Buch, Englisch, 548 Seiten, Format (B × H): 173 mm x 244 mm, Gewicht: 1134 g
Buch, Englisch, 548 Seiten, Format (B × H): 173 mm x 244 mm, Gewicht: 1134 g
ISBN: 978-0-444-82845-3
Verlag: Elsevier Science
Geometric Function Theory is a central part of Complex Analysis (one complex variable). The Handbook of Complex Analysis - Geometric Function Theory deals with this field and its many ramifications and relations to other areas of mathematics and physics. The theory of conformal and quasiconformal mappings plays a central role in this Handbook, for example a priori-estimates for these mappings which arise from solving extremal problems, and constructive methods are considered. As a new field the theory of circle packings which goes back to P. Koebe is included. The Handbook should be useful for experts as well as for mathematicians working in other areas, as well as for physicists and engineers.
Zielgruppe
Institutes of mathematics (and computer sciences). Institutes of physics and engineering.
Autoren/Hrsg.
Fachgebiete
- Mathematik | Informatik Mathematik Mathematische Analysis Funktionalanalysis
- Mathematik | Informatik Mathematik Mathematische Analysis Harmonische Analysis, Fourier-Mathematik
- Mathematik | Informatik Mathematik Mathematische Analysis Funktionentheorie, Komplexe Analysis
- Mathematik | Informatik EDV | Informatik Informatik Logik, formale Sprachen, Automaten
Weitere Infos & Material
Preface.
List of Contributors.
Univalent and multivalent functions (W.K. Hayman).
Conformal maps at the boundary (Ch. Pommerenke).
Extremal quasiconformal mapings of the disk (E. Reich).
Conformal welding (D.H. Hamilton).
Siegel disks and geometric function theory in the work of Yoccoz (D.H. Hamilton).
Sufficient confidents for univalence and quasiconformal extendibility of analytic functions (L.A. Aksent'ev, P.L. Shabalin).
Bounded univalent functions (D.V. Prokhorov).
The *-function in complex analysis (A. Baernstein II).
Logarithmic geometry, exponentiation, and coefficient bounds in the theory of univalent functions and nonoverlapping domains (A.Z. Grinshpan).
Circle packing and discrete analytic function theory (K. Stephenson).
Extreme points and support points (T.H. MacGregory, D.R. Wilken).
The method of the extremal metric (J.A. Jenkins).
Universal Teichmüller space (F.P. Gardiner, W.J. Harvey).
Application of conformal and quasiconformal mappings and their properties in approximation theory (V.V. Andrievskii).
Author Index.
Subject Index.
