/usr/share/gap/lib/pcgsspec.gi is in gap-libs 4r6p5-3.
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The actual contents of the file can be viewed below.
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##
#W pcgsspec.gi GAP library Bettina Eick
##
#Y Copyright (C) 1996, Lehrstuhl D für Mathematik, RWTH Aachen, Germany
#Y (C) 1998 School Math and Comp. Sci., University of St Andrews, Scotland
#Y Copyright (C) 2002 The GAP Group
##
#############################################################################
##
#F PrimePowerPcSequence( <pcgs> )
##
PrimePowerPcSequence := function( pcgs )
local new, i, p;
new := List( [1..Length(pcgs)], x -> false );
p := RelativeOrders( pcgs );
for i in [1..Length(pcgs)] do
new[i] := PrimePowerComponent( pcgs[i], p[i] );
od;
return new;
end;
#############################################################################
##
#F ModifyPcgs( ... )
##
ModifyPcgs := function( pcgs, wf, list, weights, work, g, wt )
local d, h, S, s, min, tmp, i;
# the trivial case
d := DepthOfPcElement( pcgs, g );
if d > Length( pcgs ) then return d; fi;
h := ReducedPcElement( pcgs, list[d], g );
S := PrimePowerComponents( h );
# insert h in base
if weights[ d ] < wt then
Info(InfoSpecPcgs, 3, " insert ", g );
Info(InfoSpecPcgs, 3, " at position ",d," with weight ", wt);
tmp := weights[ d ];
weights[ d ] := wt;
list[ d ] := g;
# correct work-flag
work[ d ] := List( work[ d ], x -> true );
for i in [d..Length( pcgs )] do
work[ i ][ d ] := true;
od;
# ModifyPcgs with components of h
for s in S do
ModifyPcgs( pcgs, wf, list, weights, work, s,
wf.adj( pcgs, s, tmp ));
od;
return d;
# base is not changed
else
# modify with components of gg
min := Length( pcgs ) + 1;
for s in S do
tmp := wf.adj( pcgs, s, wt );
min := Minimum( min,
ModifyPcgs(pcgs, wf, list, weights, work , s, tmp) );
od;
return min;
fi;
end;
#############################################################################
##
#F PcgsSystemWithWf( <pcgs> <wf> )
##
PcgsSystemWithWf := function( pcgs, wf )
local ppcgs, m, list, weights, work, nilp, h, i, j, g, S,
pos, s, wt, newpcgs, wset, layers, first;
ppcgs := PrimePowerPcSequence( pcgs );
# initialise
m := Length( pcgs );
list := ShallowCopy( ppcgs );
weights := List( list, x -> wf.one( pcgs, x ) );
work := List( [1..m], x -> List( [1..x], y -> true ) );
# run down series
nilp := 1;
h := 1;
while h <= nilp+1 do
# run through powers and commutators
Info(InfoSpecPcgs, 2, " start layer ",h);
i := 1;
while i <= m do
j := 1;
while j <= i do
if wf.relevant( pcgs, weights, i, j, h ) and work[i][j] then
Info(InfoSpecPcgs, 3, " try ",i," ",j);
# set work flag new
if wf.useful( weights, i, j, h ) then
work[ i ][ j ] := false;
fi;
# modify with components of power or commutator
if i = j then
g := list[ i ] ^ weights[i][3];
else
g := Comm( list[ i ], list[ j ] );
fi;
S := PrimePowerComponents( g );
pos := m + 1;
for s in S do
wt := wf.weight( pcgs, weights, i, j, h, s );
pos := Minimum( pos,
ModifyPcgs( pcgs, wf, list, weights, work, s, wt ) );
od;
# if necessary, set indices new
if pos <= i then
i := pos;
j := 0;
fi;
fi;
j := j+1;
od;
i := i+1;
od;
h := h+1;
# set nilp
for i in [1..m] do
nilp := Maximum( nilp, weights[i][1] );
od;
od;
# sort
SortParallel( weights, list );
