[GAP Forum] Obtaining Small Group information
Paweł Laskoś-Grabowski
pawel.laskos at gmail.com
Thu Dec 11 22:19:16 GMT 2008
Hello,
Much of this (highly useful otherwise, thanks a lot) information is
actually much more general than I need at the moment. I need to know the
structure of all (up to isomorphism, of course) groups of orders 125 and
1625. I was glad to discover that there are only five of each, but now
it seems that the ones obtained by semidirect products may actually
represent many non-isomorphic groups. Is there a way to obtain such
level of details using GAP, or should I refer to textbooks and/or prove
few facts myself to get the information I need?
Regards,
Pawel Laskos-Grabowski
Joe Bohanon schrieb:
> I would point out that StructureDescription might not always return a
> group the way you'd like it. The manual explains a little more about
> how it picks a particular form for the structure.
>
> That function also does not do anything with central products. Hence if
> I type:
> StructureDescription(SmallGroup(32,50)) I get:
> "(C2 x Q8) : C2" when it's also a central product of Q8 with D8. It
> returns some pretty awkward answers for other larger central products.
>
> It also will usually not let you know how the split or non-split
> extensions work, so you might get two non-isomorphic groups that return
> the same "StructureDescription".
>
> Also be forewarned that many times GAP will just compute the whole
> subgroup lattice to find a structure, so any group that would take a
> long time with LatticeByCyclicExtension or ConjugacyClassesSubgroups is
> likely to take a long time for StructureDescription. This would
> include, for instance, 2-groups of rank more than 5, groups with large
> permutation representations or large matrix representations and also
> finitely-presented groups. It does have a separate routine for any
> simple group that spits out the answer due to the classification in
> almost no time, however, while it could easily tell me a group is
> isomorphic to, say U4(3), it would take much longer (and probably use up
> all of your RAM) to say a group is isomorphic to U4(3):D8.
>
> On Thu, Dec 11, 2008 at 6:37 AM, Heiko Dietrich <h.dietrich at tu-bs.de
> <mailto:h.dietrich at tu-bs.de>> wrote:
>
> Dear Paweł,
>
> you can use the command "StructureDescription":
>
> gap> for i in AllSmallGroups(1625) do
> Display(StructureDescription(i)); od;
> C1625
> C325 x C5
> C13 x ((C5 x C5) : C5)
> C13 x (C25 : C5)
> C65 x C5 x C5
>
> The output is explained in the manual:
>
> http://www.gap-system.org/Manuals/doc/htm/ref/CHAP037.htm#SECT006
>
> Best,
> Heiko
>
>
>
> On Tuesday 09 December 2008 20:56, Paweł Laskoś-Grabowski wrote:
> > Hello,
> >
> > I have noticed that GAP Small Groups library provides useful
> information
> > on the structure of groups belonging to the layer 1 of the
> library, but
> > does not do so for (some) bit more complicated groups. I am rather
> > dissatisfied by the output
> >
> > gap> SmallGroupsInformation(1625);
> >
> > There are 5 groups of order 1625.
> > They are sorted by normal Sylow subgroups.
> > 1 - 5 are the nilpotent groups.
> >
> > How can I obtain such a pleasant info like the following?
> >
> > gap> SmallGroupsInformation(125);
> >
> > There are 5 groups of order 125.
> > 1 is of type c125.
> > 2 is of type 5x25.
> > 3 is of type 5^2:5.
> > 4 is of type 25:5.
> > 5 is of type 5^3.
> >
> > And, by the way, what does the colon stand for in the 125,3 and 125,4
> > type descriptions? I failed to find the explanation in the help
> pages.
> >
> > Regards,
> > Paweł Laskoś-Grabowski
> >
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