Lifts of Brauer characters in characteristic two

Abstract

A conjecture raised by Cossey in 2007 asserts that if G is a finite p-solvable group and is an irreducible p-Brauer character of G with vertex Q, then the number of lifts of is at most |Q:Q'|. This conjecture is now known to be true in several situations for p odd, but there has been little progress for p even. The main obstacle appeared in characteristic two is that all the vertex pairs of a lift are neither linear nor conjugate. In this paper we show that if is a lift of an irreducible 2-Brauer character in a solvable group, then has a linear Navarro vertex if and only if all the vertex pairs of are linear, and in that case all of the twisted vertices of are conjugate. Our result can also be used to study other lifting problems of Brauer characters in characteristic two. As an application, we prove a weaker form of Cossey's conjecture for p=2 "one vertex at a time".