Fractional Calculus Results for Mathieu Series and Generalized Lommel Wright Function


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Authors

  • Sangeeta Choudhary Department of Mathematics, Swami Keshvanand Institute of Technology, Management & Gramothan, Jaipur, India
  • Pramila Kumawat Department of Mathematics, Swami Keshvanand Institute of Technology, Management & Gramothan, Jaipur, India

Keywords:

Generalized fractional integral operators, fractional derivative operators, generalized Mathieu series, generalized Lommel-Wright function, Fox-Wright function

Abstract

The purpose of this paper is to apply generalized fractional integral and differential operators given by Marichev-Saigo-Maeda to the product of a generalized Mathieu series and a generalized Lommel-Wright function. The results are expressed in terms of generalized Wright function. A number of known results and some new results can be easily found as special cases of our main results.

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Published

09-08-2023

How to Cite

Sangeeta Choudhary, & Pramila Kumawat. (2023). Fractional Calculus Results for Mathieu Series and Generalized Lommel Wright Function. International Journal of Mathematics And Its Applications, 11(3), 59–69. Retrieved from https://ijmaa.in/index.php/ijmaa/article/view/1193

Issue

Vol. 11 No. 3 (2023)

Section

Research Article

License

Copyright (c) 2023 International Journal of Mathematics And its Applications

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