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Quantum deformation of the ladder representations of U(1,1) for ‖q‖=1
1.G. Mack and V. Schomerus, Nucl. Phys. B 370, 185 (1992).
2.T. Masuda, T. Mimachi, Y. Nakagami, M. Noumi, Y. Saburi, and R. Ueno, Lett. Math. Phys. 19, 187 (1990);
2.T. Masuda, T. Mimachi, Y. Nakagami, M. Noumi, Y. Saburi, and R. Ueno, 19, 195 (1990)., Lett. Math. Phys.
3.N. A. Liskova and A. N. Kirillov, Clebsch-Gordan and Racah-Wigner coefficients for Kyoto preprint RIMS-843 (November 1991).
4.G. Mack and I. T. Todorov, J. Math. Phys. 10, 2078 (1969).
5.M. Flato and C. Fronsdal, “Singletons: fundamental gauge theory,” in Topological and Geometrical Methods in Field Theory, Symposium in Espoo, Finland, 1986, edited by J. Hietarinta and J. Westerholm (World Scientific, Singapore, 1986), pp. 273–290.
6.J. Lukierski, A. Nowicki, H. Ruegg, and V. Tolstoy, Phys. Lett. B 264, 331 (1991).
7.W. Pusz and S. L. Woronowicz, Rep. Math. Phys. 27, 231 (1989).
8.L. K. Hadjiivanov, R. R. Paunov, and I. T. Todorov, J. Math. Phys. 33, 1379 (1992).
9.L. C. Biedenharn and M. A. Lohe, “Quantum groups and basic hypergeometric functions,” in Proceedings of the Argonne Workshop “Quantum Groups” (16 April-11 May 1990), edited by T. Curtright et al. (World Scientific, Singapore, 1991), pp. 123–132.
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