Some New Fractional Hadamard and Pachpatte-Type Inequalities with Applications via Generalized Preinvexity

The term convexity associated with the theory of inequality in sense fractional analysis has a broad range different and remarkable applications domain applied sciences. prime objective this article is to investigate some new variants Hermite–Hadamard Pachpatte-type integral inequalities involving idea preinvex function frame operator, namely Caputo–Fabrizio operator. By employing our approach, identity that correlates functions for first-order differentiable mappings presented. Moreover, we derive refinements Hermite–Hadamard-type mappings, whose derivatives are generalized sense. From an application viewpoint, represent usability concerning results, presented several by using special means real numbers. Integral association calculus have strong relationship symmetry. Our investigation provides better image convex calculus.