On the Optimality of the Trigonometric System
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Abstract
We study a new phenomenon of the behaviour of widths with respect to the optimality of trigonometric system. It is shown that the trigonometric system is optimal in the sense of Kolmogorov widths in the case of "super-high" and "super-small" smoothness but is not optimal in the intermediate cases. Bernstein's widths behave differently when compared with Kolmogorov in the case of "super-small" smoothness. However, in the case of "super-high" smoothness Kolmogorov and Bernstein widths behave similarly, i.e. are realized by trigonometric polynomials. (C) 2019 Elsevier Inc. All rights reserved.
Description
Keywords
Optimal Subspaces, N-Widths, Trigonometric System, Trigonometric approximation, Approximation by arbitrary nonlinear expressions; widths and entropy, \(n\)-widths, Rate of convergence, degree of approximation, optimal subspaces, trigonometric system
Fields of Science
0101 mathematics, 01 natural sciences
Citation
Jarad, F.; Kushpel, A.; Tas, K., "On the optimality of the trigonometric system", Journal of Complexity, Vol. 56, (2020).
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OpenCitations Citation Count
5
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Volume
56
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101429
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CrossRef : 5
Scopus : 4
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3
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