
Introduction to Integration provides a unified account of integration theory, giving a practical guide to the Lebesgue integral and its uses, with a wealth of examples and exercises. Intended as a first course in integration theory for students familiar with real analysis, the book begins with a simplified Lebesgue integral, which is then developed to provide an entry point for important results in the field. The final chapters present selected applications, mostly drawn from Fourier analysis. The emphasis throughout is on integrable functions rather than on measures. Designed as an undergraduate or graduate textbook, it is a companion volume to the author's Introduction to Complex Analysis and is aimed at both pure and applied mathematicians.
This text investigates the foundational principles of integration theory by providing a unified, practical guide to the Lebesgue integral. Author H. A. Priestley, drawing on her extensive background in mathematical analysis, presents a framework that prioritizes the study of integrable functions over measure theory. The book serves as a pedagogical bridge for students transitioning from introductory real analysis to more advanced applications in pure and applied mathematics.
What You Will Find
Experts and educators frequently cite this work as a clear, accessible entry point for students familiar with real analysis. Readers often note the balance between theoretical rigor and practical application, making it a standard reference for those studying integration theory.
Page Count:
320
Publication Date:
1997-12-04
Publisher:
Clarendon Press
ISBN-10:
0198501234
ISBN-13:
9780198501237
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