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Scientific Part
Mathematics
On the approximation of bounded functions by trigonometric polynomials in Hausdorff metric
E. H. Sadekova National Research Nuclear University MEPhI, 31 Kashirskoye Shosse, 115409 Moscow, Russia
Abstract:
The article discusses a method for constructing a spline function to obtain estimates that are exact in order to approximate bounded functions by trigonometric polynomials in the Hausdorff metric. The introduction provides a brief history of approximation of continuous and bounded functions in the uniform metric and the Hausdorff metric. Section 1 contains the main definitions, necessary facts, and formulates the main result. An estimate for the indicated approximations is obtained from Jackson's inequality for uniform approximations. In section 2 auxiliary statements are proved. So, for an arbitrary $2\pi$-periodic bounded function, a spline function is constructed. Then, estimates are obtained for the best approximation, variation, and modulus of continuity of a given spline function. Section 3 contains evidence of the main results and final comments.
Key words:
spline function, approximation by trigonometric polynomials, Hausdorff metric.
Received: 01.04.2022 Accepted: 16.11.2022
Citation:
E. H. Sadekova, “On the approximation of bounded functions by trigonometric polynomials in Hausdorff metric”, Izv. Saratov Univ. Math. Mech. Inform., 23:2 (2023), 169–182
Linking options:
https://www.mathnet.ru/eng/isu976 https://www.mathnet.ru/eng/isu/v23/i2/p169
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