目錄
Preface to Third Edition
Preface to Second Edition
Preface to First Edition
Chapter I The Classical Theory
1.1 Riemann Integration
1.2 Riemann-Stieltjes Integration
Chapter II Lebesgue Measure
2.0 The Idea
2.1 Existence
2.2 Euclidean Invariance
Chapter III Lebesgue Integration
3.1 Measure Spaces
3.2 Construction of Integrals
3.3 Convergence of Integrals
3.4 Lebesgue's Differentiation Theorem
Chapter IV Products of Measures
4.1 Fubini's Theorem
4.2 Steiner Symmetrization and the Isodiametric Inequality
Chapter V Changes of Variable
5.0 Introduction
5.1 Lebesgue vs. Riemann Integrals
5.2 Polar Coordinates
5.3 Jacobi's Transformation and Surface Measure
5.4 The Divergence Theorem
Chapter VI Some Basic Inequalities
6.1 Jensen, Minkowski, and Holder
6.2 The Lebesgue Spaces
6.3 Convolution and Approximate Identities
Chapter VII Elements of Fourier Analysis
7.1 Hiobert Space
7.2 Fourier Series
7.3 The Fourier Transform, L1-theory
7.4 Hermite Functions
7.5 The Fourier Transform, L2-theory
Chapter VIII A Little Abstract Theory
8.1 An Existence Theorem
8.2 The Radon-Nikodym Theorem
Solution Manual
Notation
Index
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