Harmonics on the Quantum Euclidean Space Related to the Quantum Orthogonal Group

Abstract

The aim of this paper is to study harmonic polynomials on the quantum Euclidean space ENq generated by elements xi, i=1,2,...,N, on which the quantum group SOq(N) acts. The harmonic polynomials are defined as solutions of the equation q p=0, where p is a polynomial in xi, i=1,2,...,N, and the q-Laplace operator q is determined in terms of the differential operators on ENq. The projector Hm: cal Am Hm is constructed, where Am and Hm are the spaces of homogeneous of degree m polynomials and homogeneous harmonic polynomials, respectively. By using these projectors, a q-analogue of the classical zonal polynomials and associated spherical polynomials with respect to the quantum subgroup SOq(N-2) are constructed. The associated spherical polynomials constitute an orthogonal basis of Hm. These polynomials are represented as products of polynomials depending on q-radii and xj, xj', j'=N-j+1. This representation is in fact a q-analogue of the classical separation of variables. The dual pair (Uq(sl2), Uq(son)) is related to the action of SOq(N) on ENq. Decomposition into irreducible constituents of the representation of the algebra Uq(sl2)× Uq(son) defined by the action of this algebra on the space of all polynomials on ENq is given.

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