Mathematical analysis and Functions of real variables
A Guide to Advanced Real Analysis is perfect for graduate students preparing for qualifying exams, or for faculty who would like an overview of the subject. This book is an outline of the core material in the standard graduate-level real analysis course. It is intended as a resource for students in such a course as well as others who wish to learn or review the subject. On the abstract level, it covers the theory of measure and integration and the basics of point set topology, functional analysis, and the most important types of function spaces. On the more concrete level, it also deals with the applications of these general theories to analysis on Euclidean space: the Lebesgue integral, Hausdorff measure, convolutions, Fourier series and transforms, and distributions. The relevant definitions and major theorems are stated in detail. Proofs, however, are generally presented only as sketches, in such a way that the key ideas are explained but the technical details are omitted. In this way a large amount of material is presented in a concise and readable form.
MATHEMATICS -- Calculus, MATHEMATICS -- Mathematical Analysis, Functions of real variables, Mathematical analysis, Mathematical analysis, and Functions of real variables
Includes bibliographical references (p. 101-102) and index Prologue: notation, terminology, and set theory -- Topology -- Measure and integration: general theory -- Measure and integration: constructions and special examples -- Rudiments of functional analysis -- Function spaces -- Topics in analysis on Euclidean Space