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. Introduction to Complex Analysis was first published in 1985, and for this much-awaited second edition the text has been considerably expanded, while retaining the style of the original. More detailed presentation is given of elementary topics, to reflect the knowledge base of current students. Exercise sets have been substantially revised and enlarged, with carefully graded exercises at the end of each chapter.
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. Introduction to Complex Analysis was first published in 1985, and for this much-awaited second edition the text has been considerably expanded, while retaining the style of the original. More detailed presentation is given of elementary topics, to reflect the knowledge base of current students. Exercise sets have been substantially revised and enlarged, with carefully graded exercises at the end of each chapter.
Complex numbers Geometry in the complex plane Topology and analysis in the complex plane Holomorphic functions Complex series and power series A menagerie of holomorphic functions Paths Multifunctions: basic track Conformal mapping Cauchy's theorem: basic track Cauchy's theorem: advanced track Cauchy's formulae Power series representation Zeros of holomorphic functions Further theory of holomorphic functions Singularities Cauchy's residue theorem Contour integration: a technical toolkit Applications of contour integration The Laplace transform The Fourier transform Harmonic functions and holomorphic functions Bibliography Notation index Index
Complex numbers Geometry in the complex plane Topology and analysis in the complex plane Holomorphic functions Complex series and power series A menagerie of holomorphic functions Paths Multifunctions: basic track Conformal mapping Cauchy's theorem: basic track Cauchy's theorem: advanced track Cauchy's formulae Power series representation Zeros of holomorphic functions Further theory of holomorphic functions Singularities Cauchy's residue theorem Contour integration: a technical toolkit Applications of contour integration The Laplace transform The Fourier transform Harmonic functions and holomorphic functions Bibliography Notation index Index
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