Clifford theory of characters in induced blocks

Abstract

We present a new criterion to predict if a character of a finite group extends. Let G be a finite group and p a prime. For N G, we consider p-blocks b and b' of N and NN(D), respectively, with (b')N=b, where D is a defect group of b'. Under the assumption that G coincides with a normal subgroup G[b] of G, which was introduced by Dade early 1970's, we give a character correspondence between the sets of all irreducible constituents of φG and those of (φ') NG(D) where φ and φ' are irreducible Brauer characters in b and b', respectively. This implies a sort of generalization of the theorem of Harris-Kn\"orr. An important tool is the existence of certain extensions that also helps in checking the inductive Alperin-McKay and inductive Blockwise Alperin Weight conditions, due to the second author.