A reciprocity law and the skew Pieri rule for the symplectic group

Abstract

We use the theory of skew duality to show that decomposing the tensor product of k irreducible representations of the symplectic group Sp2m = Sp2m(C) is equivalent to branching from Sp2n to Sp2n1×·s× Sp2nk where n, n1,…, nk are positive integers such that n = n1+·s+nk and the nj's depend on m as well as the representations in the tensor product. Using this result and a work of J. Lepowsky, we obtain a skew Pieri rule for Sp2m, i.e., a description of the irreducible decomposition of the tensor product of an irreducible representation of the symplectic group Sp2m with a fundamental representation.