When is the search of relatively maximal subgroups reduced to quotients?

Abstract

Let X be a class of finite groups closed under taking subgroups, homomorphic images, and extensions. Denote by kX(G) the number of conjugacy classes X-maximal subgroups of a finite group G. The natural problem to describe up to conjugacy X-maximal subgroups of a given finite group is complicated by the fact that it is not inductive. In particular, generally speaking, the image of an X-maximal subgroup is not X-maximal in the image of a homomorphism. Nevertheless, there are group homomorphisms which preserve the number of conjugacy classes of X-maximal subgroups (for example, the homomorphisms whose kernels are X-groups). Under such homomorphisms, the image of an X-maximal subgroup is always X-maximal and, moreover, there is a natural bijection between the conjugacy classes of X-maximal subgroups of the image and preimage. All such homomorphisms are completely described in the paper. More precisely, it is proved that, for a homomorphism φ from a group G, the equality kX(G)=kX(im\, φ) holds if and only if kX( φ)=1, which in turn is equivalent to the fact that the composition factors of the kernel of φ belong to an explicitly given list.

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