Principles Of Complex Analysis

Principles of Complex Analysis

Author : Serge Lvovski

Publisher : Springer Nature

Page : 257 pages

File Size : 29,14 MB

Release : 2020-09-26

Category : Mathematics

ISBN : 3030593657

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Book Description

This is a brief textbook on complex analysis intended for the students of upper undergraduate or beginning graduate level. The author stresses the aspects of complex analysis that are most important for the student planning to study algebraic geometry and related topics. The exposition is rigorous but elementary: abstract notions are introduced only if they are really indispensable. This approach provides a motivation for the reader to digest more abstract definitions (e.g., those of sheaves or line bundles, which are not mentioned in the book) when he/she is ready for that level of abstraction indeed. In the chapter on Riemann surfaces, several key results on compact Riemann surfaces are stated and proved in the first nontrivial case, i.e. that of elliptic curves.



Principles of Complex Analysis

Author : Serge Lvovski

Publisher : Springer

Page : 257 pages

File Size : 42,23 MB

Release : 2021-09-28

Category : Mathematics

ISBN : 9783030593674

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Book Description

This is a brief textbook on complex analysis intended for the students of upper undergraduate or beginning graduate level. The author stresses the aspects of complex analysis that are most important for the student planning to study algebraic geometry and related topics. The exposition is rigorous but elementary: abstract notions are introduced only if they are really indispensable. This approach provides a motivation for the reader to digest more abstract definitions (e.g., those of sheaves or line bundles, which are not mentioned in the book) when he/she is ready for that level of abstraction indeed. In the chapter on Riemann surfaces, several key results on compact Riemann surfaces are stated and proved in the first nontrivial case, i.e. that of elliptic curves.



Principles of Complex Analysis

Author : Serge Lvovski

Publisher : Springer

Page : 257 pages

File Size : 47,59 MB

Release : 2020-11-22

Category : Mathematics

ISBN : 9783030593643

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Book Description

This is a brief textbook on complex analysis intended for the students of upper undergraduate or beginning graduate level. The author stresses the aspects of complex analysis that are most important for the student planning to study algebraic geometry and related topics. The exposition is rigorous but elementary: abstract notions are introduced only if they are really indispensable. This approach provides a motivation for the reader to digest more abstract definitions (e.g., those of sheaves or line bundles, which are not mentioned in the book) when he/she is ready for that level of abstraction indeed. In the chapter on Riemann surfaces, several key results on compact Riemann surfaces are stated and proved in the first nontrivial case, i.e. that of elliptic curves.





Applied Complex Variables

Author : John W. Dettman

Publisher : Courier Corporation

Page : 514 pages

File Size : 48,80 MB

Release : 2012-05-07

Category : Mathematics

ISBN : 0486158284

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Book Description

Fundamentals of analytic function theory — plus lucid exposition of 5 important applications: potential theory, ordinary differential equations, Fourier transforms, Laplace transforms, and asymptotic expansions. Includes 66 figures.



Complex Analysis with Applications

Author : Richard A. Silverman

Publisher : Courier Corporation

Page : 308 pages

File Size : 42,2 MB

Release : 1984-01-01

Category : Mathematics

ISBN : 9780486647623

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Book Description

The basics of what every scientist and engineer should know, from complex numbers, limits in the complex plane, and complex functions to Cauchy's theory, power series, and applications of residues. 1974 edition.



Theory of Complex Functions

Author : Reinhold Remmert

Publisher : Springer Science & Business Media

Page : 464 pages

File Size : 35,2 MB

Release : 2012-12-06

Category : Mathematics

ISBN : 1461209390

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Book Description

A lively and vivid look at the material from function theory, including the residue calculus, supported by examples and practice exercises throughout. There is also ample discussion of the historical evolution of the theory, biographical sketches of important contributors, and citations - in the original language with their English translation - from their classical works. Yet the book is far from being a mere history of function theory, and even experts will find a few new or long forgotten gems here. Destined to accompany students making their way into this classical area of mathematics, the book offers quick access to the essential results for exam preparation. Teachers and interested mathematicians in finance, industry and science will profit from reading this again and again, and will refer back to it with pleasure.





Complex Variables

Author : A. K. Kapoor

Publisher : World Scientific

Page : 522 pages

File Size : 14,67 MB

Release : 2011

Category : Mathematics

ISBN : 9814313521

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Book Description

This textbook introduces the theory of complex variables at undergraduate level. A good collection of problems is provided in the second part of the book. The book is written in a user-friendly style that presents important fundamentals a beginner needs to master the technical details of the subject. Similarly, teachers can also adopt the text for a course on complex variables and for mining problems. The organization of problems into focused sets is an important feature of the book.



A Second Course in Complex Analysis

Author : William A. Veech

Publisher : Courier Corporation

Page : 257 pages

File Size : 39,55 MB

Release : 2014-08-04

Category : Mathematics

ISBN : 048615193X

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Book Description

A clear, self-contained treatment of important areas in complex analysis, this text is geared toward upper-level undergraduates and graduate students. The material is largely classical, with particular emphasis on the geometry of complex mappings. Author William A. Veech, the Edgar Odell Lovett Professor of Mathematics at Rice University, presents the Riemann mapping theorem as a special case of an existence theorem for universal covering surfaces. His focus on the geometry of complex mappings makes frequent use of Schwarz's lemma. He constructs the universal covering surface of an arbitrary planar region and employs the modular function to develop the theorems of Landau, Schottky, Montel, and Picard as consequences of the existence of certain coverings. Concluding chapters explore Hadamard product theorem and prime number theorem.