An extension of the Glauberman ZJ-Theorem

Abstract

Let p be an odd prime and let Jo(X), Jr(X) and Je(X) denote the three different versions of Thompson subgroups for a p-group X. In this article, we first prove an extension of Glauberman's replacement theorem. Secondly, we prove the following: Let G be a p-stable group and P∈ Sylp(G). Suppose that CG(Op(G))≤ Op(G). If D is a strongly closed subgroup in P, then Z(Jo(D)), (Z(Jr(D))) and (Z(Je(D))) are normal subgroups of G. Thirdly, we show the following: Let G be a Qd(p)-free group and P∈ Sylp(G). If D is a strongly closed subgroup in P, then the normalizers of the subgroups Z(Jo(D)), (Z(Jr(D))) and (Z(Je(D))) control strong G-fusion in P. We also prove a similar result for a p-stable and p-constrained group. Lastly, we give a p-nilpotency criteria, which is an extension of Glauberman-Thompson p-nilpotency theorem.