Dear Forum, According to the following text, I would like to introduce the group G in GAP: "In the general linear group GL(4,2) and also in GL(4,3) there exists a Frobenius group E:=K : C of order 20 such that K acts fixed-point-freely on corresponding natural modules V_1 and V_2. Now if we take G:=(V_1 \times V_2) . E with the natural action of E on direct factors, then G is a 2-Frobenius group. Thanks alot in advance, Negin _______________________________________________ Forum mailing list Forum@mail.gap-system.org http://mail.gap-system.org/mailman/listinfo/forum
