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Research Article | Open Access

Extended incomplete Riemann-Liouville fractional integral operators and related special functions

Mehmet Ali Özarslan1( )Ceren Ustaoğlu2
Department of Mathematics, Faculty of Arts and Sciences, Eastern Mediterranean University, Famagusta, Northern Cyprus, via Mersin 10, Turkey
Department of Computer Engineering, Final International University, Kyrenia, Northern Cyprus, via Mersin 10, Turkey
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Abstract

In this study, we introduce the extended incomplete versions of the Riemann-Liouville (R-L) fractional integral operators and investigate their analytical properties rigorously. More precisely, we investigate their transformation properties in L1 and L spaces, and we observe that the extended incomplete fractional calculus operators can be used in the analysis of a wider class of functions than the extended fractional calculus operator. Moreover, by considering the concept of analytical continuation, definitions for extended incomplete R-L fractional derivatives are given and therefore the full fractional calculus model has been completed for each complex order. Then the extended incomplete τ-Gauss, confluent and Appell's hypergeometric functions are introduced by means of the extended incomplete beta functions and some of their properties such as integral representations and their relations with the extended R-L fractional calculus has been given. As a particular advantage of the new fractional integral operators, some generating relations of linear and bilinear type for extended incomplete τ-hypergeometric functions have been derived.

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Electronic Research Archive
Pages 1723-1747

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Cite this article:
Özarslan MA, Ustaoğlu C. Extended incomplete Riemann-Liouville fractional integral operators and related special functions. Electronic Research Archive, 2022, 30(5): 1723-1747. https://doi.org/10.3934/era.2022087

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Received: 01 December 2021
Revised: 02 March 2022
Accepted: 06 March 2022
Published: 15 May 2022
©2022 the Author(s), licensee AIMS Press.

This is an open access article distributed under the terms of the Creative Commons Attribution License (http://creativecommons.org/licenses/by/4.0)