> < ^ Date: Fri, 05 Apr 2002 16:57:40 +0200
> < ^ From: Nicola Sottocornola <n_sotto@club-internet.fr >
> ^ Subject: The group G^{3,7,16}

Dear GAP-forum,

let f be the free-group with three generators and

g:=f/[f.1^3, f.2^7, f.3^16, (f.1*f.2)^2, (f.2*f.3)^2, (f.3*f.1)^2,
(f.1*f.2*f.3)^2].

g is the group G^{3,7,16} in Coxeter notations. Its order is 21504. I'm
interested in the IdGroup numbers of all its subgroups (if any) with
order 192.

Can someone help me?

Thanks, Nicola.

Miles-Receive-Header: reply


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