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Zbl 1048.41013
de la Cal, Jesús; Cárcamo, Javier
On uniform approximation by some classical Bernstein-type operators. (English)
[J] J. Math. Anal. Appl. 279, No. 2, 625-638 (2003). ISSN 0022-247X

Summary: We investigate the functions for which certain classical families of operators of probabilistic type over noncompact intervals provide uniform approximation on the whole interval. The discussed examples include the Szász operators, the Szász-Durrmeyer operators, the gamma operators, the Baskakov operators, and the Meyer-König and Zeller operators. We show that some results of Totik remain valid for unbounded functions, at the same time that we give simple rates of convergence in terms of the usual modulus of continuity. We also show by a counterexample that the result for Meyer-König and Zeller operators does not extend to Cheney and Sharma operators.

MSC 2000:: *41A35 Approximation by operators

Keywords: Bernstein-type operators; Szász operators; Szász--Durrmeyer; operators; Gamma operators; Baskakov operators; Meyer--König and Zeller operators; Cheney and Sharma operators; Uniform convergence; Rate of convergence; Modulus of continuity; Poisson distribution; Gamma distribution; Negative binomial distribution; Poisson processes; Gamma processes

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