q-Analogue of the degree zero part of a rational Cherednik algebra

Abstract

Inside the double affine Hecke algebra of type GLn, which depends on two parameters q and τ, we define a subalgebra Hgln that may be thought of as a q-analogue of the degree zero part of the corresponding rational Cherednik algebra. We prove that the algebra Hgln is a flat τ-deformation of the crossed product of the group algebra of the symmetric group with the image of the Drinfeld-Jimbo quantum group Uq(gln) under the q-oscillator (Jordan-Schwinger) representation. We find all the defining relations and an explicit PBW basis for the algebra Hgln. We describe its centre and establish a double centraliser property. As an application, we also obtain new integrable generalisations of Hamiltonians introduced by van Diejen.

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