Measure and integral : an introduction to real analysis
Author(s)
Bibliographic Information
Measure and integral : an introduction to real analysis
(Monographs and textbooks in pure and applied mathematics, 43)
M. Dekker, c1977
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Note
Includes index
Description and Table of Contents
Description
This volume develops the classical theory of the Lebesgue integral and some of its applications. The integral is initially presented in the context of n-dimensional Euclidean space, following a thorough study of the concepts of outer measure and measure. A more general treatment of the integral, based on an axiomatic approach, is later given.
Closely related topics in real variables, such as functions of bounded variation, the Riemann-Stieltjes integral, Fubini's theorem, L(p)) classes, and various results about differentiation are examined in detail. Several applications of the theory to a specific branch of analysis--harmonic analysis--are also provided. Among these applications are basic facts about convolution operators and Fourier series, including results for the conjugate function and the Hardy-Littlewood maximal function.
Measure and Integral: An Introduction to Real Analysis provides an introduction to real analysis for student interested in mathematics, statistics, or probability. Requiring only a basic familiarity with advanced calculus, this volume is an excellent textbook for advanced undergraduate or first-year graduate student in these areas.
Table of Contents
- Preliminaries Points and Sets in Rn Rn as a Metric Space Open and Closed Sets in Rn: Special Sets Compact Sets
- The Heine-Borel Theorem Functions Continuous Functions and Transformations The Riemann Integral Exercises Function of Bounded Variation
- The Riemann-Stieltjes Integral Functions of Bounded Variation Rectifiable Curves The Reiman-Stieltjes Integral Further Results About the Reimann-Stieltjes Integrals Exercises Lebesgue Measure and Outer Measure Lebesgue Outer Measures
- The Cantor Set. Lebesgue Measurable Sets Two Properties of Lebesgue Measure Characterizations of Measurability Lipschitz Transformations of Rn A Nonmeasurable Set. Exercises Lebesgue Measurable Functions Elementary Properties of Measurable Functions. Semicontinuous Functions Properties of Measurable Functions
- Egorov's Theorem and Lusin's Theorem Convergence in Measure Exercises The Lebesgue Integral Definition of the Integral of a Nonnegative Function Properties of the Integral The Integral of an Arbitrary Measurable f A Relation Between Riemann-Stieltjes and Lebesgue Integrals
- the LP Spaces, 0
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