A Generalization of Hall-Wielandt Theorem

Abstract

Let G be a finite group and P∈ Sylp(G). We denote the k'th term of the upper central series of G by Zk(G) and the norm of G by Z*(G). In this article, we prove that if for every tame intersection P Q such that Zp-1(P)<P Q<P, the group NG(P Q) is p-nilpotent then NG(P) controls p-transfer in G. For p=2, we sharpen our results by proving if for every tame intersection P Q such that Z*(P)<P Q<P, the group NG(P Q) is p-nilpotent then NG(P) controls p-transfer in G. We also obtain several corollaries which give sufficient conditions for NG(P) to controls p-transfer in G as a generalization of some well known theorems, including Hall-Wielandt theorem and Frobenius normal complement theorem.