# compute pcgs - be careful!
if ppcgs = AsList( pcgs ) and
ForAll( [1..m], x -> DepthOfPcElement(pcgs, list[x]) = x )
then
newpcgs := pcgs;
else
newpcgs := PcgsByPcSequenceNC( FamilyObj(OneOfPcgs(pcgs)), list );
SetRelativeOrders(newpcgs, List(weights, x -> x[3]));
SetOneOfPcgs( newpcgs, OneOfPcgs(pcgs) );
fi;
# set up layers
wset := Set( weights );
layers := List( [1..m], x -> Position( wset, weights[x] ) );
# set up first
first := [1];
for i in [2..m] do
if weights[i] <> weights[i-1] then
Add( first, i );
fi;
od;
Add( first, m+1 );
return rec( pcgs := newpcgs,
weights := weights,
layers := layers,
first := first );
end;
#############################################################################
##
#F PcgsSystemLGSeries( <pcgs> )
##
PcgsSystemLGSeries := function( pcgs )
local wf;
# set up weight function
wf := rec(
adj := function( pcgs, g, wt )
wt := ShallowCopy( wt );
wt[ 3 ] := RelativeOrderOfPcElement( pcgs, g );
return wt;
end,
one := function( pcgs, g )
return [ 1, 1, RelativeOrderOfPcElement( pcgs, g ) ];
end,
relevant := function( pcgs, w, i, j, h )
if i = j and (w[i][1] = h-1 or w[i][1] = h+1) then
return true;
else
if w[i][1] = w[j][1] then
if w[i][1] = h-1 and w[i][3] = w[j][3] and
(w[i][2] = 1 or w[j][2] = 1) then
return true;
elif w[i][1] = h and w[i][3] <> w[j][3] then
return true;
elif w[i][1] >= h+1 then
return true;
else
return false;
fi;
elif w[i][1] >= h+1 and w[j][1] >= h+1 then
return true;
elif w[i][1] = h+1 and w[j][1] <= h and w[j][2] = 1 then
return true;
elif w[i][1] <= h and w[j][1] = h+1 and w[i][2] = 1 then
return true;
else
return false;
fi;
fi;
end,
weight := function( pcgs, w, i, j, h, g )
local p;
p := RelativeOrderOfPcElement(pcgs, g);
if i = j then
if w[i][1] = h-1 then
return [ w[i][1], w[i][2]+1, w[i][3] ];
else
return w[i];
fi;
else
if w[i][1] = w[j][1] and w[i][1] = h-1 then
return [ w[i][1], w[i][2]+w[j][2], w[i][3] ];
elif w[i][1] = w[j][1] and w[i][1] = h then
return [ w[i][1]+1, 1, p ];
elif w[i][1] = w[j][1] and w[j][1] >= h+1 then
if w[i][3] <> w[j][3] or w[i][3] <> p then
return [w[i][1]+1, 1, p];
else
return [w[i][1], 1, p];
fi;
else
return [ Maximum( w[i][1],w[j][1] ), 1, p ];
fi;
fi;
end,
useful := function( w, i, j, h )
if i = j and w[i][1] >= h+1 then
return false;
elif i<>j and w[i][1] = w[j][1] and w[i][1] >= h+1 and
w[i][3] = w[j][3] then
return false;
else
return true;
fi;
end
);
return PcgsSystemWithWf( pcgs, wf );
end;
#############################################################################
##
#F LeastBadHallLayer( <pcgssys>, <i> )
##
LeastBadHallLayer := function( pcgssys, i )
local m, pi, bad, j, w, pj, k, exponents;
m := Length( pcgssys.pcgs );
pi := pcgssys.weights[ i ][ 3 ];
# run through powers/commutators and search for bad one
bad := m + 1;
for j in [ i .. m ] do
if j = i then
w := pcgssys.pcgs[ i ] ^ pi;
pj := pi;
else
w := Comm( pcgssys.pcgs[ j ], pcgssys.pcgs[ i ] );
pj := pcgssys.weights[ j ][ 3 ];
fi;
if DepthOfPcElement( pcgssys.pcgs, w ) <= m then
exponents := ExponentsOfPcElement( pcgssys.pcgs, w, [i+1..m] );
