Algorithmically distinguishing irreducible characters of the symmetric group

Abstract

Suppose that λ and μ are distinct irreducible characters of the symmetric group Sn. We give an algorithm that, in time polynomial in n, constructs π∈ Sn such that λ(π) is provably different from μ(π). In fact, we show a little more. Suppose f=λ for some irreducible character λ of Sn, but we do not know λ, and we are given only oracle access to f. We give an algorithm that determines λ, using a number of queries to f that is polynomial in n. Each query can be computed in time polynomial in n by someone who knows λ.