[KSCI] Korea Science Citation Index Service

http://dx.doi.org/10.5831/HMJ.2016.38.2.325

A NOTE ON GENERALIZED EXTENDED WHITTAKER FUNCTION

Khan, Nabiullah (Department of Applied Mathematics, Faculty of Engineering and Technology, Aligarh Muslim University)
Ghayasuddin, Mohd (Department of Applied Mathematics, Faculty of Engineering and Technology, Aligarh Muslim University)

Publication Information

Honam Mathematical Journal / v.38, no.2, 2016 , pp. 325-335 More about this Journal

Abstract

In the present paper, we define the generalized extended Whittaker function in terms of generalized extended conflent hypergeometric function of the first kind. We also study its integral representation, some integral transforms and its derivative.

Keywords

Beta function; Extended beta function; Confluent hypergeometric function; Extended confluent hypergeometric function; Gauss hypergeometric function; Extended Gauss hypergeometric function;

Citations & Related Records

Times Cited By KSCI : 2 (Citation Analysis)

Reference
Cited By KSCI

1	A. Erdelyi, W. Magnus, F. Oberhettinger and F.G. Tricomi; Tables of integral transforms, vol. I, McGraw-Hill, New York, 1954.
2	D. M. Lee, A. K. Rathie, R. K. Parmar, and Y. S. Kim, Generalization of Extended Beta Function, Hypergeometric and Confluent Hypergeometric Functions, Honam Mathematical Journal 33, no. 2 (2011), 187-206. DOI
3	D. K. Nagar, R. A. M. Vasquez, and A. K. Gupta, Properties of the Extended Whittaker Function, Progress in Applied Mathematics, vol. 6, no. 2 (2013), 70-80.
4	E. D. Rainville; Special functions, The Macmillan Company, New York, 1960.
5	E. T. Whittaker, An expression of certain known functions as generalized hypergeometric functions, Bull. Amer. Math. Soc, 10, no. 3 (1903), 125-134. DOI
6	E. T. Whittaker and G. N. Watson, A course of modern analysis, Reprint of the 4th ed. Cambridge Mathematical Library, Cambridge., Cambridge University Press 1990.
7	H. M. Srivastava and H. L. Manocha, A tretise on generating functions, Halsted Press (Ellis Horwood Limited, Chichester), John Wiley and Sons, New York 1984.
8	H. Liu and W. Wang, Some generating relations for extended Appell's and Lauricella's hypergeometric functions, Rocky Mountain Journal of Mathematics. In press.
9	M. A. Chaudhry, A. Qadir, M. Rafique, and S. M. Zubair, Extension of Euler's beta function, J. Comput. Appl. Math. 78, no. 1 (1997), 19-32. DOI
10	M. A. Chaudhry, A. Qadir, H. M. Srivastava, and R. B. Paris, Extended hypergeometric and confluent hypergeometric functions, Appl. Math. Comput. 159, no. 2 (2004), 589-602. DOI
11	N. U. Khan and M. Ghayasuddin, Generalization of extended Appell's and Lauricella's hypergeometric functions, Honam Mathematical Journal 37, no. 1 (2015), 113-126. DOI
12	R. K. Parmar, A New Generalization of Gamma, Beta, Hypergeometric and Confluent Hypergeometric Functions, LE MATEMATICHE, vol. LXVIII(2013), 33-52.
13	Y. L. Luke, The special functions and their approximations, vol. 1, New York, Academic Press 1969.