Sylow subgroups for distinct primes and intersection of nilpotent subgroups

Abstract

Let G be a finite group and let (Pi)i=1n be Sylow subgroups for distinct primes p1,…,pn. We conjecture that there exists x ∈ G such that Pi Pix is inclusion-minimal in \ Pi Pig : g ∈ G\ for all i. As a first step in this direction, we show that a finite group cannot be covered by (proper) Sylow normalizers for distinct primes. Then we settle the conjecture in two opposite situations: symmetric and alternating groups of large degree and metanilpotent groups of odd order. Applications concerning the intersections of nilpotent subgroups are discussed.