The uniqueness of vertex pairs in π-separable groups
Abstract
Let G be a finite π-separable group, where π is a set of primes, and let be an irreducible complex character that is a π-lift of some π-partial character of G.It was proved by Cossey and Lewis that all of the vertex pairs for are linear and conjugate in G if 2∈π, but the result can fail for 2π. In this paper we introduce the notion of the twisted vertices in the case where 2π, and establish the uniqueness for linear twisted vertices under the conditions that either is an N-lift for a π-chain N of G or it has a linear Navarro vertex, thus answering a question proposed by them.
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