Rate of convergence of beta operators of second kind for functions with derivatives of bounded variation | Zendy

Vijay Gupta | Zendy; Ulrich Abel | Zendy; Mircea Ivan | Zendy

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Rate of convergence of beta operators of second kind for functions with derivatives of bounded variation

Author(s) -

Vijay Gupta,

Ulrich Abel,

Mircea Ivan

Publication year - 2005

Publication title -

international journal of mathematics and mathematical sciences

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.21

H-Index - 39

eISSN - 1687-0425

pISSN - 0161-1712

DOI - 10.1155/ijmms.2005.3827

Subject(s) - mathematics , bounded variation , bounded function , rate of convergence , beta (programming language) , convergence (economics) , variation (astronomy) , function (biology) , derivative (finance) , absolute continuity , mathematical analysis , pure mathematics , channel (broadcasting) , physics , evolutionary biology , computer science , astrophysics , financial economics , economics , biology , programming language , economic growth , electrical engineering , engineering

We study the approximation properties of beta operators of secondkind. We obtain the rate of convergence of these operators forabsolutely continuous functions having a derivative equivalent toa function of bounded variation

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