Covariant q-differential operators and unitary highest weight representations for Uq su(n,n)

Abstract

We investigate a one-parameter family of quantum Harish-Chandra modules of Uq sl(2n). This family is an analog of the holomorphic discrete series of representations of the group SU(n,n) for the quantum group Uq su(n, n). We introduce a q-analog of "the wave" operator (a determinant-type differential operator) and prove certain covariance property of its powers. This result is applied to the study of some quotients of the above-mentioned quantum Harish-Chandra modules. We also prove an analog of a known result by J.Faraut and A.Koranyi on the expansion of reproducing kernels which determines the analytic continuation of the holomorphic discrete series.

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