978-81-7319-807-6 Publication Year: 2007
Pages: 362 Binding: Hard Back
About the book
Quasiconformal Mappings and their Applications covers conformal invariance and conformally invariant metrics, hyperbolic-type metrics and hyperbolic geodesics, isometries of relative metrics, uniform spaces and Gromov hyperbolicity, quasiregular mappings and quasiconformal mappings in n-space, universal Teichmüller space and related topics, quasiminimizers and potential theory and numerical conformal mapping and circle packings.
Preface / A Note on a Minimum Area Problem for Non-Vanishing Functions / The Hyperbolic Metric and Geometric Function Theory / Isometries of Relative Metrics / Uniform Spaces and Gromov Hyperbolicity /
p-Laplace Operator, Quasiregular Mappings, and Picard-Type Theorems / Hyperbolic-Type Metrics / Geometric Properties of Hyperbolic Geodesics / Quasiminimizers and Potential Theory / History and Recent Developments in Techniques for Numerical Conformal Mapping / Introduction to Quasiconformal Mappings in n-space / The Universal Teichmüller Space and Related Topics / Metrics and Quasiregular Mappings / Circle Packing, Quasiconformal Mappings, and Applications / List of Participants.