A cyclic sieving phenomenon for symplectic tableaux

Abstract

We give a cyclic sieving phenomenon for symplectic λ-tableaux SP(λ,2m), where λ is a partition of an odd integer n and gcd(m,p)=1 for any odd prime p≤ n. We use the crystal structure on Kashiwara-Nakashima symplectic tableaux to get a cyclic sieving action as the product σ of simple reflections in the Weyl group. The cyclic sieving polynomial is the q-anologue of the hook-content formula for symplectic tableaux. More generally, we give a CSP for symplectic skew tableaux with analogous conditions on the shape and a cyclic group action that rotates tableaux weights in a way motivated by the σ-action.