Models ofQ-Algebra Representations: The Group of Plane Motions
- 1 March 1994
- journal article
- Published by Society for Industrial & Applied Mathematics (SIAM) in SIAM Journal on Mathematical Analysis
- Vol. 25 (2) , 513-527
- https://doi.org/10.1137/s0036141092224613
Abstract
No abstract availableThis publication has 13 references indexed in Scilit:
- Addition formulas for q-Bessel functionsJournal of Mathematical Physics, 1992
- Models of q-algebra representations: Tensor products of special unitary and oscillator algebrasJournal of Mathematical Physics, 1992
- q-Orthogonal polynomials and the oscillator quantum groupLetters in Mathematical Physics, 1991
- The Addition Formula for Littleq-Legendre Polynomials and the ${\operatorname{SU}}(2)$ Quantum GroupSIAM Journal on Mathematical Analysis, 1991
- Unitary representations of the quantum group SU q (1,1): Structure of the dual space ofU q (sl(2))Letters in Mathematical Physics, 1990
- Representations of the twisted SU(2) quantum group and some q-hypergeometric orthogonal polynomialsIndagationes Mathematicae, 1989
- Symmetry techniques for $q$-series: Askey-Wilson polynomialsRocky Mountain Journal of Mathematics, 1989
- The Clebsch-Gordan coefficients for the quantum group SμU(2) and q-Hahn polynomialsIndagationes Mathematicae, 1989
- Canonical Equations and Symmetry Techniques forq-SeriesSIAM Journal on Mathematical Analysis, 1987
- Aq-difference analogue of U(g) and the Yang-Baxter equationLetters in Mathematical Physics, 1985