Extended Horn’s hypergeometric function $H_{11}$
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Extended Horn’s hypergeometric function $H_{11}$
M. S. Metwally1, S. Abo-Hasha2 and Karima Hamza3
BPAS-E-Math and Stat. Vol.42E(1) June 2023
DOI: 10.48165/bpas.2023.42E.1.6
Page: 43-56
Categories: 42E(1), JAN-JUN 2023, BPAS-Mathmatics & Statics
Description
Description
Extended Horn’s hypergeometric function $H_{11}$
- S. Metwally1, S. Abo-Hasha2 and Karima Hamza3
- Department of Mathematics, Faculty of Science (Suez), Suez University, Egypt.
2,3. Department of Mathematics, Faculty of Science, South Valley University, Qena, Egypt.
- E-mail: met641958@yahoo.com , 2. E-mail: dr.shadyhasha@gmail.com
- E-mail: karimahamza767@gmail.com
Communicated, edited and typeset in Latex by Lalit Mohan Upadhyaya (Editor-in-Chief).
Received October 26, 2022 / Revised April 19, 2023 / Accepted May 04, 2023. Online First Published
on June 30, 2023 at https://www.bpasjournals.com/.
Corresponding author Karima Hamza, E-mail: karimahamza767@gmail.com
Abstract
In this paper we introduce an extension of the Horn’s hypergeometric function $H_{11}$. Furthermore, we investigate the limit formulas, integral representations, differentiation formulas, infinite sums, recursion formulas, Laplace, Mellin and fractional Fourier transforms for the extended Horn’s hypergeometric function $H_{11}$. Finally, we discuss double Laplace and double Mellin transforms of this function.
Key words Horn’s hypergeometric function $H_{11}$, the generalization of the Pochhammer symbol, limit formulas, recursion formulas, Laplace transform, Mellin transform, Fourier transform, Upadhyaya transform.
2020 Mathematics Subject Classification 33C20, 33C45, 33C65, 33C70.