Overlap Identities for Littlewood-Schur Functions

Abstract

Our results revolve around a new operation on partitions, which we call overlap. We prove two overlap identities for so-called Littlewood-Schur functions. Littlewood-Schur functions are a generalization of Schur functions, whose study was introduced by Littlewood. More concretely, the Littlewood-Schur function LSλ(X; Y) indexed by the partition λ is a polynomial in the variables X Y that is symmetric in both X and Y separately. The first overlap identity represents LS λ(X; Y) as a sum over subsets of X, while the second overlap identity essentially represents LSλ(X; Y) as a sum over pairs of partitions whose overlap equals λ. Both identities are derived by applying Laplace expansion to a determinantal formula for Littlewood-Schur functions due to Moens and Van der Jeugt. In addition, we give two visual characterizations for the set of all pairs of partitions whose overlap is equal to a partition λ.