Spracherkennung für: .tst vermutete Sprache: Unknown {[0] [0] [0]} [Methode: Schwerpunktbildung, einfache Gewichte, sechs Dimensionen]
gap> START_TEST("ctblmono.tst");
#
# the following test comes from
https://github.com/gap-system/gap/issues/4452
# this used to give method not found for non-solvable groups
#
gap> IsMinimalNonmonomial(SL(
2,
3));
true
gap> IsMinimalNonmonomial(GL(
2,
3));
false
gap> IsMinimalNonmonomial(PSL(
2,
4));
true
gap> IsMinimalNonmonomial(PGL(
2,
5));
false
gap> IsMinimalNonmonomial(PSL(
2,
7));
true
gap> IsMinimalNonmonomial(PSL(
2,
8));
true
gap> IsMinimalNonmonomial(PSL(
2,
9));
false
gap> IsMinimalNonmonomial(PSL(
2,
11));
false
gap> IsMinimalNonmonomial(PSL(
2,
27));
true
gap> IsMinimalNonmonomial(PSL(
3,
3));
false
gap> IsMinimalNonmonomial(Sz(
8));
true
gap> IsMinimalNonmonomial(Sz(
2^
9));
false
# To avoid more silly mistakes, the following tests were also run
# Since they take several minutes, I have left them commented out
# gap> IsMNMNaive := g ->
# > (IsMonomialGroup(g)=false) # not monomial itself
# > and ForAll( NormalSubgroups(g), n -> Size(n) =
1 or
# > IsMonomialGroup(g/n) ) # every proper quotient is monomial
# > and ForAll( MaximalSubgroupClassReps(g), IsMonomialGroup) # quicker
# > and ForAll( ConjugacyClassesSubgroups(g), c -> # every proper subgroup
# > Size( Representative(c) ) = Size(g) or IsMonomialGroup(Representative(c)));;
# gap> for n in [
1..
767] do
# > if IsPrimePowerInt(n) then continue; fi;
# > if NrSmallGroups(n) >
2000 then continue; fi;
# > for k in [
1..NrSmallGroups(n)] do
# > sg := SmallGroup(n,k);
# > Assert(
0, IsMNMNaive(sg) = IsMinimalNonmonomial(sg) );
# > od; od;
# gap> for n in SizesPerfectGroups() do
# > for k in [
1..NrPerfectLibraryGroups(n)] do
# > pg := PerfectGroup(IsPermGroup,n,k);
# > Assert(
0, IsMNMNaive(pg) = IsMinimalNonmonomial(pg) );
# > od; od;
# gap> for pg in PrimitiveGroupsIterator(NrMovedPoints,[
1..
20],IsSolvableGroup,false) d
o
# > if IsNaturalAlternatingGroup(pg) or IsNaturalSymmetricGroup(pg) then continue; fi;
# > if Size(pg) > 10^6 then continue; fi;
# > Assert(0, IsMNMNaive(pg) = IsMinimalNonmonomial(pg) );
# > od;
#
gap> STOP_TEST("ctblmono.tst");