A G-covering subgroup system of a finite group for some classes of σ-soluble groups

Abstract

Let F be a class of group and G a finite group. Then a set of subgroups of G is called a G-covering subgroup system for the class F if G∈ F whenever ⊂eq F. We prove that: If a set of subgroups of G contains at least one supplement to each maximal subgroup of every Sylow subgroup of G, then is a G-covering subgroup system for the classes of all σ-soluble and all σ-nilpotent groups, and for the class of all σ-soluble Pσ T-groups. This result gives positive answers to questions 19.87 and 19.88 from the Kourovka notebook.

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