More on Comonotone Polynomial Approximation |
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| Authors: | D. Leviatan I. A. Shevchuk |
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| Affiliation: | (1) School of Mathematics Raymond and Beverley Sackler Faculty of Exact Sciences Tel Aviv University 69978 Tel Aviv Israel, IL;(2) Institute of Mathematics National Academy of Sciences of Ukraine 3, Tereshchenkivska str. 252601 Kyiv Ukraine, UA |
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| Abstract: | The main achievement of this paper is that we show, what was to us, a surprising conclusion, namely, twice continuously differentiable functions in (0,1) (with some regular behavior at the endpoints) which change monotonicity at least once in the interval, are approximable better by comonotone polynomials, than are such functions that are merely monotone. We obtain Jackson-type estimates for the comonotone polynomial approximation of such functions that are impossible to achieve for monotone approximation. July 7, 1998. Date revised: May 5, 1999. Date accepted: July 23, 1999. |
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| Keywords: | . Comonotone approximation by polynomials Degree of approximation. AMS Classification. 41A10 41A25 41A29. |
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