Sectionally indecomposable groups

Abstract

We introduce the notion of sectional indecomposability and study it for finite groups: a group H is sectionally indecomposable if, whenever H is a section of a direct product A × B, then H is already a section of A or of B. We show that the study of sectionally indecomposable finite groups reduces to the monolithic case. Our main result is a complete characterisation of sectional indecomposability for monolithic primitive groups: such a group G with N = soc(G) is sectionally indecomposable if and only if either N is non-abelian, or N is a p-group and Op'(G/N) ≠ 1. The proof relies on the introduction of the notion of an H-Frattini module and on the theory of the universal p-Frattini cover, together with a result of Griess--Schmid. As a corollary, every monolithic primitive solvable group is sectionally indecomposable. We also discuss the non-primitive case, which appears significantly harder, and highlight open questions concerning monolithic p-groups.