k := 1;
# run through exponent list until bad entry is found
while k <= Length( exponents ) do
# test primes
if exponents[k] <> 0 and
pi <> pcgssys.weights[k+i][3] and
pj <> pcgssys.weights[k+i][3]
then
bad := Minimum( bad, k+i );
k := Length( exponents ) + 1;
else
k := k + 1;
fi;
od;
fi;
# if bad is minimal return; otherwise go on
if i = bad -1 then
return bad;
fi;
od;
return bad;
end;
#############################################################################
##
#F PcgsSystemWithHallSystem( <pcgssys> )
##
PcgsSystemWithHallSystem := function( pcgssys )
local m, i, k, n, F,
layer, start, next, size, base,
V, M,
pi, pk, field, id,
g, v, A, I, B, l, test, aij,
new, solution, j, subs;
# set up
m := Length( pcgssys.pcgs );
F := FamilyObj(OneOfPcgs(pcgssys.pcgs));
# find starting index
n := m;
while 1 <= n and pcgssys.weights[n][1] = pcgssys.weights[m][1] do
n := n - 1;
od;
if n = 1 and pcgssys.weights[n][1] = pcgssys.weights[m][1] then
return pcgssys;
fi;
# run up the composition series
for i in Reversed( [1..n] ) do
Info(InfoSpecPcgs, 2, " start ",i,"th pcgs element");
k := LeastBadHallLayer( pcgssys, i );
while k <= m do
Info(InfoSpecPcgs, 2, " bad layer ",k);
layer := pcgssys.layers[k];
start := pcgssys.first[ layer ];
next := pcgssys.first[ layer+1 ];
size := next - start;
base := pcgssys.pcgs{[start..next-1]};
# InitializeSystem inhomogenous system
V := [];
M := List([1..size], x -> []);
# get primes and field
pi := pcgssys.weights[ i ][ 3 ];
pk := pcgssys.weights[ k ][ 3 ];
field := GF(pk);
id := One( field );
# add the power
g := pcgssys.pcgs[ i ] ^ pi;
v := ExponentsOfPcElement( pcgssys.pcgs, g, [start..next-1] );
v := v * id;
# set up matrix
A := List( base, x -> ExponentsOfPcElement(
pcgssys.pcgs, x^pcgssys.pcgs[i], [start..next-1] ) );
A := A * id;
I := A ^ 0;
B := I;
for l in [ 1..pi-1 ] do
B := B * A + I;
od;
B := (- 1) * B;
# append to system
for l in [ 1..size ] do
Append( M[ l ], B[ l ] );
od;
Append( V, v );
# add the commutators
test := Filtered([i+1..start-1], x -> pcgssys.weights[x][3] <> pk);
for j in test do
g := Comm( pcgssys.pcgs[j], pcgssys.pcgs[i] );
v := ExponentsOfPcElement( pcgssys.pcgs, g, [start..next-1] );
v := v * id;
# corresponding matrix
aij := pcgssys.pcgs[j] ^ pcgssys.pcgs[i];
A := List( base, x -> ExponentsOfPcElement(
pcgssys.pcgs, x^aij, [start..next-1] ) );
A := A * id;
I := A ^ 0;
I := (-1) * I;
B := A + I;
# append to system
for l in [ 1..size ] do
Append( M[ l ], B[ l ] );
od;
Append( V, v );
od;
# solve system simultaneously
solution := SolutionMat( M, V );
# calculate new i-th base element
new := ShallowCopy( pcgssys.pcgs!.pcSequence );
subs := PcElementByExponentsNC(pcgssys.pcgs, base, solution);
new[i] := new[i] * subs;
pcgssys.pcgs := PcgsByPcSequenceNC( F, new );
# change k
k := LeastBadHallLayer( pcgssys, i );
od;
od;
return pcgssys;
end;
#############################################################################
##
#F LeastBadComplementLayer( <pcgssys>, <i> )
##
LeastBadComplementLayer := function( pcgssys, i )
