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Elementary Functional Analysis by Georgi E. Shilov ISBN: 0486689239 Dover Publications Price: $16.95 click here to see this 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. Table of Contents for Elementary Functional Analysis Preface 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

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