Finite groups with some particular maximal invariant subgroups being nilpotent or all non-nilpotent maximal invariant subgroups being normal

Abstract

Let A and G be finite groups such that A acts coprimely on G by automorphisms. We provide a complete classification of a finite group G in which every maximal A-invariant subgroup containing the normalizer of some A-invariant Sylow subgroup is nilpotent. Moreover, we show that both the hypothesis that every maximal A-invariant subgroup of G containing the normalizer of some A-invariant Sylow subgroup is nilpotent and the hypothesis that every non-nilpotent maximal A-invariant subgroup of G is normal are equivalent.