New estimates of integral inequalities via generalized proportional fractional integral operator with respect to another function

Abstract

In this paper, the newly proposed concept of the generalized proportional fractional integral operator with respect to another function Φ has been utilized to generate integral inequalities using convex function. This new concept will have the option to reduce self-similitudes in the fractional attractors under investigation. We discuss the implications and other consequences of the integral inequalities concerning the generalized proportional fractional integral operator with respect to another function Φ are derived here and these outcomes permit us specifically to generalize some classical inequalities. Certain intriguing subsequent consequences of the fundamental hypotheses are also figured. It is to be supposed that this investigation will provide new directions in the quantum theory of capricious nature. © The Author(s)