Character triples and relative defect zero characters

Abstract

Given a character triple (G,N,θ), which means that G is a finite group with N G and θ∈ Irr(N) is G-invariant, we introduce the notion of a π-quasi extension of θ to G where π is the set of primes dividing the order of the cohomology element [θ]G/N∈ H2(G/N,C×) associated with the character triple, and then establish the uniqueness of such an extension in the normalized case. As an application, we use the π-quasi extension of θ to construct a bijection from the set of π-defect zero characters of G/N onto the set of relative π-defect zero characters of G over θ. Our results generalize the related theorems of M. Murai and of G. Navarro.