Invariant tensors and the cyclic sieving phenomenon

Abstract

We construct a large class of examples of the cyclic sieving phenomenon by expoiting the representation theory of semi-simple Lie algebras. Let M be a finite dimensional representation of a semi-simple Lie algebra and let B be the associated Kashiwara crystal. For r 0, the triple (X,c,P) which exhibits the cyclic sieving phenomenon is constructed as follows: the set X is the set of isolated vertices in the crystal rB; the map c X→ X is a generalisation of promotion acting on standard tableaux of rectangular shape and the polynomial P is the fake degree of the Frobenius character of a representation of Sr related to the natural action of Sr on the subspace of invariant tensors in rM. Taking M to be the defining representation of SL(n) gives the cyclic sieving phenomenon for rectangular tableaux.