Finite Dimensional Chebyshev Subspaces of Banach Spaces: Extreme Points Metric Projection Chebyshev Subspaces (Uniquenes, Characterization & Existence) - Couverture souple
Synopsis
A Chebyshev set is a subset of a normed linear space that admits unique best approximations. In 1853, the Russian mathematician Chebyshev asked the question: "can we represent any continuous function defined on [a,b] by a polynomial, of degree at most n, in such a way that the maximum error at any point in [a,b] is controlled?" Since then, the mathematicians have searched : why such a polynomial should exist? If it does, can we hope to construct it? If it exists, is it also unique? What happens if we change the measure of error? The aim of this book is to study finite dimensional Chebyshev subspaces of all classical Banach Spaces. In addition, you can find a valuable review for extreme points which are not found in books or articles. The main topics that are included in this book: Normed linear and Banach spaces, convexity, bounded linear operators, Hilbert spaces, topological vector spaces, Hahn-Banach theorems, reflexivity, w-topology and w*-topology, extreme points and sets, best approximation and proximinal sets, Chebyshev subspaces, metric projection, uniqueness and Characterization of best approximation, existence of Chebyshev subspaces and Chebyshev Subspaces of C[a, b].
Les informations fournies dans la section « Synopsis » peuvent faire référence à une autre édition de ce titre.
À propos de l?auteur
Mohammed Al Ghafri is an Omani mathematician whose major work is on approximation theory. He received MSc from Sultan Qaboos University in 2016 & BSc from Sohar College of Applied Science in 2008. He has 9 years of teaching experience. His interest areas: functional analysis, Chebyshev subspace, number theory, etc.
Les informations fournies dans la section « A propos du livre » peuvent faire référence à une autre édition de ce titre.
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Finite Dimensional Chebyshev Subspaces of Banach Spaces
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Taschenbuch. Etat : Neu. This item is printed on demand - it takes 3-4 days longer - Neuware -A Chebyshev set is a subset of a normed linear space that admits unique best approximations. In 1853, the Russian mathematician Chebyshev asked the question: 'can we represent any continuous function defined on [a,b] by a polynomial, of degree at most n, in such a way that the maximum error at any point in [a,b] is controlled ' Since then, the mathematicians have searched : why such a polynomial should exist If it does, can we hope to construct it If it exists, is it also unique What happens if we change the measure of error The aim of this book is to study finite dimensional Chebyshev subspaces of all classical Banach Spaces. In addition, you can find a valuable review for extreme points which are not found in books or articles. The main topics that are included in this book: Normed linear and Banach spaces, convexity, bounded linear operators, Hilbert spaces, topological vector spaces, Hahn-Banach theorems, reflexivity, w-topology and w -topology, extreme points and sets, best approximation and proximinal sets, Chebyshev subspaces, metric projection, uniqueness and Characterization of best approximation, existence of Chebyshev subspaces and Chebyshev Subspaces of C[a, b]. 168 pp. Englisch. N° de réf. du vendeur 9783659843327
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Finite Dimensional Chebyshev Subspaces of Banach Spaces
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Scholars\' Press, 2016
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ISBN 13 : 9783659843327
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Couverture souple
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Etat : New. Dieser Artikel ist ein Print on Demand Artikel und wird nach Ihrer Bestellung fuer Sie gedruckt. Autor/Autorin: Al Ghafri MohammedMohammed Al Ghafri is an Omani mathematician whose major work is on approximation theory. He received MSc from Sultan Qaboos University in 2016 & BSc from Sohar College of Applied Science in 2008. He has 9 years of . N° de réf. du vendeur 151429358
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Finite Dimensional Chebyshev Subspaces of Banach Spaces: Extreme Points Metric Projection Chebyshev Subspaces (Uniquenes, Characterization & Existence)
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Finite Dimensional Chebyshev Subspaces of Banach Spaces: Extreme Points Metric Projection Chebyshev Subspaces (Uniquenes, Characterization & Existence)
