1. Some generalized fractional integral inequalities with nonsingular function as a kernel
- Author
-
Shahid Mubeen, Iqra Nayab, Dumitru Baleanu, Rana Safdar Ali, Kottakkaran Sooppy Nisar, and Gauhar Rahman
- Subjects
convexity ,General Mathematics ,lcsh:Mathematics ,Function (mathematics) ,Type (model theory) ,lcsh:QA1-939 ,Convexity ,law.invention ,inequalities and integral operators ,symbols.namesake ,Invertible matrix ,Operator (computer programming) ,law ,Hadamard transform ,Kernel (statistics) ,symbols ,Applied mathematics ,generalized multi-index bessel function ,fractional derivatives and integrals ,Bessel function ,Mathematics - Abstract
Integral inequalities play a key role in applied and theoretical mathematics. The purpose of inequalities is to develop mathematical techniques in analysis. The goal of this paper is to develop a fractional integral operator having a non-singular function (generalized multi-index Bessel function) as a kernel and then to obtain some significant inequalities like Hermit Hadamard Mercer inequality, exponentially $ (s-m) $-preinvex inequalities, Polya-Szego and Chebyshev type integral inequalities with the newly developed fractional operator. These results describe in general behave and provide the extension of fractional operator theory (FOT) in inequalities.
- Published
- 2021