Bilinear and Bilateral Generating Functions for the Gauss’ Hypergeometric Polynomials
The object of the present paper is to investigate several
general families of bilinear and bilateral generating functions with
different argument for the Gauss’ hypergeometric polynomials.
[1] B.L. Sharma, Integrals involving hypergeometric functions of two variables,
Proc. Nat. Acad. Sci. India. Sec., A-36, 713-718, 1966.
[2] D.T. Haimo, Expansion in terms of generalized heat polynomials and
their Appell transform, J. Math. Mech., 15 , 735-758, 1966 .
[3] E.D. Rainville, Special Functions, MacMillan, New York 1960.
[4] H.M. Srivastava and H.L. Manocha, A Treatise on generating functions,
Halsted press (Ellis Horwood Limited, Chichester), John Wiley and sons,
New York, Chichester Brisbane, Toronto, 1984.
[5] I.K. Khanna and V. Srinivasa Bhagavan, Lie Group-Theoretic origins of
certain generating functions of the generalized hypergeometric polynomials,
Integeral transform and Special function, Vol-11, No.2, 177-188,
2001.
[6] M. Singh, M.A. Khan, A.H. Khan and S. Sharma, Some generating
functions for the Gauss’ hypergeometric polynomials, Research Today:
Mathematical and Computer Sciences,Vol.1, 3-13, 2013.
[7] P. Appell and J. Kamp´e de F´eriet, Fonctions hyp´ergeom´etriques et
hyperspheriques, Polynˆomes d’ Hermite Gauthier-Villars, Paris, 1926.
[8] S. Saran, Hypergeometric functions of three variables, Ganita, India,
Vol.1, No.5, 83-90, 1954.
[9] S.D. Bajpai and M.S. Arora, Some -orthogonality of a class of the Gauss’
hypergeometric polynomials, Anna. Math. Blasic Pascal, Vol-1, No.1,
75-83 (1994).
[1] B.L. Sharma, Integrals involving hypergeometric functions of two variables,
Proc. Nat. Acad. Sci. India. Sec., A-36, 713-718, 1966.
[2] D.T. Haimo, Expansion in terms of generalized heat polynomials and
their Appell transform, J. Math. Mech., 15 , 735-758, 1966 .
[3] E.D. Rainville, Special Functions, MacMillan, New York 1960.
[4] H.M. Srivastava and H.L. Manocha, A Treatise on generating functions,
Halsted press (Ellis Horwood Limited, Chichester), John Wiley and sons,
New York, Chichester Brisbane, Toronto, 1984.
[5] I.K. Khanna and V. Srinivasa Bhagavan, Lie Group-Theoretic origins of
certain generating functions of the generalized hypergeometric polynomials,
Integeral transform and Special function, Vol-11, No.2, 177-188,
2001.
[6] M. Singh, M.A. Khan, A.H. Khan and S. Sharma, Some generating
functions for the Gauss’ hypergeometric polynomials, Research Today:
Mathematical and Computer Sciences,Vol.1, 3-13, 2013.
[7] P. Appell and J. Kamp´e de F´eriet, Fonctions hyp´ergeom´etriques et
hyperspheriques, Polynˆomes d’ Hermite Gauthier-Villars, Paris, 1926.
[8] S. Saran, Hypergeometric functions of three variables, Ganita, India,
Vol.1, No.5, 83-90, 1954.
[9] S.D. Bajpai and M.S. Arora, Some -orthogonality of a class of the Gauss’
hypergeometric polynomials, Anna. Math. Blasic Pascal, Vol-1, No.1,
75-83 (1994).
@article{"International Journal of Engineering, Mathematical and Physical Sciences:69325", author = "Manoj Singh and Mumtaz Ahmad Khan and Abdul Hakim Khan", title = "Bilinear and Bilateral Generating Functions for the Gauss’ Hypergeometric Polynomials", abstract = "The object of the present paper is to investigate several
general families of bilinear and bilateral generating functions with
different argument for the Gauss’ hypergeometric polynomials.
", keywords = "Appell’s functions, Gauss hypergeometric functions,
Heat polynomials, Kampe’ de Fe’riet function, Laguerre polynomials,
Lauricella’s function, Saran’s functions.", volume = "8", number = "10", pages = "1385-5", }
