On the intersections of solvable Hall subgroups in finite groups
Abstract
In the paper we consider the following conjecture: if a finite group G possesses a solvable π-Hall subgroup H, then there exist elements x,y,z,t∈ G such that the identity H Hx Hy Hz Ht=Oπ(G) holds. The minimal counter example is shown to be an almost simple group of Lie type.
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