Title of article
Operator identities involving the bivariate Rogers–Szegö polynomials and their applications to the multiple q-series identities
Author/Authors
Zhizheng Zhang، نويسنده ,
Issue Information
دوهفته نامه با شماره پیاپی سال 2008
Pages
20
From page
884
To page
903
Abstract
In this paper, we first give several operator identities involving the bivariate Rogers–Szegö polynomials. By applying the technique
of parameter augmentation to the multiple q-binomial theorems given by Milne [S.C. Milne, Balanced 3φ2 summation
theorems for U(n) basic hypergeometric series, Adv. Math. 131 (1997) 93–187], we obtain several new multiple q-series identities
involving the bivariate Rogers–Szegö polynomials. These include multiple extensions of Mehler’s formula and Rogers’s formula.
Our U(n + 1) generalizations are quite natural as they are also a direct and immediate consequence of their (often classical)
known one-variable cases and Milne’s fundamental theorem for An or U(n + 1) basic hypergeometric series in Theorem 1.49 of
[S.C.Milne, An elementary proof of theMacdonald identities for A
(1)
l , Adv.Math. 57 (1985) 34–70], as rewritten in Lemma 7.3 on
p. 163 of [S.C.Milne, Balanced 3φ2 summation theorems for U(n) basic hypergeometric series, Adv.Math. 131 (1997) 93–187] or
Corollary 4.4 on pp. 768–769 of [S.C. Milne, M. Schlosser, A new An extension of Ramanujan’s 1ψ1 summation with applications
to multilateral An series, Rocky Mountain J. Math. 32 (2002) 759–792].
© 2008 Elsevier Inc. All rights reserved.
Keywords
Operator identity , Multiple q-series identity , Mehler’s formula , Rogers’s formula , Bivariate Rogers–Szeg? polynomial , Milne’sfundamental theorem for An or U(n+ 1) basic hypergeometric series
Journal title
Journal of Mathematical Analysis and Applications
Serial Year
2008
Journal title
Journal of Mathematical Analysis and Applications
Record number
937152
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