local m, p, bad, j, w, exponents, k;
m := Length( pcgssys.pcgs );
p := pcgssys.weights[i][3];
bad := m + 1;
# look through commutators
for j in [ 1 .. m ] do
if pcgssys.weights[j][1] >= pcgssys.weights[i][1] and
pcgssys.weights[j][3] <> p then
w := Comm( pcgssys.pcgs[j], pcgssys.pcgs[i] );
if DepthOfPcElement( pcgssys.pcgs, w ) <= m then
exponents := ExponentsOfPcElement( pcgssys.pcgs, w, [i+1..m] );
k := 1;
# run through exponent list until bad entry is found
while k <= Length( exponents ) do
if exponents[k] <> 0 and
pcgssys.weights[i+k][1] = pcgssys.weights[j][1] + 1 and
pcgssys.weights[i+k][2] = 1 and
pcgssys.weights[i+k][3] = p then
if i+k < bad then
bad := i+k;
fi;
k := Length( exponents ) + 1;
else
k := k + 1;
fi;
od;
fi;
fi;
## if bad is minimal return; otherwise go on
if i = bad - 1 then
return bad;
fi;
od;
return bad;
end;
#############################################################################
##
#F PcgsSystemWithComplementSystem( <pcgssys> )
##
PcgsSystemWithComplementSystem := function( pcgssys )
local m, F, n, i, k,
layer, start, next, size, base,
V, M, l,
pi, pk, field,
nil, test, j, g, v, aij, A, B,
solution, new, subs;
m := Length( pcgssys.pcgs );
F := FamilyObj( OneOfPcgs(pcgssys.pcgs) );
# find starting index
n := m;
while 1 <= n and pcgssys.weights[n][1] = pcgssys.weights[m][1] do
n := n - 1;
od;
if n = 1 and pcgssys.weights[n][1] = pcgssys.weights[m][1] then
return pcgssys;
fi;
# run up the composition series
for i in Reversed( [1..n] ) do
Info(InfoSpecPcgs, 2, " start ",i,"th pcgs element");
k := LeastBadComplementLayer( pcgssys, i );
while k <= m do
Info(InfoSpecPcgs, 2, " bad index ",k);
layer := pcgssys.layers[ k ];
start := pcgssys.first[ layer ];
next := pcgssys.first[ layer+1 ];
size := next - start;
base := pcgssys.pcgs{[start..next-1]};
# InitializeSystem inhomogenous system
V := [];
M := List([1..size], x -> []);
# get primes
pi := pcgssys.weights[ i ][ 3 ];
pk := pcgssys.weights[ k ][ 3 ];
field := GF( pk );
# pic the p'-generators in the head above
nil := pcgssys.weights[k][1]-1;
test := Filtered( [1..m], x -> pcgssys.weights[x][3] <> pi
and pcgssys.weights[x][1] = nil );
for j in test do
g := Comm( pcgssys.pcgs[j], pcgssys.pcgs[i] );
v := ExponentsOfPcElement( pcgssys.pcgs, g, [start..next-1] );
v := v * One(field);
# corresponding matrix
aij := pcgssys.pcgs[j] ^ pcgssys.pcgs[i];
A := List( base, x -> ExponentsOfPcElement(
pcgssys.pcgs, x^aij, [start..next-1] ) );
A := A * One(field);
B := A - A ^ 0;
# append to system
for l in [ 1..size ] do
Append( M[ l ], B[ l ] );
od;
Append( V, v );
od;
# solve system simultaneously
solution := SolutionMat( M, V );
# calculate new i-th base element
new := ShallowCopy( pcgssys.pcgs!.pcSequence );
subs:= PcElementByExponentsNC(pcgssys.pcgs, base, solution);
new[i] := new[i] * subs;
pcgssys.pcgs := PcgsByPcSequenceNC( F, new );
# change k
k := LeastBadComplementLayer( pcgssys, i );
od;
od;
return pcgssys;
end;
#############################################################################
##
#M SpecialPcgs( <pcgs> )
