This is an advanced text for the one- or two-semester course in analysis, taught primarily to math, science, computer science, and electrical engineering majors at the junior, senior or graduate level.This is an advanced text for the one- or two-semester course in analysis, taught primarily to math, science, computer science, and electrical engineering majors at the junior, senior or graduate level.Read Less
Good. 1966 Hardcover. xi, 412 p. Former Library book. Bibliography: p. 401-402. Shows some signs of wear, and may have some markings on the inside. Shipped to over one million happy customers. Your purchase benefits world literacy!
Very Good + in Very Good + jacket. Hardcover with unclipped dust jacket in an old plastic protector, undated [c1970, appears to be a Chinese pirated edition), xi + 412 pages; very light shelf wear, bumps to corners, ink signature, ink and/or pencil markings on approximately 55 pages, but gently used, otherwise very clean and unmarked.
New. This is an advanced text for the one-or two-semester course in analysis taught primarily to math, science, computer science, and electrical engineering majors at the junior, senior or graduate level. The basic techniques and theorems of analysis are presented in such a way that the intimate connections between its various branches are strongly emphasized. The traditionally separate subjects of `real analysis` and `complex analysis` are thus united in one volume. Some of the basic ideas from functional analysis are also included. This is the only book to take this unique approach. The third edition includes a new chapter on differentiation. Proofs of theorems presented in the book are concise and complete and many challenging exercises appear at the end of each chapter. The book is arranged so that each chapter builds upon the other, giving students a gradual understanding of the subject. Table of contents Preface Prologue: The Exponential Function Chapter 1: Abstract Integration Chapter 2: Positive Borel Measures Chapter 3: Lp-Spaces Chapter 4: Elementary Hilbert Space Theory Chapter 5: Examples of Banach Space Techniques Chapter 6: Complex Measures Chapter 7: Differentiation Chapter 8: Integration on Product Spaces Chapter 9: Fourier Transforms Chapter 10: Elementary Properties of Holomorphic Functions Chapter 11: Harmonic Functions Chapter 12: The Maximum Modulus Principle Chapter 13: Approximation by Rational Functions Chapter 14: Conformal Mapping Chapter 15: Zeros of Holomorphic Functions Chapter 16: Analytic Continuation Chapter 17: Hp-Spaces Chapter 18: Elementary Theory of Banach Algebras Chapter 19: Holomorphic Fourier Transforms Chapter 20: Uniform Approximation by Polynomials Appendix: Hausdorff`s Maximality Theorem Notes and Comments Bibliography List of Special Symbols Index Printed Pages: 416. 15 X 23 cm.
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