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Introduction to Complex Analysis by George Voutsadakis
This note explains the following topics: Complex Numbers and Their Properties, Complex Plane, Polar Form of Complex Numbers, Powers and Roots, Sets of Points in the Complex Plane and Applications.
Author(s): George Voutsadakis,Lake Superior State University
67 Pages 
Notes for Math 520 Complex Analysis Ko Honda
The contents of this book include: Complex numbers, Polynomials and rational functions, Riemann surfaces and holomorphic maps, Fractional linear transformations, Power series, More Series, Exponential and trigonometric functions, Arcs, curves, etc, Inverse functions and their derivatives, Line integrals, Cauchy’s theorem, The winding number and Cauchy’s integral formula, Higher derivatives, including Liouville’s theorem, Removable singularities, Taylor’s theorem, zeros and poles, Analysis of isolated singularities, Local mapping properties, Maximum principle, Schwarz lemma, and conformal mappings, Weierstrass’ theorem and Taylor series, Plane topology, The general form of Cauchy’s theorem, Residues, Schwarz reflection principle, Normal families, Arzela-Ascoli, Riemann mapping theorem, Analytic continuation, Universal covers and the little Picard theorem.
Author(s): Ko Honda
73 Pages
This book explains the following topics: Introduction to Complex Number System, Sequences of Complex Numbers, Series of Complex Number, Differentiability, Complex Logarithm, Analytic Functions, Complex Integration, Cauchy Theorem, Theorems in Complex Analysis, Maximum and Minimum Modulus principle, Singularities, Residue Calculus and Meromorphic Functions, Mobius Transformation.
Author(s): Institute of Distance and Open Learning, University of Mumbai
294 Pages
Introduction to Complex Analysis by Michael Taylor
In this note the student will learn that all the basic functions that arise in calculus, first derived as functions of a real variable, such as powers and fractional powers, exponentials and logs, trigonometric functions and their inverses, and also many new functions that the student will meet, are naturally defined for complex arguments.
Author(s): Michael Taylor
478 Pages
Introduction to Complex Analysis excerpts by B.V. Shabat
This note covers the following topics: The Holomorphic Functions, Functions Of A Complex Variable, Properties Of Holomorphic Functions, The Basics Of The Geometric Theory, The Taylor Series.
Author(s): B.V. Shabat
111 Pages
Complex Analysis by Christer Bennewitz
This note explains the following topics: Complex functions, Analytic functions, Integration, Singularities, Harmonic functions, Entire functions, The Riemann mapping theorem and The Gamma function.
Author(s): Christer Bennewitz
116 Pages
Complex Analysis Lecture Notes by Dan Romik
This note covers the following topics: The fundamental theorem of algebra, Analyticity, Power series, Contour integrals , Cauchy’s theorem, Consequences of Cauchy’s theorem, Zeros, poles, and the residue theorem, Meromorphic functions and the Riemann sphere, The argument principle, Applications of Rouche’s theorem, Simply-connected regions and Cauchy’s theorem, The logarithm function, The Euler gamma function, The Riemann zeta function, The prime number theorem and Introduction to asymptotic analysis.
Author(s): Dan Romik
129 Pages
Complex Analysis by Christian Berg
This note covers the following topics: Holomorphic functions, Contour integrals and primitives, The theorems of Cauchy, Applications of Cauchy’s integral formula, Argument. Logarithm, Powers, Zeros and isolated singularities, The calculus of residues, The maximum modulus principle, Mobius transformations.
Author(s): Christian Berg
192 Pages
Complex Analysis by Charles Walkden
This note explains the following topics: Limits and differentiation in the complex plane and the Cauchy-Riemann equations, Power series and elementary analytic functions, Complex integration and Cauchy’s Theorem, Cauchy’s Integral Formula and Taylor’s Theorem, Laurent series and singularities.
Author(s): Charles Walkden
157 Pages
Complex Variables A Physical Approach
This text will illustrate and teach all facets of the subject in a lively manner that will speak to the needs of modern students. It will give them a powerful toolkit for future work in the mathematical sciences, and will also point to new directions for additional learning. Topics covered includes: The Relationship of Holomorphic and Harmonic Functions, The Cauchy Theory, Applications of the Cauchy Theory, Isolated Singularities and Laurent Series, The Argument Principle, The Geometric Theory of Holomorphic Functions, Applications That Depend on Conformal Mapping, Transform Theory.
Author(s): Steven G. Krantz
437 Pages
Functions of a complex variable
This book is designed for students who, having acquired a good working knowledge of the calculus, desire to become acquainted with the theory of functions of a complex variable, and with the principal applications of that theory.Numerous examples have been given throughout the book, and there is also a set of Miscellaneous Examples, arranged to correspond with the order of the text.
Author(s): Thomas M. MacRobert
328 Pages
Introduction to Complex Variables
These are the sample pages from the textbook, 'Introduction to Complex Variables'. This book covers the following topics: Complex numbers and inequalities, Functions of a complex variable, Mappings, Cauchy-Riemann equations, Trigonometric and hyperbolic functions, Branch points and branch cuts, Contour integration, Sequences and series, The residue theorem, Evaluation of integrals, Introduction to potential theory, Applications, Fourier, Laplace and Z-transforms.
Author(s): John Henry Heinbockel
NA Pages
Lecture Notes for Complex Analysis PDF
This book covers the following topics: Field of Complex Numbers, Analytic Functions, The Complex Exponential, The Cauchy-Riemann Theorem, Cauchy’s Integral Formula, Power Series, Laurent’s Series and Isolated Singularities, Laplace Transforms, Prime Number Theorem, Convolution, Operational Calculus and Generalized Functions.
Author(s): Frank Neubrander
32 Pages
An Introduction to Complex Analysis for Engineers
This note covers the following topics: Examples of Complex Functions, C- Differentiable Functions, Integration, Taylor Series, Laurent Series and Residues.
Author(s): Michael D. Alder
178 Pages
Introduction to Complex Analysis by Hilary Priestly
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Author(s): NA
NA Pages
Short course on complex numbers
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Author(s): NA
NA Pages
Differential Equations and Complex Analysis
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Author(s): NA
NA Pages