##
InstallMethod( SpecialPcgs, "method for special pcgs", true,
[ IsSpecialPcgs ],
# we need to rank this method higher -- otherwise the extra filters in
# the follwoing method give it the same rank...
10,IdFunc);
InstallMethod( SpecialPcgs,
"generic method for pcgs",
true,
[ IsPcgs and IsFiniteOrdersPcgs and IsPrimeOrdersPcgs ],
0,
function( pcgs )
local newpcgs, pcgssys,w;
# catch the trivial case
if Length( pcgs ) = 0 then
newpcgs := pcgs;
SetIsSpecialPcgs( pcgs, true );
SetLGWeights( pcgs, [ ] );
SetLGLayers( pcgs, [ ] );
SetLGFirst( pcgs, [1] );
else
# compute Leedham-Green series
Info(InfoSpecPcgs, 1, "compute LG series");
pcgssys := PcgsSystemLGSeries( pcgs );
# change to hall base
Info(InfoSpecPcgs, 1, "exhibit hall system");
pcgssys := PcgsSystemWithHallSystem( pcgssys );
# change to complement base
Info(InfoSpecPcgs, 1, "exhibit complement system");
pcgssys := PcgsSystemWithComplementSystem( pcgssys );
if IsBound(pcgssys.pcgs!.LGWeights) then
# pcgs is reused -- force new one
pcgssys.pcgs:=PcgsByPcSequence(FamilyObj(OneOfPcgs(pcgs)),
pcgssys.pcgs!.pcSequence);
fi;
# create the special pcgs
newpcgs := pcgssys.pcgs;
SetIsSpecialPcgs( newpcgs, true );
w:=pcgssys.weights;
if w[Length(w)][1]=1 then
SetIndicesCentralNormalSteps( newpcgs, pcgssys.first );
if Length(Set(RelativeOrders(newpcgs)))=1 then
SetIndicesPCentralNormalStepsPGroup( newpcgs, pcgssys.first );
fi;
fi;
SetLGWeights( newpcgs, pcgssys.weights );
SetLGLayers( newpcgs, pcgssys.layers );
SetLGFirst( newpcgs, pcgssys.first );
SetIndicesEANormalSteps( newpcgs, pcgssys.first );
SetIndicesChiefNormalSteps( newpcgs, pcgssys.first );
SetIsFiniteOrdersPcgs( newpcgs, true );
SetIsPrimeOrdersPcgs( newpcgs, true );
fi;
if HasGroupOfPcgs (pcgs) then
SetGroupOfPcgs (newpcgs, GroupOfPcgs (pcgs));
fi;
return newpcgs;
end );
#############################################################################
##
#M LGHeads( <pcgs> )
##
InstallMethod( LGHeads, "for special pcgs", true,
[ IsSpecialPcgs ], 0,
function( pcgs )
local h, i, w, j;
h := [];
i := 1;
w := LGWeights( pcgs );
for j in [1..Length(w)] do
if w[j][1] = i then
Add( h, j );
i := i + 1;
fi;
od;
Add( h, Length( w ) + 1 );
return h;
end);
#############################################################################
##
#M LGTails( <pcgs> )
##
InstallMethod( LGTails, "for special pcgs", true,
[ IsSpecialPcgs ], 0,
function( pcgs )
local h, w, i, j, t;
h := LGHeads( pcgs );
w := LGWeights( pcgs );
t := [];
for i in [1..Length(h)-1] do
j := h[i];
while j <= Length( w ) and w[h[i]][1] = w[j][1] and w[j][2] = 1 do
j := j + 1;
od;
Add( t, j );
od;
return t;
end);
#############################################################################
##
#M SpecialPcgs( <group> )
##
InstallOtherMethod( SpecialPcgs,
"generic method for groups",
true,
[ IsGroup ],
0,
function( group )
local spec;
if HasPcgs(group) then
spec := SpecialPcgs( Pcgs( group ) );
else
spec := SpecialPcgs( Pcgs( group ) );
SetPcgs( group, spec );
fi;
SetGroupOfPcgs (spec, group);
return spec;
end );
InstallOtherMethod( SpecialPcgs,"last resort method which tests solvability",
true,[IsGroup],0,
function(G)
# this test should always fail (because otherwise the other method
# that uses 'CanEasilyComputePcgs' will have been called). It is there
# just to avoid infinite recursion if methods get sorted in a strange way.
if HasIsSolvableGroup(G) then
TryNextMethod();
fi;
if not IsSolvableGroup(G) then
Error("<G> must be solvable to permit computation of a special pcgs");
else
return SpecialPcgs(G);
fi;
end);
#############################################################################
##
#M IsomorphismSpecialPcGroup( <group> )
##
InstallMethod( IsomorphismSpecialPcGroup, "method for pc groups",
true, [ IsPcGroup ], 0,
function(G)
local s,H,iso,pc,w;
s:=SpecialPcgs(G);
H:=PcGroupWithPcgs(s);
pc:=FamilyPcgs(H);
SetLGWeights(pc,LGWeights(s));
SetLGLayers(pc,LGLayers(s));
SetLGFirst(pc,LGFirst(s));
SetIsSpecialPcgs(pc,true);
if Length(LGWeights(pc)) = 0 or LGWeights(pc)[Length(LGWeights(pc))][1]=1 then
SetIsPcgsCentralSeries(pc,true);
fi;
SetIndicesEANormalSteps( pc, LGFirst(pc) );
SetIndicesChiefNormalSteps( pc, LGFirst(pc) );
w:=LGWeights(pc);
if Length(w) > 0 and w[Length(w)][1]=1 then
SetIndicesCentralNormalSteps( pc, LGFirst(pc));
if Length(Set(RelativeOrders(pc)))=1 then
SetIndicesPCentralNormalStepsPGroup( pc, LGFirst(pc) );
fi;
fi;
iso:=GroupHomomorphismByImagesNC(G,H,s,pc);
SetIsBijective( iso, true );
SetSpecialPcgs(H,pc);
SetPcgs(H,pc);
