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.
* A collection of independent survey articles in the field of
GeometricFunction Theory
* Existence theorems and qualitative properties of conformal and
quasiconformal mappings
* A bibliography, including many hints to applications in
electrostatics, heat conduction, potential flows (in the plane)
"A thoroughly written author index as well as a subject index simplifies the research for the reader. A well-written book". Rudolf Rupp - Zeitschrift Fuer Angewandte Mathematik Und Mechanik, 2005.
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