Trigonometric Commutative Conformable Fractional Korovkin Approximation for Stochastic Processes


Here we research from the trigonometric point of view expectation commutative stochastic positive linear operators acting on L1-continuous stochastic processes which are Conformable fractional differentiable. Under some mild, general and natural assumptions on the stochastic processes we produce related trigonometric Conformable fractional stochastic Shisha-Mond type inequalities pointwise and uniform.

Publication Title

Studies in Systems, Decision and Control