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Dover Books on Mathematics Ser.: Elementary Functional Analysis by Georgi E. Shilov (1996, Trade Paperback)
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- Sofort-KaufenElementare Funktionsanalyse (Dover Bücher über Mathematik)
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Über dieses Produkt
Product Identifiers
PublisherDover Publications, Incorporated
ISBN-100486689239
ISBN-139780486689234
eBay Product ID (ePID)869934
Product Key Features
Number of Pages352 Pages
LanguageEnglish
Publication NameElementary Functional Analysis
SubjectFunctional Analysis
Publication Year1996
FeaturesRevised
TypeTextbook
Subject AreaMathematics
AuthorGeorgi E. Shilov
SeriesDover Books on Mathematics Ser.
FormatTrade Paperback
Dimensions
Item Height0.7 in
Item Weight14.4 Oz
Item Length8.5 in
Item Width5.4 in
Additional Product Features
Edition Number2
Intended AudienceCollege Audience
LCCN95-037031
Dewey Edition20
Dewey Decimal515/.7
Table Of ContentPreface 1. Basic Structures of Mathematical Analysis 1.1 Linear Spaces 1.2 Metric Spaces 1.3 Normed Linear Spaces 1.4 Hilbert Spaces 1.5 Approximation on a Compactum 1.6 Differentiation and Integration in a Normed Linear Space 1.7 Continuous Linear Operators 1.8 Normed Algebras 1.9 Spectral Properties of Linear Operators Problems 2. Differential Equations 2.1 Definitions and Examples 2.2 The Fixed Point Theorem 2.3 Existence and Uniqueness of Solutions 2.4 Systems of Equations 2.5 Higher-Order Equations 2.6 Linear Equations and systems 2.7 The Homogeneous Linear Equation 2.8 The Nonhomogeneous Linear Equation Problems 3. Space Curves 3.1 Basic Concepts 3.2 Higher Derivatives 3.3 Curvature 3.4 The Moving Basis 3.5 The Natural Equations 3.6 Helices Problems 4. Orthogonal Expansions 4.1 Orthogonal Expansions in Hilbert Space 4.2 Trigonometric Fourier Series 4.3 Convergence of Fourier Series 4.4 Computations with Fourier Series 4.5 Divergent Fourier Series and Generalized Summation 4.6 Other Orthogonal Systems Problems 5. The Fourier Transform 5.1 The Fourier Integral and Its Inversion 5.2 Further Properties of the Fourier Transform 5.3 Examples and Applications 5.4 The Laplace Transform 5.5 Quasi-Analytic Classes of Functions Problems Hints and Answers; Bibliography; Index
Edition DescriptionRevised edition
SynopsisIn this introductory work on mathematical analysis, the noted mathematician Georgi E. Shilov begins with an extensive and important chapter on the basic structures of mathematical analysis: linear spaces, metric spaces, normed linear spaces, Hilbert spaces, and normed algebras. The standard models for all these spaces are sets of functions (hence the term "functional analysis"), rather than sets of points in a finite-dimensional space. Chapter 2 is devoted to differential equations, and contains the basic theorems on existence and uniqueness of solutions of ordinary differential equations for functions taking values in a Banach space. The solution of the linear equation with constant (operator) coefficients is written in general form in terms of the exponential of the operator. This leads, in the finite-dimensional case, to explicit formulas not only for the solutions of first-order equations, but also to the solutions of higher-order equations and systems of equations. The third chapter presents a theory of curvature for curve in a multidimensional space. The final two chapters essentially comprise an introduction to Fourier analysis. In the treatment of orthogonal expansions, a key role is played by Fourier series and the various kinds of convergence and summability for such series. The material on Fourier transforms, in addition to presenting the more familiar theory, also deals with problems in the complex domain, in particular with problems involving the Laplace transform. Designed for students at the upper-undergraduate or graduate level, the text includes a set of problems for each chapter, with hints and answers at the end of the book., Introductory text covers basic structures of mathematical analysis (linear spaces, metric spaces, normed linear spaces, etc.), differential equations, orthogonal expansions, Fourier transforms -- including problems in the complex domain, especially involving the Laplace transform -- and more. Each chapter includes a set of problems, with hints and answers. Bibliography. 1974 edition., Introductory text covers basic structures of mathematical analysis (linear spaces, metric spaces, normed linear spaces, etc.), differential equations, orthogonal expansions, Fourier transforms, and more. Includes problems with hints and answers. Bibliography. 1974 edition.
LC Classification NumberQA320.S464
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