec.bas * gen * inforec.basi;
newgen := []; # FIXME: this will later be:
#newgen := Matrix([],Length(inforec.sample),inforec.bas);
for i in [1..inforec.newdim] do
row := ZeroVector(inforec.newdim,inforec.sample);
for k in [1..inforec.newdim] do
val := Zero(inforec.FF);
for t in [1..inforec.d] do
val := gen[(i-1)*inforec.d+1][(k-1)*inforec.d+t]
* inforec.pows[t] + val;
od;
row[k] := val;
od;
Add(newgen,row);
# FIXME: this will go eventually:
ConvertToMatrixRep(newgen,inforec.qd);
od;
return newgen;
end;
RECOG.WriteOverBiggerFieldWithSmallerDegreeFinder := function(m)
# m a MeatAxe-module
local F,bas,d,dim,e,fac,facs,gens,i,inforec,j,k,mp,mu,new,newgens,pr,q,v;
if not MTX.IsIrreducible(m) then
Error("cannot work for reducible modules");
fi;
if MTX.IsAbsolutelyIrreducible(m) = true then
Error("cannot work for absolutely irreducible modules");
fi;
d := MTX.DegreeSplittingField(m);
e := MTX.FieldGenCentMat(m); # in comments we call the centralising field E
gens := MTX.Generators(m);
F := MTX.Field(m);
q := Size(F);
dim := MTX.Dimension(m);
# Choose the first standard basis vector as our first basis vector:
v := ZeroVector(dim,gens[1][1]);
v[1] := One(F);
bas := [v]; # FIXME, this will later be:
#bas := Matrix([v],Length(v),gens[1]);
# Do the first E = <e>-dimension:
for i in [1..d-1] do
Add(bas,bas[i]*e);
od;
#mu := MutableBasis(F,bas); # for membership test
mu := rec( vectors := [], pivots := [] );
for i in bas do
RECOG.CleanRow(mu,ShallowCopy(i),true,fail);
od;
# Now we spin up but think over the vector space E:
i := 1;
while Length(bas) < dim do
for j in [1..Length(gens)] do
new := bas[i] * gens[j];
if not RECOG.CleanRow(mu,ShallowCopy(new),true,fail) then
#if not IsContainedInSpan(mu,new) then
Add(bas,new);
#CloseMutableBasis(mu,new);
for k in [1..d-1] do
new := new * e;
RECOG.CleanRow(mu,ShallowCopy(new),true,fail);
Add(bas,new);
#CloseMutableBasis(mu,new);
od;
fi;
od;
i := i + d;
od;
# Since the module is irreducible i will not run over the length of bas
# now we can write down the new action over the bigger field immediately:
# FIXME: this will later go:
ConvertToMatrixRep(bas,q^d);
newgens := [];
inforec := rec( bas := bas, basi := bas^-1, FF := GF(F,d), d := d,
qd := q^d );
mp := MTX.FGCentMatMinPoly(m);
facs := Factors(PolynomialRing(inforec.FF),mp : stopdegs := [1]);
fac := First(facs,x->Degree(x)=1);
pr := -(CoefficientsOfLaurentPolynomial(fac)[1][1]);
inforec.pows := [pr^0];
for k in [1..d-1] do Add(inforec.pows,inforec.pows[k]*pr); od;
inforec.newdim := dim/inforec.d;
inforec.sample := ListWithIdenticalEntries(inforec.newdim,Zero(inforec.FF));
# FIXME: this will later go:
ConvertToVectorRep(inforec.sample,inforec.qd);
for j in [1..Length(gens)] do
Add(newgens,RECOG.WriteOverBiggerFieldWithSmallerDegree(inforec,gens[j]));
od;
return rec( newgens := newgens, inforec := inforec );
end;
FindHomMethodsProjective.NotAbsolutelyIrred := function(ri,G)
local H,f,hom,m,r;
if IsBound(ri!.isabsolutelyirred) and ri!.isabsolutelyirred then
# this information is coming from above
return false;
fi;
f := ri!.field;
# Just to be sure:
if not IsBound(ri!.meataxemodule) then
ri!.meataxemodule := GModuleByMats(GeneratorsOfGroup(G),f);
fi;
# this usually comes after "ReducibleIso", which provides the following:
m := ri!.meataxemodule;
if MTX.IsAbsolutelyIrreducible(m) then
return false;
fi;
Info(InfoRecog,2,"Rewriting generators over larger field with smaller",
" degree, factor=",MTX.DegreeSplittingField(m));
r := RECOG.WriteOverBiggerFieldWithSmallerDegreeFinder(m);
H := GroupWithGenerators(r.newgens);
hom := GroupHomByFuncWithData(G,H,RECOG.WriteOverBiggerFieldWithSmallerDegree,
r.inforec);
SetIsInjective(hom,true); # this only holds for matrix groups, not for
SetIsSurjective(hom,true); # projective groups!
# Now report back:
SetHomom(ri,hom);
# Hand down hint that no MeatAxe run can help:
InitialDataForImageRecogNode(ri).isabsolutelyirred := true;
# There might be a kernel, because we have more scalars over the bigger
# field, so go for it, however, some more generators might be in order,
# Normal closure however is unnecessary.
findgensNmeth(ri).args[1] := 5;
findgensNmeth(ri).args[2] := 0;
Add(InitialDataForKernelRecogNode(ri).hints,
rec( method := FindHomMethodsProjective.BiggerScalarsOnly, rank := 2000,
stamp := "BiggerScalarsOnly" ));
InitialDataForKernelRecogNode(ri).degsplittingfield := MTX.DegreeSplittingField(m)
/ DegreeOverPrimeField(f);
return true;
end;
FindHomMethodsProjective.BiggerScalarsOnly := function(ri,G)
# We come here only hinted, we project to a little square block in the
# upper left corner and know that there is no kernel:
local H,data,hom,newgens;
data := rec( poss := [1..ri!.degsplittingfield] );
newgens := List(GeneratorsOfGroup(G),x->RECOG.HomToDiagonalBlock(data,x));
H := Group(newgens);
hom := GroupHomByFuncWithData(G,H,RECOG.HomToDiagonalBlock,data);
SetHomom(ri,hom);
Add(InitialDataForImageRecogNode(ri).hints,
rec( method := FindHomMethodsProjective.StabilizerChainProj, rank := 4000,
stamp := "StabilizerChain" ));
findgensNmeth(ri).method := FindKernelDoNothing;
return true;
end;
FindHomMethodsProjective.C3C5 := function(ri,G)
# We assume that G acts absolutely irreducibly and see what we can
# do by computing a normal subgroup of the derived subgroup.
[ Dauer der Verarbeitung: 0.2 Sekunden
(vorverarbeitet)
]
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2026-04-02
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