๐”– Scriptorium
โœฆ   LIBER   โœฆ
๐Ÿ“

Introduction to complex analysis

โœ Scribed by Junjiro Noguchi

Publisher
AMS
Year
1998
Tongue
English
Leaves
266
Series
TMM168
Category
Library
โฌ‡  Acquire This Volume

No coin nor oath required. For personal study only.

โœฆ Synopsis

This book describes a classical introductory part of complex analysis for university students in the sciences and engineering and could serve as a text or reference book. It places emphasis on rigorous proofs, presenting the subject as a fundamental mathematical theory. The volume begins with a problem dealing with curves related to Cauchy's integral theorem. To deal with it rigorously, the author gives detailed descriptions of the homotopy of plane curves. Since the residue theorem is important in both pure and applied mathematics, the author gives a fairly detailed explanation of how to apply it to numerical calculations; this should be sufficient for those who are studying complex analysis as a tool.

โœฆ Table of Contents

Cover......Page 1
Title Page......Page 6
Copyright......Page 7
Dedication......Page 8
Contents......Page 10
Preface......Page 12
1.1. Complex Numbers......Page 14
1.2. Plane Topology......Page 16
1.3. Sequences and Limits......Page 22
Problems......Page 28
2.1. Complex Functions......Page 30
2.2. Sequences of Complex Functions......Page 32
2.3. Series of Functions......Page 36
2.4. Power Series......Page 38
2.5. Exponential Functions and Trigonometric Functions......Page 43
2.6. Infinite Products......Page 47
2.7. Riemann Sphere......Page 50
2.8. Linear Transformations......Page 53
Problems......Page 59
3.1. Complex Derivatives......Page 62
3.2. Curvilinear Integrals......Page 67
3.3. Homotopy of Curves......Page 75
3.4. Cauchy's Integral Theorem......Page 80
3.5. Cauchy's Integral Formula......Page 85
3.6. Mean Value Theorem and Harmonic Functions......Page 94
3.7. Holomorphic Functions on the Riemann Sphere......Page 100
Problems......Page 102
4.1. Laurent Series......Page 104
4.2. Meromorphic Functions and Residue Theorem......Page 107
4.3. Argument Principle......Page 112
4.4. Residue Calculus......Page 119
Problems......Page 127
5.1. Analytic Continuation......Page 130
5.2. Monodromy Theorem......Page 137
5.3. Universal Covering and Riemann Surface......Page 143
Problems......Page 151
6.1. Linear Transformations......Page 154
6.2. Poincare Metric......Page 157
6.3. Contraction Principle......Page 162
6.4. The Riemann Mapping Theorem......Page 166
6.5. Boundary Correspondence......Page 170
6.6. Universal Covering of C {0, 1}......Page 176
6.7. The Little Picard Theorem......Page 180
6.8. The Big Picard Theorem......Page 183
Problems......Page 187
7.1. Approximation Theorem......Page 192
7.2. Existence Theorems......Page 198
7.3. Riemann-Stieltjes' Integral......Page 205
7.4. Meromorphic Functions on C......Page 207
7.5. Weierstrass' Product......Page 215
7.6. Elliptic Functions......Page 223
Problems......Page 239
Hints and Answers......Page 242
References......Page 254
Index......Page 258
Symbols......Page 262
Correction List......Page 264
Back Cover......Page 266

๐Ÿ“œ SIMILAR VOLUMES

Introduction to Complex Analysis
๐Ÿ“ Introduction to Complex Analysis
โœ Junjiro Noguchi ๐Ÿ“‚ Library ๐Ÿ“… 2008 ๐Ÿ› American Mathematical Society ๐ŸŒ English

Suitable for a one year course in complex analysis, at the advanced undergraduate or graduate level, this is a pretty good introduction to the subject, with well-written, detailed proofs and lots of exercises. If you take the time to work the exercises, you will learn the subject, and you will lear

Introduction to Complex Analysis
๐Ÿ“ Introduction to Complex Analysis
โœ Rolf Nevanlinna, Veikko Paatero ๐Ÿ“‚ Library ๐Ÿ“… 2007 ๐Ÿ› Addison-Wesley Educational Publishers Inc ๐ŸŒ English

This classic book gives an excellent presentation of topics usually treated in a complex analysis course, starting with basic notions (rational functions, linear transformations, analytic function), and culminating in the discussion of conformal mappings, including the Riemann mapping theorem and th

Introduction to Complex Analysis
๐Ÿ“ Introduction to Complex Analysis
โœ H. A. Priestley ๐Ÿ“‚ Library ๐Ÿ“… 2003 ๐Ÿ› Oxford University Press, USA ๐ŸŒ English

Complex analysis is a classic and central area of mathematics, which is studies and exploited in a range of important fields, from number theory to engineering. <em>Introduction to Complex Analysis</em> was first published in 1985, and for this much-awaited second edition the text has been considera

Introduction to Complex Analysis
๐Ÿ“ Introduction to Complex Analysis
โœ E. M. Chirka, P. Dolbeault, G. M. Khenkin, A. G. Vitushkin (auth.) ๐Ÿ“‚ Library ๐Ÿ“… 1997 ๐Ÿ› Springer-Verlag Berlin Heidelberg ๐ŸŒ English

<p>From the reviews of the first printing, published as Volume 7 of the Encyclopaedia of Mathematical Sciences:<BR><BR>"...... In this volume, we find an introductory essay entitled "Remarkable Facts of Complex Analysis" by Vitushkin... This is followed by articles by G.M.Khenkin on integral formula