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＜電子ブック＞
Geometric Approximation Theory / by Alexey R. Alimov, Igor’ G. Tsar’kov
(Springer Monographs in Mathematics. ISSN:21969922)

版	1st ed. 2021.
出版者	(Cham : Springer International Publishing : Imprint: Springer)
出版年	2021
本文言語	英語
大きさ	XXI, 508 p. 21 illus : online resource
著者標目	*Alimov, Alexey R author Tsar’kov, Igor’ G author SpringerLink (Online service)
件　名	LCSH:Approximation theory FREE:Approximations and Expansions
一般注記	Main notation, definitions, auxillary results, and examples -- Chebyshev alternation theorem, Haar and Mairhuber's theorems -- Best approximation in Euclidean spaces -- Existence and compactness -- Characterization of best approximation -- Convexity of Chebyshev sets and sums -- Connectedness and stability -- Existence of Chebyshev subspaces -- Efimov–Stechkin spaces. Uniform convexity and uniform smoothness. Uniqueness and strong uniqueness of best approximation in uniformly convex spaces -- Solarity of Chebyshev sets -- Rational approximation -- Haar cones and varisolvencity -- Approximation of vector-valued functions -- The Jung constant -- Chebyshev centre of a set -- Width. Approximation by a family of sets -- Approximative properties of arbitrary sets -- Chebyshev systems of functions in the spaces C, Cn, and Lp -- Radon, Helly, and Carathéodory theorems. Decomposition theorem -- Some open problems -- Index This monograph provides a comprehensive introduction to the classical geometric approximation theory, emphasizing important themes related to the theory including uniqueness, stability, and existence of elements of best approximation. It presents a number of fundamental results for both these and related problems, many of which appear for the first time in monograph form. The text also discusses the interrelations between main objects of geometric approximation theory, formulating a number of auxiliary problems for demonstration. Central ideas include the problems of existence and uniqueness of elements of best approximations as well as properties of sets including subspaces of polynomials and splines, classes of rational functions, and abstract subsets of normed linear spaces. The book begins with a brief introduction to geometric approximation theory, progressing through fundamental classical ideas and results as a basis for various approximation sets, suns, and Chebyshev systems. Itconcludes with a review of approximation by abstract sets and related problems, presenting novel results throughout the section. This text is suitable for both theoretical and applied viewpoints and especially researchers interested in advanced aspects of the field. HTTP:URL=https://doi.org/10.1007/978-3-030-90951-2

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