A Course In Mathematical Analysis Volume 3 Part One
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A Course in Mathematical Analysis Volume 3
Author: Edouard Goursat
language: en
Publisher: Courier Corporation
Release Date: 2013-04-04
Classic three-volume study. Volume 1 covers applications to geometry, expansion in series, definite integrals, and derivatives and differentials. Volume 2 explores functions of a complex variable and differential equations. Volume 3 surveys variations of solutions and partial differential equations of the second order and integral equations and calculus of variations.
Mathematical Analysis I
Author: Vladimir A. Zorich
language: en
Publisher: Springer Science & Business Media
Release Date: 2004-01-22
This work by Zorich on Mathematical Analysis constitutes a thorough first course in real analysis, leading from the most elementary facts about real numbers to such advanced topics as differential forms on manifolds, asymptotic methods, Fourier, Laplace, and Legendre transforms, and elliptic functions.
A Course in Mathematical Analysis: Volume 3, Complex Analysis, Measure and Integration
Author: D. J. H. Garling
language: en
Publisher: Cambridge University Press
Release Date: 2014-05-22
The three volumes of A Course in Mathematical Analysis provide a full and detailed account of all those elements of real and complex analysis that an undergraduate mathematics student can expect to encounter in the first two or three years of study. Containing hundreds of exercises, examples and applications, these books will become an invaluable resource for both students and instructors. Volume 1 focuses on the analysis of real-valued functions of a real variable. Volume 2 goes on to consider metric and topological spaces. This third volume develops the classical theory of functions of a complex variable. It carefully establishes the properties of the complex plane, including a proof of the Jordan curve theorem. Lebesgue measure is introduced, and is used as a model for other measure spaces, where the theory of integration is developed. The Radon–Nikodym theorem is proved, and the differentiation of measures discussed.