Summation theorems for \({_{p+1}}F_{q}[a\pm m, (\alpha_p); (\beta_q); z]\) via Mellin-Barnes type contour integral and its applications
zbMath1364.33012MaRDI QIDQ527351
M. S. Baboo, Mohammad Idris Qureshi
Publication date: 11 May 2017
Published in: Asia Pacific Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: http://apjm.apacific.org/PDFs/4-1-75-89.pdf
generalized hypergeometric functionMeijer's G-functionLegendre duplication formulageneralized Kummer's first, second and third summation theoremsMellin-Barnes type contour integral
Gamma, beta and polygamma functions (33B15) Generalized hypergeometric series, ({}_pF_q) (33C20) Hypergeometric integrals and functions defined by them ((E), (G), (H) and (I) functions) (33C60) Classical hypergeometric functions, ({}_2F_1) (33C05)
Cites Work
- Some unified and generalized Kummer's first summation theorems with applications in Laplace transform technique
- Generalized hypergeometric functions with applications in statistics and physical sciences
- Kummer's theorem and its contiguous identities
- The special functions and their approximations. Vol. I, II
- Generalizations of classical summation theorems for the series2F1and3F2with applications
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