Fractional α-Bernstein-Kantorovich operators of order β: A new construction and approximation results

Abstract

In the current article, we establish a distinct version of the operators defined by Berwal et al., which is the Kantorovich type modification of α-Bernstein operators to approximate Lebesgue's integrable functions. We define its modification that can preserve the linear function and analyze its characteristics. Additionally, we construct the bivariate of blending type operators by Berwal et al.. We analyze both its the convergence and error of approximation properties by using the conventional tools of approximation theory. Finally, we demonstrate our results by presenting examples that highlight graphical visuals using MATLAB.