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Finite Dimensional Chebyshev Subspaces of Banach Spaces: Extreme Points Metric Projection Chebyshev Subspaces (Uniquenes, Characterization & Existence)
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Finite Dimensional Chebyshev Subspaces of Banach Spaces | Extreme Points Metric Projection Chebyshev Subspaces (Uniquenes, Characterization & Existence)
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Taschenbuch. Etat : Neu. Finite Dimensional Chebyshev Subspaces of Banach Spaces | Extreme Points Metric Projection Chebyshev Subspaces (Uniquenes, Characterization & Existence) | Mohammed Al Ghafri (u. a.) | Taschenbuch | 168 S. | Englisch | 2016 | Scholars' Press | EAN 9783659843327 | Verantwortliche Person für die EU: BoD - Books on Demand, In de Tarpen 42, 22848 Norderstedt, info[at]bod[dot]de | Anbieter: preigu. N° de réf. du vendeur 107570414
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Finite Dimensional Chebyshev Subspaces of Banach Spaces
Edité par
Scholars' Press Okt 2016, 2016
ISBN 10 : 3659843326
ISBN 13 : 9783659843327
Neuf
Taschenbuch
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Taschenbuch. Etat : Neu. This item is printed on demand - Print on Demand Titel. Neuware -A Chebyshev set is a subset of a normed linear space that admits unique best approximations. In 1853, the Russian mathematician Chebyshev asked the question: 'can we represent any continuous function defined on [a,b] by a polynomial, of degree at most n, in such a way that the maximum error at any point in [a,b] is controlled ' Since then, the mathematicians have searched : why such a polynomial should exist If it does, can we hope to construct it If it exists, is it also unique What happens if we change the measure of error The aim of this book is to study finite dimensional Chebyshev subspaces of all classical Banach Spaces. In addition, you can find a valuable review for extreme points which are not found in books or articles. The main topics that are included in this book: Normed linear and Banach spaces, convexity, bounded linear operators, Hilbert spaces, topological vector spaces, Hahn-Banach theorems, reflexivity, w-topology and w\*-topology, extreme points and sets, best approximation and proximinal sets, Chebyshev subspaces, metric projection, uniqueness and Characterization of best approximation, existence of Chebyshev subspaces and Chebyshev Subspaces of C[a, b].VDM Verlag, Dudweiler Landstraße 99, 66123 Saarbrücken 168 pp. Englisch. N° de réf. du vendeur 9783659843327
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Finite Dimensional Chebyshev Subspaces of Banach Spaces: Extreme Points Metric Projection Chebyshev Subspaces (Uniquenes, Characterization & Existence)
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Finite Dimensional Chebyshev Subspaces of Banach Spaces : Extreme Points Metric Projection Chebyshev Subspaces (Uniquenes, Characterization & Existence)
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Taschenbuch. Etat : Neu. nach der Bestellung gedruckt Neuware - Printed after ordering - A Chebyshev set is a subset of a normed linear space that admits unique best approximations. In 1853, the Russian mathematician Chebyshev asked the question: 'can we represent any continuous function defined on [a,b] by a polynomial, of degree at most n, in such a way that the maximum error at any point in [a,b] is controlled ' Since then, the mathematicians have searched : why such a polynomial should exist If it does, can we hope to construct it If it exists, is it also unique What happens if we change the measure of error The aim of this book is to study finite dimensional Chebyshev subspaces of all classical Banach Spaces. In addition, you can find a valuable review for extreme points which are not found in books or articles. The main topics that are included in this book: Normed linear and Banach spaces, convexity, bounded linear operators, Hilbert spaces, topological vector spaces, Hahn-Banach theorems, reflexivity, w-topology and w -topology, extreme points and sets, best approximation and proximinal sets, Chebyshev subspaces, metric projection, uniqueness and Characterization of best approximation, existence of Chebyshev subspaces and Chebyshev Subspaces of C[a, b]. N° de réf. du vendeur 9783659843327
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Finite Dimensional Chebyshev Subspaces of Banach Spaces: Extreme Points Metric Projection Chebyshev Subspaces (Uniquenes, Characterization & Existence)
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