# note: `ImagesSource' might be
# physically a different group than the `Range' H.
SetSpecialPcgs(ImagesSource(iso),pc);
SetPcgs(ImagesSource(iso),pc);
return iso;
end);
InstallMethod( IsomorphismSpecialPcGroup, "generic method for groups",
true, [ IsGroup ], 0,
function(G)
local iso;
iso:=IsomorphismPcGroup(G);
return iso*IsomorphismSpecialPcGroup(Range(iso));
end);
#############################################################################
##
#M InducedPcgsWrtSpecialPcgs( <group> )
##
InstallOtherMethod( InducedPcgsWrtSpecialPcgs, "method for pc groups",
true, [ IsPcGroup ], 0,
function( U )
local spec, ind;
spec := SpecialPcgs( FamilyPcgs( U ) );
if HasPcgs(U) and spec=HomePcgs(U) then
return InducedPcgsWrtHomePcgs(U);
fi;
ind := InducedPcgsByGeneratorsNC( spec, GeneratorsOfGroup(U) );
SetGroupOfPcgs (ind, U);
return ind;
end );
InstallOtherMethod( InducedPcgsWrtSpecialPcgs, "generic method for groups",
true, [ IsGroup ], 0,
function( U )
local spec, ind;
spec := SpecialPcgs( Parent( U ) );
ind := InducedPcgsByGeneratorsNC( spec, GeneratorsOfGroup(U) );
SetGroupOfPcgs (ind, U);
return ind;
end );
IndPcgsWrtSpecFromFamOrHome:=function( U )
local spec, ind;
spec := SpecialPcgs( FamilyPcgs( U ) );
if spec=HomePcgs(U) then
return InducedPcgsWrtHomePcgs(U);
elif IsSortedPcgsRep(spec) and spec!.sortingPcgs=HomePcgs(U) then
ind := InducedPcgsByPcSequenceNC(spec,AsList(InducedPcgsWrtHomePcgs(U)));
else
ind := InducedPcgsByGeneratorsNC( spec, InducedPcgsWrtHomePcgs(U) );
fi;
SetGroupOfPcgs (ind, U);
return ind;
end;
InstallOtherMethod( InducedPcgsWrtSpecialPcgs,
"for groups that have already an induced pcgs wrt home pcgs", true,
[ IsGroup and HasInducedPcgsWrtHomePcgs], 0,
IndPcgsWrtSpecFromFamOrHome);
InstallOtherMethod( InducedPcgsWrtSpecialPcgs,
"for groups that have already an induced pcgs wrt family pcgs", true,
[ IsGroup and HasInducedPcgsWrtFamilyPcgs], 0,
IndPcgsWrtSpecFromFamOrHome);
#############################################################################
##
#M LGWeights( pcgs )
##
InstallMethod( LGWeights,
"for induced wrt special",
true,
[IsInducedPcgsWrtSpecialPcgs],
0,
function( pcgs )
local spec, sweights, weights, i, g, d;
# catch special pcgs
spec := ParentPcgs( pcgs );
sweights := LGWeights( spec );
# rewrite weights
weights := List( pcgs, x -> true );
for i in [1..Length(pcgs)] do
g := pcgs[i];
d := DepthOfPcElement( spec, g );
weights[i] := sweights[d];
od;
return weights;
end );
#############################################################################
##
#M LGLayers( pcgs )
##
InstallMethod( LGLayers,
"for induced wrt special",
true,
[IsInducedPcgsWrtSpecialPcgs],
0,
function( pcgs )
local weights, layers, layer, o, i, w;
weights := LGWeights( pcgs );
layers := List( pcgs, x -> true );
layer := 1;
o := weights[1];
for i in [1..Length( pcgs )] do
w := weights[i];
if w <> o then
o := w;
layer := layer + 1;
fi;
layers[i] := layer;
od;
return layers;
end );
#############################################################################
##
#M LGFirst( pcgs )
##
InstallMethod( LGFirst,
"for induced wrt special",
true,
[IsInducedPcgsWrtSpecialPcgs],
0,
function( pcgs )
local weights, first, o, i, w;
weights := LGWeights( pcgs );
first := [1];
o := weights[1];
for i in [1..Length( pcgs )] do
w := weights[i];
if w <> o then
o := w;
Add( first, i );
fi;
od;
