Center-preserving irreducible representations of finite groups

Abstract

Given finite groups H ≤ G, a representation σ of G is called center-preserving on H if the only elements of H that become central under σ are those that were already central in G. We prove that if H has a faithful irreducible representation , then at least one of the irreducible components of the induction IndHG() is center-preserving on H. In consequence, H has a faithful irreducible representation if and only if every finite group G containing H as a subgroup has an irreducible representation whose restriction to H is faithful, and which is center-preserving on H. In addition, we give examples illustrating the sharpness of the statement, and discuss the connection with projective representations.