On the multiplicities of the character codegrees

Abstract

Let G be a finite group and ? be an irreducible character of G, the number cod(?) = jG : Let G be a finite group and be an irreducible character of G , the number () = |G: ()|/(1) is called the codegree of . Also, (G) = \ () \ | \ ∈ (G) \ . For d∈(G), the multiplicity of d in G, denoted by m'G(d), is the number of irreducible characters of G having codegree d. A finite group G is called a T'k-group for some integer k≥ 1, if there exists d0∈(G) such that m'G(d0)=k and for every d∈(G)-\d0\, we have m'G(d)=1. In this note we characterize finite T'k-groups completely, where k≥ 1 is an integer.