On finite 2-groups all of whose subgroups are mutually isomorphic. (Q1042895)

Let \(G\) be a finite nonabelian 2-group. If all of its maximal subgroups are isomorphic then it is called isomaximal. The study of isomaximal finite groups is motivated by the study of second-metacyclic groups by \textit{V. Ćepulić, M. Ivanković, E. Kovač Striko} [Glas. Mat., III. Ser. 40, No. 1, 59-69 (2005; Zbl 1081.20023)]. First, the author determines isomaximal groups \(G\) when the maximal subgroups are Abelian. Then the structure of isomaximal groups \(G\) with the maximal subgroups nonabelian is investigated, for instance, the exponent of \(G\) and the exponents of the maximal subgroups should coincide. By the results of the above-mentioned paper, there is only one isomaximal group \(G\) of order 64 with the second-maximal subgroups nonabelian. Moreover, the author determines all isomaximal groups \(G\) of order less than 64 with the maximal subgroups nonabelian: such groups can be easily found for the order 16, for the order 32, however, there are no such groups.