Isomorphism of relative holomorphs and matrix similarity
Abstract
Let V be a finite-dimensional vector space over the field with p elements, where p is a prime number. Given arbitrary α,β∈ GL(V), we consider the semidirect products V α and V β, and show that if V α and V β are isomorphic, then α must be similar to a power of β that generates the same subgroup as β; that is, if H and K are cyclic subgroups of GL(V) such that V H V K, then H and K must be conjugate subgroups of GL(V). If we remove the cyclic condition, there exist examples of non-isomorphic, let alone non-conjugate, subgroups H and K of GL(V) such that V H V K. Even if we require that non-cyclic subgroups H and K of GL(V) be abelian, we may still have V H V K with H and K non-conjugate in GL(V), but in this case, H and K must at least be isomorphic. If we replace V by a free module U over Z/pm Z of finite rank, with m>1, it may happen that U H U K for non-conjugate cyclic subgroups of GL(U). If we completely abandon our requirements on V, a sufficient criterion is given for a finite group G to admit non-conjugate cyclic subgroups H and K of Aut(G) such that G H G K. This criterion is satisfied by many groups.
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