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RESEARCH PRODUCT

Jakimovski–Leviatan operators of Kantorovich type involving multiple Appell polynomials

Purshottam Narain AgrawalPooja GuptaAna Maria Acu

subject

010101 applied mathematicsPure mathematicsGeneral Mathematics010102 general mathematics0101 mathematicsType (model theory)01 natural sciencesMathematics

description

Abstract The purpose of the present paper is to obtain the degree of approximation in terms of a Lipschitz type maximal function for the Kantorovich type modification of Jakimovski–Leviatan operators based on multiple Appell polynomials. Also, we study the rate of approximation of these operators in a weighted space of polynomial growth and for functions having a derivative of bounded variation. A Voronvskaja type theorem is obtained. Further, we illustrate the convergence of these operators for certain functions through tables and figures using the Maple algorithm and, by a numerical example, we show that our Kantorovich type operator involving multiple Appell polynomials yields a better rate of convergence than the Durrmeyer type Jakimovski Leviatan operators based on Appell polynomials introduced by Karaisa (2016).

yearjournalcountryeditionlanguage
2019-03-08Georgian Mathematical Journal
https://doi.org/10.1515/gmj-2019-2013