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Complex Analysis in One Variable / by Raghavan Narasimhan, Yves Nievergelt
版 | 2nd ed. 2001. |
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出版者 | Boston, MA : Birkhäuser Boston : Imprint: Birkhäuser |
出版年 | 2001 |
本文言語 | 英語 |
大きさ | XIV, 381 p : online resource |
著者標目 | *Narasimhan, Raghavan author Nievergelt, Yves author SpringerLink (Online service) |
件 名 | LCSH:Functions of real variables LCSH:Functions of complex variables LCSH:Algebraic geometry LCSH:Mathematical analysis FREE:Real Functions FREE:Functions of a Complex Variable FREE:Algebraic Geometry FREE:Analysis FREE:Several Complex Variables and Analytic Spaces |
一般注記 | I Complex Analysis in One Variable -- 1 Elementary Theory of Holomorphic Functions -- 2 Covering Spaces and the Monodromy Theorem -- 3 The Winding Number and the Residue Theorem -- 4 Picard’s Theorem -- 5 Inhomogeneous Cauchy-Riemann Equation and Runge’s Theorem -- 6 Applications of Runge’s Theorem -- 7 Riemann Mapping Theorem and Simple Connectedness in the Plane -- 8 Functions of Several Complex Variables -- 9 Compact Riemann Surfaces -- 10 The Corona Theorem -- 11 Subharmonic Functions and the Dirichlet Problem -- II Exercises -- 0 Review of Complex Numbers -- 1 Elementary Theory of Holomorphic Functions -- 2 Covering Spaces and the Monodromy Theorem -- 3 The Winding Number and the Residue Theorem -- 4 Picard’s Theorem -- 5 The Inhomogeneous Cauchy—Riemann Equation and Runge’s Theorem -- 6 Applications of Runge’s Theorem -- 7 The Riemann Mapping Theorem and Simple Connectedness in the Plane -- 8 Functions of Several Complex Variables -- 9 Compact Riemann Surfaces -- 10 The Corona Theorem -- 11 Subharmonic Functions and the Dirichlet Problem -- Notes for the exercises -- References for the exercises This book presents complex analysis in one variable in the context of modern mathematics, with clear connections to several complex variables, de Rham theory, real analysis, and other branches of mathematics. Thus, covering spaces are used explicitly in dealing with Cauchy's theorem, real variable methods are illustrated in the Loman-Menchoff theorem and in the corona theorem, and the algebraic structure of the ring of holomorphic functions is studied. Using the unique position of complex analysis, a field drawing on many disciplines, the book also illustrates powerful mathematical ideas and tools, and requires minimal background material. Cohomological methods are introduced, both in connection with the existence of primitives and in the study of meromorphic functionas on a compact Riemann surface. The proof of Picard's theorem given here illustrates the strong restrictions on holomorphic mappings imposed by curvature conditions. New to this second edition, a collection of over 100 pages worth of exercises, problems, and examples gives students an opportunity to consolidate their command of complex analysis and its relations to other branches of mathematics, including advanced calculus, topology, and real applications HTTP:URL=https://doi.org/10.1007/978-1-4612-0175-5 |
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電子ブック | 配架場所 | 資料種別 | 巻 次 | 請求記号 | 状 態 | 予約 | コメント | ISBN | 刷 年 | 利用注記 | 指定図書 | 登録番号 |
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電子ブック | オンライン | 電子ブック |
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Springer eBooks | 9781461201755 |
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EB00236290 |
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