The existence of pronormal π-Hall subgroups in Eπ-groups
Abstract
A subgroup H of a group G is called pronormal, if for every g∈ G subgroups H and Hg are conjugate in H, Hg. It is proven that if a finite group G possesses a π-Hall subgroup for a set of primes π, the every its normal subgroup (in particular, G itself) possesses a π-Hall subgroup that is pronormal in~G.
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