Classification of the finite-dimensional unitary representations of type B rational Cherednik algebras
Abstract
We compare crystal combinatorics of the level 2 Fock space with the classification of unitary representations of type B rational Cherednik algebras to show that any finite-dimensional unitary irreducible representation of such an algebra is labeled by a bipartition consisting of a rectangular partition in one component and the empty partition in the other component. This is a new proof of a result that can be deduced from theorems of Montarani and Etingof-Stoica.
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