On New Modifications Governed by Quantum Hahn's Integral Operator Pertaining to Fractional Calculus

In the article, we present several generalizations for the generalized Cebysev type inequality in the frame of quantum fractional Hahn's integral operator by using the quantum shift operator (sigma)psi(q)(zeta) = q zeta + (1 - q)sigma(zeta is an element of [l(1),l(2)], sigma = l(1) + omega/(1-q), 0 < q < 1, omega >= 0). As applications, we provide some associated variants to illustrate the efficiency of quantum Hahn's integral operator and compare our obtained results and proposed technique with the previously known results and existing technique. Our ideas and approaches may lead to new directions in fractional quantum calculus theory.