On embedding theorems for X-subgroups

Abstract

Let X be a class of finite groups closed under subgroups, homomorphic images, and extensions. We study the question which goes back to the lectures of H. Wielandt in 1963-64: For a given X-subgroup K and maximal X-subgroup H, is it possible to see embeddability of K in H (up to conjugacy) by their projections onto the factors of a fixed subnormal series. On the one hand, we construct examples where K has the same projections as some subgroup of H but is not conjugate to any subgroup of H. On the other hand, we prove that if K normalizes the projections of a subgroup H, then K is conjugate to a subgroup of H even in the more general case when H is a submaximal X-subgroup.