On the complexity of computing Kronecker coefficients

Abstract

We study the complexity of computing Kronecker coefficients g(λ,μ,). We give explicit bounds in terms of the number of parts in the partitions, their largest part size N and the smallest second part M of the three partitions. When M = O(1), i.e. one of the partitions is hook-like, the bounds are linear in N, but depend exponentially on . Moreover, similar bounds hold even when M=eO(). By a separate argument, we show that the positivity of Kronecker coefficients can be decided in O( N) time for a bounded number of parts and without restriction on M. Related problems of computing Kronecker coefficients when one partition is a hook, and computing characters of Sn are also considered.