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Leonard F. Richardson, PhD, is Herbert Huey McElveen Professor and Director of Graduate Studies in Mathematics at Louisiana State University, where he is also Assistant Chair of the Department of Mathematics. Dr. Richardson's research interests include harmonic analysis, homogeneous spaces, and representation theory. He is the author of Advanced Calculus: An Introduction to Linear Analysis, also published by Wiley.
| Preface | p. xi |
| Acknowledgments | p. xiii |
| Introduction | p. xv |
| History of the Subject | p. 1 |
| History of the Idea | p. 1 |
| Deficiencies of the Riemann Integral | p. 3 |
| Motivation for the Lebesgue Integral | p. 6 |
| Fields, Borel Fields, and Measures | p. 11 |
| Fields, Monotone Classes, and Borel Fields | p. 11 |
| Additive Measures | p. 18 |
| Carathéodory Outer Measure | p. 20 |
| E. Hopf's Extension Theorem | p. 24 |
| Fields, ¿-Fields, and Measures Inherited by a Subset | p. 29 |
| Lebesgue Measure | p. 31 |
| The Finite Interval [-N, N) | p. 31 |
| Measurable Sets, Borel Sets, and the Real Line | p. 34 |
| Lebesgue Measure on R | p. 36 |
| Measure Spaces and Completions | p. 38 |
| Minimal Completion of a Measure Space | p. 41 |
| A Nonmeasurable Set | p. 41 |
| Semimetric Space of Measurable Sets | p. 43 |
| Lebesgue Measure in Rn | p. 50 |
| Jordan Measure in Rn | p. 52 |
| Measurable Functions | p. 55 |
| Measurable Functions | p. 55 |
| Baire Functions of Measurable Functions | p. 56 |
| Limits of Measurable Functions | p. 58 |
| Simple Functions and Egoroff's Theorem | p. 61 |
| Double Sequences | p. 63 |
| Convergence in Measure | p. 65 |
| Lusin's Theorem | p. 66 |
| The Integral | p. 69 |
| Special Simple Functions | p. 69 |
| Extending the Domain of the Integral | p. 72 |
| The Class L+ of Nonnegative Measurable Functions | p. 74 |
| The Class L of Lebesgue Integrable Functions | p. 78 |
| Convex Functions and Jensen's Inequality | p. 81 |
| Lebesgue Dominated Convergence Theorem | p. 83 |
| Monotone Convergence and Fatou's Theorem | p. 89 |
| Completeness of L1 (X, $$, ¿) and the Pointwise Convergence Lemma | p. 92 |
| Complex-Valued Functions | p. 100 |
| Product Measures and Fubini's Theorem | p. 103 |
| Product Measures | p. 103 |
| Fubini's Theorem | p. 108 |
| Comparison of Lebesgue and Riemann Integrals | p. 117 |
| Functions of a Real Variable | p. 123 |
| Functions of Bounded Variation | p. 123 |
| A Fundamental Theorem for the Lebesgue Integral | p. 128 |
| Lebesgue's Theorem and Vitali's Covering Theorem | p. 131 |
| Absolutely Continuous and Singular Functions | p. 139 |
| General Countably Additive Set Functions | p. 151 |
| Hahn Decomposition Theorem | p. 152 |
| Radon-Nikodym Theorem | p. 156 |
| Lebesgue Decomposition Theorem | p. 161 |
| Examples of Dual Space from Measure Theory | p. 165 |
| The Banach Space Lp (X, $$, ¿) | p. 165 |
| The Dual of a Banach Space | p. 170 |
| The Dual Space of Lp (X, $$, ¿) | p. 174 |
| Hilbert Space, Its Dual, and L2 (X, $$, ¿) | p. 178 |
| Riesz-Markov-Saks-Kakutani Theorem | p. 185 |
| Translation Invariance in Real Analysis | p. 195 |
| An Orthonormal Basis for L2(T) | p. 196 |
| Closed, Invariant Subspaces of L2(T) | p. 203 |
| Integration of Hilbert Space Valued Functions | p. 204 |
| Spectrum of a Subset of L2(T) | p. 206 |
| Schwartz Functions: Fourier Transform and Inversion | p. 208 |
| Closed, Invariant Subspaces of L2(T) | p. 213 |
| The Fourier Transform in L2(R) | p. 213 |
| Translation-Invariant Subspaces of L2(R) | p. 216 |
| The Fourier Transform and Direct Integrals | p. 218 |
| Irreducibility of L2(R) Under Translations and Rotations | p. 219 |
| Position and Momentum Operators | p. 221 |
| The Heisenberg Group | p. 222 |
| The Banach-Tarski Theorem | p. 225 |
| The Limits to Countable Additivity | p. 225 |
| References | p. 229 |
| Index | p. 231 |
| Table of Contents provided by Ingram. All Rights Reserved. |
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