A Generalization of M-Series and Integral Operator Associated with Fractional Calculus

Authors

  • Ahmad Faraj
  • Tariq Salim
  • Safaa Sadek
  • Jamal Ismail

Keywords:

GeneralizedM-Series, H-function, Integral transforms, Fractional Integral and Differential Operators

Abstract

WIll be available soon

References

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Mathai, A , and Sexena, R ., The H-function with applications in statistics and other disciplines. John Wiley and Sons, New York (1978).

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Sexena, R ., A remark on a paper on M-series. Fract. Calc. Appl. Anal.12, No.1, 109-110 (2009).

Sharma, M., Fractional integration and fractional differentiation of the M-series. Fract. Calc. appl. Anal. 11, No.2, 187-192 (2008).

Sharma, M and Jain, R., A note on a generalized M-series as a special function of fractional calculus. Fract. Calc. appl. Anal. 12, No.4, 449-452 (2009).

Shukla, A , and Prajapati, J ., On a generalization of Mittag – Leffler function and its properties. J. Math. Appl. Anal. 336, 797-811 (2007).

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Srivastava, H , and Manocha , H ., A treatise on generating functions. John Willy and Sons,New York , (1984).

Srivistave, H , and Tomovski, Z., Fractional calculus with an integral operator containing a generalized Mittag – Leffler function in the Kernel . Appl. Math. Comput., 211, 198-210 (2009).

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Published

2014-10-31

How to Cite

Faraj, A., Salim, T., Sadek, S., & Ismail, J. (2014). A Generalization of M-Series and Integral Operator Associated with Fractional Calculus. Asian Journal of Fuzzy and Applied Mathematics, 2(5). Retrieved from https://www.ajouronline.com/index.php/AJFAM/article/view/1745

Issue

Vol. 2 No. 5 (2014): October 2014

Section

Articles

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