Mathematical Analysis II (Universitext)

Features

• Cover Type: Hard Cover with 681 pages
• Published by: Springer
• Edition: 1st Edition January 22, 2004
• Written in: English
• ISBN 10 Number: 3540406336
• ISBN 13 Number: 978-3540406334
• Book Dimensions: 9.4 x 6.5 x 1.6 inches
• Weighs: 2.5 pounds

Product Review


From the reviews:

" The treatment is indeed rigorous and comprehensive with introductory chapters containing an initial section on logical symbolism (used thoughout the text), through sections on sets and functions with an entire chapter on the real numbers. [] The formalism and rigour of the presentation will appeal to mathematicians and to those non-specialists who seek a rigorous basis for the mathematics that they use in their daily work. For such, these books are a valuable and welcome addition to existing English-language texts."

D.Herbert, University of London, Contemporary Physics 2004, Vol. 45, Issue 6

"The book under consideration is aimed primarily at university students and teachers specializing in mathematics and natural sciences, and at all those who wish to see both the mathematical theory with carefully formulated theorems and rigorous proofs on the one hand, and examples of its effective use in the solution of practical problems on the other hand. The last fact differs this book positively from many traditional expositions and is of great importance especially in connection with the applied character of the future activity of the majority of students. [].

This two-volume work presents a well thought-out and thoroughly written first course in analysis, leading from real numbers to such advanced topics as differential forms on manifolds, asymptotic methods, Fourier, Laplace, and Legendre transforms, elliptic functions and distributions. Clarity of exposition, instructive exercises, problems and fresh applications to areas seldom touched on in real analysis books belong also to the distinguished key features of the book. []

The first volume presents a complete course on one-variable calculus along with the multivariable differential calculus elucidated in an up-to-day, clear manner, with a pleasant geometric flavor. []

The basic material of the Part 2 consists on the one hand of multiple integrals and line and surface integrals, leading to the generalized Stokes formula and some examples of its application, and on the other hand the machinery of series and integrals depending on a parameter, including Fourier series, the Fourier transform, and the presentation of asymptotic expansions. The presentation of the material is also here very geometric. The second volume is especially unusual for textbooks of modern analysis and such a way of structuring the course can be considered as innovative. []

Both parts are supplemented by prefaces, problems from the midterm examinations, examination topics,references and subject as well as name Indexes. The book is written excellently, with rigorous proofs, and geometrical explanations. The main text is supplemented with a large collection of examples, and nearly every section ends with a set of problems and exercises that significantly complement the main text (unfortunately there are not solutions to the problems and exercises for the self-control). Each volume ends with a list of topics, questions or problems for midterm examinations and with a list of examination topics. The subject index, name index and index of basic notation round up the book and made it very convenient for use.

The book can serve as a foundation for a four semester course for students or can be useful as support for all who are studying or teaching mathematical analysis. The reader will be able to follow the presentation with a minimum previous knowledge. The researcher can find interesting references, in particulary giving access to classical as well as to modern results."

I. P. Gavrilyuk, Zeitschrift für Analysis und ihre Anwendungen Volume 23, Issue 4, 2004, p. 861-863

"This is a very nice textbook on mathematical analysis, which will be useful to both the students and the lecturers. [] About style of explanation one can say that the definitions are motivated and precisely formulated. The proofs of theorems are in appropriate generality, presented in detail and without logical gaps. This is illustrated in many examples (many of them arise in applications) and each section ends with a list of problems and exercises, which extend and supplement the basic text. []"

European Mathematical Society Newsletter, Sept. 2004, p. 47

"This is the translation of the fourth edition of a well known course on mathematical analysis, taught for several years by the author at the Moscow State University (MSU) and at other universities. Together with V.I.Arnold and S.P.Novkov, the author is one of the organizers of advanced experimental courses at MSU, this experience being reflected in the book too. Written in the good tradition of Russian mathematical textbooks, the present one combines intuition and accessibility with modern mathematical rigor.

There are a lot of exercises and problems, of varying difficulty, spread through the book, needed for a better understanding of the subject, as well as historical notes about the great names who contributed along the centuries to the building of the edifice of mathematical analysis.

This comprehensive course on mathematical analysis provides the readers, first of all students specializing in mathematics, with rigorous proofs of the fundamental theorems, but also with its applications in mathematics itself and outside it. It is correlated with subsequent disciplines relying on its methods and results, as differential equations, differential geometry, functions of a complex variable and functional analysis."

