The sl∞-crystal combinatorics of higher level Fock spaces

Abstract

For integers e,≥ 2, the level Fock space has an sl∞-crystal structure arising from the action of a Heisenberg algebra, intertwining the sle-crystal. The vertices of these crystals are charged -partitions. We give the combinatorial rule for computing the arrows anywhere in the sl∞-crystal. This allows us to pinpoint the location of any charged -partition. As an application, we compute the support of the spherical representation of a cyclotomic rational Cherednik algebra, and in particular, the set of parameters such that it is finite-dimensional. We also give an easy abacus characterization of all finite-dimensional representations of type B Cherednik algebras.