Add( first, Length(pcgs) + 1 );
return first;
end );
#############################################################################
##
#M LGLength( G )
##
InstallMethod( LGLength,
"for groups",
true,
[ IsGroup ],
0,
function( G )
if not IsSolvableGroup( G ) then
return fail;
fi;
return Length( Set( LGWeights( SpecialPcgs( G ) ) ) );
end );
#############################################################################
##
#M PClassPGroup( <G> ) . . . . . . . . . . . . . . . . <p>-central series
##
InstallMethod( PClassPGroup,
"for groups with special pcgs",
true, [ IsPGroup and HasSpecialPcgs ], 1,
function( G )
return LGLength( G );
end );
#############################################################################
##
#M RankPGroup( <G> ) . . . . . . . . . . . . . . . . . . <p>-central series
##
InstallMethod( RankPGroup,
"for groups with special pcgs",
true, [ IsPGroup and HasSpecialPcgs ], 1,
function( G )
return LGFirst( SpecialPcgs( G ) )[ 2 ] - 1;
end );
#############################################################################
##
#F SpecialPcgsSubgroup( G, i )
##
SpecialPcgsSubgroup := function( G, i )
local spec, firs, sub;
spec := SpecialPcgs( G );
firs := LGFirst( spec );
sub := InducedPcgsByPcSequenceNC( spec, spec{[firs[i]..Length(spec)]} );
return SubgroupByPcgs( G, sub );
end;
#############################################################################
##
#F SpecialPcgsFactor( G, i )
##
SpecialPcgsFactor := function( G, i )
return G / SpecialPcgsSubgroup( G, i );
end;
#############################################################################
##
#M IndicesEANormalSteps( <pcgs> )
##
InstallMethod( IndicesEANormalSteps, "special pcgs: LGFirst", true,
[ IsSpecialPcgs ], 0, LGFirst );
DoCentralSeriesPcgsIfNilpot:=function(G)
local w;
w:=LGWeights(SpecialPcgs(G));
if w[Length(w)][1]<>1 then
Error("The group is not nilpotent");
fi;
return SpecialPcgs(G);
end;
InstallOtherMethod( PcgsCentralSeries, "if special pcgs is known",
true,[HasSpecialPcgs],0,DoCentralSeriesPcgsIfNilpot);
InstallOtherMethod( PcgsCentralSeries, "for pc groups use SpecialPcgs",
true,[IsPcGroup],0,DoCentralSeriesPcgsIfNilpot);
InstallOtherMethod( PcgsPCentralSeriesPGroup, "for pc groups use SpecialPcgs",
true,[IsPcGroup],0,DoCentralSeriesPcgsIfNilpot);
InstallOtherMethod( PcgsCentralSeries, "for pcgs computable use SpecialPcgs",
true,[CanEasilyComputePcgs],0,DoCentralSeriesPcgsIfNilpot);
InstallOtherMethod( PcgsPCentralSeriesPGroup,
"for pcgs computable use SpecialPcgs",
true,[CanEasilyComputePcgs],0,DoCentralSeriesPcgsIfNilpot);
PcgsElAbSerFromSpecPcgs:=function(G)
local s;
if HasHomePcgs(G)
and IsPcgsElementaryAbelianSeries(InducedPcgsWrtHomePcgs(G)) then
return InducedPcgsWrtHomePcgs(G);
# prefer the `HomePcgs' because wrt. it we store inducedness and for pc
# groups its the family pcgs wrt. calculations are quicker
fi;
s:=SpecialPcgs(G);
return s;
end;
InstallOtherMethod(PcgsElementaryAbelianSeries, "if special pcgs is known",
true,[HasSpecialPcgs],0,PcgsElAbSerFromSpecPcgs);
InstallMethod(PcgsElementaryAbelianSeries,"for PCgroups via SpecialPcgs",
true,[IsPcGroup],0,PcgsElAbSerFromSpecPcgs);
#############################################################################
##
#E pcgsspec.gi . . . . . . . . . . . . . . . . . . . . . . . . . . ends here
##
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