An integral Representation of a 10ϕ9 and Continuous Bi-Orthogonal 10ϕ9 Rational Functions

Mizan Rahman

doi:10.4153/CJM-1986-030-6

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1. Introduction. One of the most remarkable q-extensions of the classical beta integral was recently introduced by Askey and Wilson [1]

(1.1)

where |q| < 1 and the pairwise products of {a, b, c, d} as a multiset do not belong to the set {qj, j = 0, – 1, – 2, …}. The contour C is the unit circle described in the positive direction, but with suitable deformations to separate the sequences of poles converging to zero from the sequences of poles diverging to infinity. The symbol (A; q)∞ is an infinite product defined by

(1.2)

whenever it converges.

References

1. Askey, R. and Wilson, J. A., Some basic hyper geometric polynomials that generalize Jacobi polynomials, Mem. Amer. Math. Soc. 54 (1985).Google Scholar

2. Bailey, W. N., Generalized hyper geometric series (Stechert-Hafner Service Agency, New York and London, 1964).Google Scholar

3. Bailey, W. N., Well-poised basic hyper geometric series, Quart. J. Math. (Oxford) 18 (1947), 157–166.Google Scholar

4. Nassrallah, B. and Rahman, Mizan, Projection formulas, a reproducing kernel and a generating function for q-Wilson polynomials, SIAM J. Math. Anal. 16 (1985), 186–197.Google Scholar

5. Slater, L. J., Generalized hyper geometric functions (Cambridge University Press, 1966).Google Scholar

6. Wilson, J. A., Some hyper geometric orthogonal polynomials, SIAM J. Math. 11 (1980), 690–701.Google Scholar

7. Wilson, J. A. private communication.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Rahman, Mizan 1986. Another Conjectured q-Selberg Integral. SIAM Journal on Mathematical Analysis, Vol. 17, Issue. 5, p. 1267.

Rahman, Mizan 1988. A projection formula for the Askey-Wilson polynomials and an application. Proceedings of the American Mathematical Society, Vol. 103, Issue. 4, p. 1099.

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Rahman, Mizan 1991. Biorthogonality of a System of Rational Functions with Respect to a Positive Measure on $[ - 1,1]$. SIAM Journal on Mathematical Analysis, Vol. 22, Issue. 5, p. 1430.

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An integral Representation of a 10ϕ9 and Continuous Bi-Orthogonal 10ϕ9 Rational Functions

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