"Vector Fractional Trigonometric Korovkin Approximation" by George A. Anastassiou

Progress in Fractional Differentiation & Applications

Article Title

Vector Fractional Trigonometric Korovkin Approximation

Authors

George A. Anastassiou, Department of Mathematical Sciences, University of Memphis, Memphis, TN 38152, U.S.A.Follow

Author Country (or Countries)

U.S.A.

Abstract

In this manuscript we study quantitatively with rates the trigonometric fractional convergence of sequences of linear operators applied on Banach space valued functions. We derive pointwise and uniform estimates. To establish our main results we apply an elegant boundedness property of our linear operators by their companion positive linear operators. Our inequalities are trigonometric fractional involving the right and left vector Caputo type fractional derivatives, built in vector moduli of continuity. We consider very general classes of Banach space valued functions. Finally we present applications to vector Bernstein operators.

Suggested Reviewers

N/A

Digital Object Identifier (DOI)

http://dx.doi.org/10.18576/pfda/030401

Recommended Citation

A. Anastassiou, George (2017) "Vector Fractional Trigonometric Korovkin Approximation," Progress in Fractional Differentiation & Applications: Vol. 3: Iss. 4, Article 1.
DOI: http://dx.doi.org/10.18576/pfda/030401
Available at: https://digitalcommons.aaru.edu.jo/pfda/vol3/iss4/1

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