par Irac-Astaud, Michèle;Quesne, Christiane
Référence Journal of mathematical physics, 40, 6, page (3146-3161)
Publication Publié, 1999-06
Référence Journal of mathematical physics, 40, 6, page (3146-3161)
Publication Publié, 1999-06
Article révisé par les pairs
Résumé : | Some time ago, Rideau and Winternitz introduced a realization of the quantum algebra suq(2) on a real two-dimensional sphere, or a real plane, and constructed a basis for its representations in terms of q-special functions, which can be expressed in terms of q-Vilenkin functions, and are related to little q-Jacobi functions, q-spherical functions, and q-Legendre polynomials. In their study, the values of q were implicitly restricted to q ∈ ℝ+. In the present paper, we extend their work to the case of generic values of q ∈ S1 (i.e., q values different from a root of unity). In addition, we unitarize the representations for both types of q values, q ∈ ℝ+ and generic q ∈ S1 by determining some appropriate scalar products. From the latter, we deduce the orthonormality relations satisfied by the q-Vilenkin functions. |