Refined bounds of the quantum quadratures within the class of distance-disturbed convex functions in two dimensions


Gabriela Cristescu, Muhammad Uzair Awan, Mihail Găianu




In this paper, we introduce the class of disturbed convex functions defined by means of distance perturbations in two dimensions on coordinates. Some quantum trapezoidal estimations are obtained for functions having two dimensional distance-disturbed convexity properties. Refined bounds of the quantum integrals of distance-disturbed convex functions on coordinates are deduced by using the rectangular finite elements technique. These approximations are as best as possible from the sharpness point of view. The sharpness of few results from the literature follows as consequence of the new results in this paper