1 |
Andrews, George E. and Askey, Richard and Roy, Ranjan, Special functions, Cambridge University Press, Cambridge, UK ; New York, NY, USA, Encyclopedia of mathematics and its applications, (1999).
|
2 |
Bailey, Wilfrid Norman, Generalized hypergeometric series, The University Press, Cambridge Eng., Cambridge tracts in mathematics and mathematical physics, (1935)
|
3 |
Choi, J. and Rathie, A. K., A new class of integrals involving generalized hypergeometric function, Far East J. Math. Sci., 102(7), pp. 1559-1570, (2017).
|
4 |
Choi, J. and Rathie, A. K., A new class of double integrals involving generalized hypergeometric functions, Adv. Stud. Contemp. Math., 27(2), pp. 189-198, (2017).
|
5 |
Lavoie, J. L. and Grondin, F. and Rathie, A. K., Generalizations of Watsons theorem on the sum of a , Indian J. Math, 34 (2), pp. 23-32, (1992).
|
6 |
Lavoie, J. L. and Grondin, F. and Rathie, A. K., Generalizations of Whipple's theorem on the sum of a , Journal of Computational and Applied Mathematics, Elsevier, 72(2), pp. 293-300, (1996).
DOI
|
7 |
Lavoie, J. L. and Grondin, F. and Rathie, A. K. and Arora, K., Generalizations of Dixon's theorem on the sum of a , mathematics of computation, JSTOR, pp.267-276, (1994).
|
8 |
MacRobert, TM, Beta-function formulae and integrals involving E-functions, Mathematische Annalen, Springer, 142(5), pp. 450-452, (1961).
DOI
|
9 |
Rainville, Earl David, Special functions, Macmillan, New York, (1960).
|