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Some Extensions of Askey-Wilson's Q-Beta Integral and the Corresponding Orthogonal Systems

Published online by Cambridge University Press:  20 November 2018

Mizan Rahman
Mizan Rahman*
Affiliation:
Department of Mathematics and Statistics, Carleton University Ottawa, Ontario K1S 5B6, Canada
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Abstract

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A seven-parameter extension of Askey and Wilson's four parameter q-beta integral is written in a symmetric form as the sum of multiples of two very-well-poised balanced basic hypergeometric 10Φ9 series. Two special cases are considered in which the evaluation of the integral gives single terms by the q-Dixon formula in one case and by a special case of the Verma-Jain formula in the other. An orthogonal polynomial system is obtained in the first case and a system of biorthogonal rational function is obtained in the second. It is also shown that the biorthogonal system represents a generalization of Rogers’ q-ultraspherical polynomials.

Keywords

33A6533A70

Information

Type
Research Article
Information
Canadian Mathematical Bulletin , Volume 31 , Issue 4 , 01 December 1988 , pp. 467 - 476
Copyright
Copyright © Canadian Mathematical Society 1988

References

1. Askey, R. and Ismail, M. E. H. A generalization of ultraspherical polynomials Studies in Pure Mathematics (P. Erdôs, ed.), Boston, Birkhäuser, (1982), pp. 5678.Google Scholar
2. Aksey, R. and Wilson, J., Some basic hyper geometric polynomials that generalize Jacobi polynomials Mem. Amer. Math. Sec. 54 (1985), #319.Google Scholar
3. Bailey, W. N., Well-poised basic hyper geometric series Quart. J. Math. (Oxford), 18 (1947), pp. 157166.Google Scholar
4. Koornwinder, Tom H., Jacobi polynomials, III. An analytic proof of the addition formula SIAM J. Math. Anal. 6 (1975), pp. 533543.Google Scholar
5. Nassrallah, B. and Rahman, M., Projection formulas, a reproducing kernel and a generating function for q- Wilson polynomials SIAM J. Math. Anal. 16 (1985), pp. 186197.Google Scholar
6. Rahman, M., An integral representation of a 10Φ9 and continuous biorthogonal rational functions Can. J. Math. 38 (1986), pp. 605618.Google Scholar
7. Sears, D. B., On the transformation theory of basic hyper geometric functions Proc. Lond. Math. Soc. 53(1951), pp. 158180.Google Scholar
8. Slater, L. J., Generalized hyper geometric functions Cambridge University Press, London and New York, 1966.Google Scholar
9. Verma, A. and Jain, V. K., Transformations of nonterminating hyper geometric series, their contour integrals and applications to Rogers-Ramanujan identities J. Math. Anal. Appl. 87 (1982), pp. 944.Google Scholar