Approximation of Continuous Periodic Functions of Two Variables via Power Series Methods of Summability

dc.contributor.author	Yavuz E.
dc.contributor.author	Talo Ö.
dc.date.accessioned	2024-07-22T08:08:29Z
dc.date.available	2024-07-22T08:08:29Z
dc.date.issued	2019
dc.description.abstract	We prove a Korovkin-type approximation theorem via power series methods of summability for continuous 2 π-periodic functions of two variables and verify the convergence of approximating double sequences of positive linear operators by using modulus of continuity. An example concerning double Fourier series is also constructed to illustrate the obtained results. © 2017, Malaysian Mathematical Sciences Society and Penerbit Universiti Sains Malaysia.
dc.identifier.DOI-ID	10.1007/s40840-017-0577-6
dc.identifier.issn	01266705
dc.identifier.uri	http://akademikarsiv.cbu.edu.tr:4000/handle/123456789/14405
dc.language.iso	English
dc.publisher	Springer
dc.rights	All Open Access; Green Open Access
dc.title	Approximation of Continuous Periodic Functions of Two Variables via Power Series Methods of Summability
dc.type	Article

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