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On Bounds of fractional integral operators containing Mittag-Leffler functions for generalized exponentially convex functionsopen access
- Issue Date
- Apr-2021
- Publisher
- AMER INST MATHEMATICAL SCIENCES-AIMS
- Keywords
- convex function; exponentially (alpha, h - m)-convex function; Mittag-Leffler function; generalized fractional integral operators
- Citation
- AIMS MATHEMATICS, v.6, no.6, pp 6454 - 6468
- Pages
- 15
- Indexed
- SCIE
SCOPUS
- Journal Title
- AIMS MATHEMATICS
- Volume
- 6
- Number
- 6
- Start Page
- 6454
- End Page
- 6468
- ISSN
- 2473-6988
2473-6988
- Abstract
- Recently, a generalization of convex function called exponentially (alpha, h - m)-convex function has been introduced. This generalization of convexity is used to obtain upper bounds of fractional integral operators involving Mittag-Leffler (ML) functions. Moreover, the upper bounds of left and right integrals lead to their boundedness and continuity. A modulus inequality is established for differentiable functions. The Hadamard type inequality is proved which shows upper and lower bounds of sum of left and right sided fractional integral operators.
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