Citations of

William Y.C. Chen and A. M. Fu, Semi-finite forms of bilateral basic hypergeometric series, Proc. Amer. Math. Soc. 134 (2006) 1719--1725.

1. S.A. Ali and S.N. Rizvi, Transformations from Bilateral Basic Hypergeometric to Unilateral Basic Hypergeometric Series, International Bulletin of Mathematical Research, 2(2015) 1-4.

2. V.Y.B. Chen, W.Y.C. Chen and N.S.S. Gu, On the Bilateral Series $&space;_2\psi_2$, arXiv:math/0701062.

3. W.Y.C. Chen, Q.H. Hou and Y.P. Mu, Non-terminating basic hypergeometric series and the q-Zeilberger algorithm, Proc. Edinb. Math. Soc. ( 2 ), 51(2008) 609-633.

4. J. Fokko and E.M. Rains, Basic Hypergeometric Functions as Limits of Elliptic Hypergeometric Functions, SIGMA Symmetry Integrability Geom. Methods Appl. 5(2009),059.

5. F. Jouhet, More Semi-Finite Forms of Bilateral Basic Hypergeometric Series, Ann. Combin. 11(2007) 47-57.

6. K.N. Murthy, A study of the theory of basic hypergeometric series and allied topics, preprint.

7. D. D. Somashekara, K. Narasimha Murthy, and S. L. Shalini, On Bailey's $&space;_2\psi_2$ transformation, New Zealand J. Math. 42(2012) 107-113.

8. P. Srivastava, T. Elfrgani, A. Paul and M. Eltikali, a note on transformation formulae for bilateral basic hypergeometric series, Int. J. Appl. Math. Comput. 26(2013) 525-536.

9. C. Wei, Q.Yan and D. Gong, Nonterminating generalizations of four summation formulas for bilateral q-series, arXiv:1301.4476.

10. C. Wei, Q. Yan and J. Li, A short proof for Dougall’s $_2H_2$-series identity, Discrete Math. 312(2012) 2997-2999.

11. Z. Zhang and Q. Hu, On the bilateral series $_5\psi_5$, J. Math. Anal. Appl. 337(2008) 1002-1009.

12. Z. Zhang and Q. Hu, On the very-well-poised bilateral basic hypergeometric series, J. Math. Anal. Appl. 367(2010) 657-668.

13. Z.Z. Zhang and Z. Jia, Some transformations on the bilateral series $_2\psi_2$, Rocky Mountain J. Math. 44(2014) 1697-1713.

14. C.H. Zhang and Z.Z. Zhang,Two new transformation formulas of basic hypergeometric series, J. Math. Anal. Appl. 336(2007) 777-787.

15. J.M. Zhu, A Semi-Finite Proof of Jacobi’s Triple Product Identity. Amer. Math. Monthly,122(2015) 1008-1009.

16. ¹ÈÉºÉº. ¹ØÓÚË«±ß¼¶Êý $&space;_2\psi_2$, 2012.

17. ÍõÏãÀö, ÎºÔÞÇì, Áõ¶¬·¼. Ò»¸öÐÂµÄ $&space;_2\psi_2$ ±ä»»¹«Ê½, ÖØÇìÊ¦·¶´óÑ§Ñ§±¨ (×ÔÈ»¿ÆÑ§°æ), 2012,6: 012.

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