T.Trif, Studia Universitatis Babes. Bolyai Mathematica, Vol. XLIX, Issue 3, 2004

"These two big volumes of the well-known advanced course of Calculus written by Professor Vladimier A. Zorich on the base of his lectures to students of Moscow State University. There are four editions of the textbook in Russian: the first of them was printed in 1980 and thus this book has withstood severe test of time; to my mind, the book is one of the best (possibly best) modern textbooks in Analysis. The words of A.N. Kolmogorov " An entirely logical rigor of discussion  is combined with simplicity and completeness as well as with the development of the habit to work with real problems from natural sciences" are complete and clear characterization of this book. 

The author writes: "This book has been aimed primarily at mathematicians desiring to obtain thorough proofs of the fundamental theorems, but who are at the same time interested in the life of these theorems outside of mathematics itself". However, I think that this book will be useful to all beginning mathematicians (students and postgraduate students in mathematics, natural sciences, engineering and technology) who want seriously to study analysis and also all specialists (first and foremost, lecturers and teachers) in analysis and interdisciplinary sciences. Undoubtedly, any mathematical library must have this textbook."

Peter Zabreiko, Minsk, Zentralblatt MATH 1071 - 3, 2005

 "Let's get one thing straight from the very beginning. I like this two-volume set. It will make an great reference for students and provides a vast reservoir of interesting exercises and exam questions for analysis teachers. Get your library order a copy as soon as possible. []

What special features, beside enormous breadth, distinguish these volumes from other introductory analysis texts? []

1. The Foundations Are Carefully Laid. []

2. It Is Comprehensive and Encyclopedic. []

3. Material Is Carefully Motivated by Practical Considerations. []

4. Important Ideas Are Introduced More Than Once. []

5. The Pace Accelerates as the Text Progresses. []

6. This Two-Volume Set Contains Plenty of Good Examples. []

7. It Also Contains Plenty of Exercises. []

8. Unusual Touches. []

[]

William R. Wade, University of Tennessee, SIAM Book Reviews, Vol. 46, No. 4

"This is the translation of the fourth edition of a well known course on mathematical analysis, taught for several years by the author  . Written in the good tradition of Russian mathematical textbooks, the present one combines intuition and accessibility with modern mathematical rigor. The book is divided into two volumes.  There are a lot of exercises and problems, of varying difficulty, spread through the book, needed for a better understanding of the subject, as well as historical notes  ."

T.Trif, Studia Universitatis Babes-Bolyai Mathematica, Vol. XLIX (3), 2004

"This is a translation of the fourth edition of a two volume textbook  . The textbook is aimed primarily at university students and teachers specializing in mathematics and natural sciences and at all those who wish to see both the rigorous mathematical theory and examples of its effective use in the solution of real problems of natural science.  The formalism and rigour of the presentation will appeal to mathematicians  . these books are a valuable and welcome addition to existing English-language texts."

Dr. D. Herbert, Contemporary Physics, Vol. 45 (6), 2004

"This is a very nice textbook on mathematical analysis, which will be useful to both the students and the lecturers.  About style of explanation one can say that the definitions are motivated and precisely formulated. The proofs of theorems are in appropriate generality, presented in detail and without logical gaps. This is illustrated in many examples  and each section ends with a list of problems and exercises, which extend and supplement the basic text."

EMS - European Mathematical Society Newsletter, September, 2004

"The book under consideration is aimed primarily at university students and teachers specializing in mathematics and natural sciences  . This two-volume work presents a well thought-out and thoroughly written first course in analysis  . Clarity of exposition, instructive exercises, problems and fresh appl

Product Description


This two-volume work presents a thorough first course in analysis, leading from real numbers to such advanced topics as differential forms on manifolds, asymptotic methods, integral transforms, and distributions. Especially notable in this course is the clearly expressed orientation toward the natural sciences and its informal exploration of the essence and the roots of the basic concepts and theorems of calculus. Clarity of exposition is matched by a wealth of instructive exercises, problems and fresh applications to areas seldom touched on in real analysis books.

The second volume expounds classical analysis as it is today, as a part of unified mathematics, and its interactions with modern mathematical courses such as algebra, differential geometry, differential equations, complex and functional analysis. The book provides a firm foundation for advanced work in any of these directions.

Reader Reviews
This is a two-volume treatise on Mathematical Analysis at undergraduate level. These two volumes are the most complete that I have seen so far. There is plenty of material here; one could easily spend two academic years (4 semesters of 6 quarters) to cover both volumes completely. Everything needed in undergraduate analysis is here: convergence (pointwise and uniform), differentiation, integration, integrals depending on parameters, interchanging limits, metric spaces, partial derivatives, multiple integrals, Stokes' Theorem, and much, much more. The author is a very good writer, and his proofs are slick, but readable. Exercises range from routine to quite challanging. Anyone studying real analysis (or mathematical analysis) should have these two volumes handy. Highly recommended. Comment | | (Report this)