Higher Order Generalization of Positive Linear Operators Defined by a Class of Borel Measures

Authors

OKTAY DUMAN

Abstract

In the present paper, we introduce a sequence of linear operators, which is a higher order generalization of positive linear operators defined by a class of Borel measures studied in [2]. Then, using the concept of A-statistical convergence we obtain some approximation results which are stronger than the aspects of the classical approximation theory.

DOI

-

Keywords

Statistical convergence, A-statistical convergence, positive linear operators, regular matrices, the elements of the Lipschitz class, Korovkin-type approximation theorem

First Page

333

Last Page

339

Recommended Citation

DUMAN, O (2007). Higher Order Generalization of Positive Linear Operators Defined by a Class of Borel Measures. Turkish Journal of Mathematics 31 (3): 333-339. https://doi.org/-