Finite dimensional representations of the quantum group GLp,q(2) using the exponential map from Up,q(gl(2))
Abstract
Using the Fronsdal-Galindo formula for the exponential mapping from the quantum algebra Up,q(gl(2)) to the quantum group GLp,q(2), we show how the (2j+1)-dimensional representations of GLp,q(2) can be obtained by `exponentiating' the well-known (2j+1)-dimensional representations of Up,q(gl(2)) for j = 1,3/2,... ; j = 1/2 corresponds to the defining 2-dimensional T-matrix. The earlier results on the finite-dimensional representations of GLq(2) and SLq(2) (or SUq(2)) are obtained when p = q. Representations of Uq,q(2) (q ∈ and Uq(2) (q ∈ \0\) are also considered. The structure of the Clebsch-Gordan matrix for Up,q(gl(2)) is studied. The same Clebsch-Gordan coefficients are applicable in the reduction of the direct product representations of the quantum group GLp,q(2).
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