Real Analysis
Real Analysis is written for the senior undergraduate or first-yeargraduate student who has a workable knowledge of advanced calculus. Chapter 1 contains that part of the set theory which underlies all the material in this book. Chapter 2is at once a review and an introduction to the succeeding chapters. Chapter 3 provides a detailed presentation of the Lebesgue measure and integral. Chapter 4 demonstrates the relation between differentiation and integration in relation to Chapter 3.
Chapters 5 and 7 contain the basic material which derives from the theory on metric spaces and topological spaces. The topics discussed in these chapters are most pertinent to analysis. Chapter 6 deals with the classical Banach spaces and can be viewed as an introduction to Chapter 8, which considers abstract Banach spaces.
Chapter 9 is entirely devoted to Hilbert space, which occupies a special position among other Banach spaces. Because of its importance, the chapter presents introductory material and some fundamental results in this area. Chapter 10 focuses upon the abstraction of the most important properties of the Lebesgue measure and Lebesgue integral.
Each chapter is followed by a Problem section. The book contains a bibliography.
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