Minimum F-covers: the supersolvable and metabelian cases

Abstract

Given a set F of finite groups, it is said that a group G is an F-cover if every group in F is isomorphic to a subgroup of G. Moreover, G is a minimum F-cover if there is no F-cover whose order is less than |G|. In [Cameron P. J., et al., Minimal cover groups, J. Algebra 660 (2024)], the authors pose the following question: For which classes X of groups, closed under taking subgroups and direct products, is it true that, if F is a set of X-groups, then there is a minimum F-cover which is an X-group? In this paper, we give a negative answer in two cases: X∈ \``supersolvable", ``metabelian"\.