A Second Course in Complex Analysis
CRC Press (Verlag)
978-1-041-19714-0 (ISBN)
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Few other books purport to be a second course in complex analysis. This book differs in that it covers more modern topics and is more geometric in focus. Most texts on complex variable theory contain the same material. However, complex analysis is a vast and diverse subject with a long history and many aspects. A second course will benefit students and introduce these new topics that they might not otherwise experience.
Lars Ahlfors alone invented many new parts of the subject; Lipman Bers made decisive contributions, and there are many others. It is easy to justify a “second course” in complex analysis. That is what this book purports to be.
Some of the topics presented here are:
• harmonic measure
• extremal length
• Riemann surfaces
• uniformization
• automorphism groups
• the Schwarz lemma and its generalizations
• analytic capacity
• the Bergman theory
• invariant metrics
• Picard’s theorem
• the boundary Schwarz lemma
The goal is to expose the reader to unfamiliar parts of the subject of complex variables and perhaps to pique interest in further reading. As with the authors’ other books, not only theorems and proofs are included, but also many examples and some exercises. Numerous graphics illustrate the key ideas.
Peter V. Dovbush, Dr. habil., is an Associate Professor at Moldova State University, in the Institute of Mathematics and Computer Science. He received his Ph.D. in Lomonosov Moscow State University in 1983 and Doctor of Sciences in 2003. He has published over 50 scholarly articles. Steven G. Krantz is a Professor of Mathematics at Washington University in St. Louis. He has previously taught at UCLA, Princeton University, and Penn State University. He received his Ph.D. from Princeton University in 1974. Krantz has directed 20 Ph.D. students and 8 Masters students. He has published over 130 books and over 300 scholarly articles. He is the holder of the Chauvenet Prize and the Beckenbach Book Award and the Kemper Prize. He is a Fellow of the American Mathematical Society.
1. Preliminaries 2. Extremal Length 3. Harmonic Measure 4. Riemann Surfaces 5. Abstract Riemann Surfaces 6. The Riemann–Roch Theorem 7. Covering Surfaces and Classical Plane Geometries 8. The Uniformization Theorem 9. Analytic Capacity 10. The Bergman Kernel 11. Appendix
| Erscheint lt. Verlag | 27.4.2026 |
|---|---|
| Reihe/Serie | Textbooks in Mathematics |
| Zusatzinfo | 58 Line drawings, black and white; 58 Illustrations, black and white |
| Verlagsort | London |
| Sprache | englisch |
| Maße | 156 x 234 mm |
| Themenwelt | Mathematik / Informatik ► Mathematik ► Analysis |
| ISBN-10 | 1-041-19714-4 / 1041197144 |
| ISBN-13 | 978-1-041-19714-0 / 9781041197140 |
| Zustand | Neuware |
| Informationen gemäß Produktsicherheitsverordnung (GPSR) | |
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