The Geometric Theory of Complex Variables
Description
This book provides the reader with a broad introduction to the geometric methodology in complex analysis. It covers both single and several complex variables, creating a dialogue between the two viewpoints.
Regarded as one of the 'grand old ladies' of modern mathematics, complex analysis traces its roots back 500 years. The subject began to flourish with Carl Friedrich Gauss's thesis around 1800. The geometric aspects of the theory can be traced back to the Riemann mapping theorem around 1850, with a significant milestone achieved in 1938 with Lars Ahlfors's geometrization of complex analysis. These ideas inspired many other mathematicians to adopt this perspective, leading to the proliferation of geometric theory of complex variables in various directions, including Riemann surfaces, Teichmüller theory, complex manifolds, extremal problems, and many others.
This book explores all these areas, with classical geometric function theory as its main focus. Its accessible and gentle approach makes it suitable for advanced undergraduate and graduate students seeking to understand the connections among topics usually scattered across numerous textbooks, as well as experienced mathematicians with an interest in this rich field.
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Persons
Peter V. Dovbush is an Associate Professor and Leading Researcher at the Institute of Mathematics and Computer Science of Moldova State University, Moldova. His research interests lie on the geometric theory of functions of several complex variables.
Steven G. Krantz earned his B.A. from the University of California at Santa Cruz (1971) and his PhD from Princeton University, USA (1974). With teaching periods at UCLA, Princeton, Penn State, and Washington University in St. Louis, he chaired the latter's mathematics department for five years. Dr. Krantz has authored or co-authored over 160 books and 350 scholarly papers, and he has edited numerous journals. His contributions to mathematics have earned him awards such as the Chauvenet Prize, the Beckenbach Book Award, and the Kemper Prize.
Content
- Introduction.- The Riemann Mapping Theorem.- The Ahlfors Map.- A Riemann Mapping Theorem for Two-Connected Domains in the Plane.- Riemann Multiply Connected Domains.- Quasiconformal Mappings.- Manifolds.- Riemann Surfaces.- The Uniformization Theorem.- Automorphism Groups.- Ridigity of Holomorphic Mappings and a New Schwarz Lemma at the Boundary.- The Schwarz Lemma and Its Generalizations.- Invariant Distances on Complex Manifolds.- Hyperbolic Manifolds.- The Fatou Theory and Related Matters.- The Theorem of Bun Wong and Rosay.- Smoothness to the Boundary of Biholomorphic Mappings.- Solution ? problem.- Harmonic measure.- Quadrature.- Teichmüller Theory.- Bibliography.- Index.
