Deformations of unitary Howe dual pairs

Abstract

We study deformations of the Howe dual pairs (U(n),u(1,1)) and (U(n),u(2|1)) to the context of a rational Cherednik algebra H1,c(G,E) associated with a real reflection group G acting on a real vector space E of even dimension. For each pair, we show that the Lie (super)algebra structure of one partner is preserved under the deformation, which leads to a multiplicity-free decomposition of the standard module or its tensor product with a spinor space. For the case where E is two-dimensional and G is a dihedral group, we provide complete descriptions for the deformed pair and the relevant joint-decomposition.