A family of quantum projective spaces and related q-hypergeometric orthogonal polynomials
Abstract
We define a one-parameter family of two-sided coideals in Uq(gl(n)) and study the corresponding algebras of infinitesimally right invariant functions on the quantum unitary group Uq(n). The Plancherel decomposition of these algebras with respect to the natural transitive Uq(n)-action is shown to be the same as in the case of a complex projective space. By computing the radial part of a suitable Casimir operator, we identify the zonal spherical functions (i.e. infinitesimally bi-invariant matrix coefficients of finite-dimensional irreducible representations) as Askey-Wilson polynomials containing two continuous and one discrete parameter. In certain limit cases, the zonal spherical functions are expressed as big and little q-Jacobi polynomials depending on one discrete parameter.
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