Significantly revised and expanded, this authoritative reference/text comprehensively describes concepts in measure theory, classical integration, and generalized Riemann integration of both scalar and vector types-providing a complete and detailed review of every aspect of measure and integration theory using valuable examples, exercises, and applications.
With more than 170 references for further investigation of the subject, this Second Edition
- provides more than 60 pages of new information, as well as a new chapter on nonabsolute integrals
- contains extended discussions on the four basic results of Banach spaces
- presents an in-depth analysis of the classical integrations with many applications, including integration of nonmeasurable functions, Lebesgue spaces, and their properties
- details the basic properties and extensions of the Lebesgue-Carathéodory measure theory, as well as the structure and convergence of real measurable functions
- covers the Stone isomorphism theorem, the lifting theorem, the Daniell method of integration, and capacity theory
Measure Theory and Integration, Second Edition is a valuable reference for all pure and applied mathematicians, statisticians, and mathematical analysts, and an outstanding text for all graduate students in these disciplines.
Reihe
Sprache
Verlagsort
Verlagsgruppe
Zielgruppe
Für höhere Schule und Studium
Pure and applied mathematicians, statisticians, mathematical analysts, and graduate students in these disciplines.
Editions-Typ
Maße
Höhe: 229 mm
Breite: 152 mm
ISBN-13
978-0-203-02152-1 (9780203021521)
Schweitzer Klassifikation
Introduction and Preliminaries
Measurability and Measures
Measurable Functions
Classical Integration
Differentiation and Duality
Product Measures and Integrals
Nonabsolute Integration
Capacity Theory and Integration
The Lifting Theorem
Topological Measures
Some Complements and Applications
Appendix
References
Index of Symbols and Notation
Author Index
Subject Index
