|
The purpose of this book is to present a modern account of mapping theory with emphasis on quasiconformal mapping and its generalizations. The modulus method was initiated by Arne Beurling and Lars Ahlfors to study conformal mappings, and later this method was extended and enhanced by several others. The techniques are geometric and they have turned out to be an indispensable tool in the study of quasiconformal and quasiregular mappings as well as their generalizations. The book is based on recent research papers and extends the modulus method beyond the classical applications of the modulus techniques presented in many monographs.
Nonlinear System Techniques and Applications Автор: Julius S. Bendat Год: 1998 |
Fast multipole boundary element method: Theory and applications in engineering Автор: Liu Y. Год: 2009 |
A Primer for the Monte Carlo Method Автор: Ilya M. Sobol Год: 1994 |
Solving frontier problems of physics: the decomposition method Автор: G. Adomian Год: 1993 |
Two-point boundary value problems: Lower and upper solutions Автор: C. De Coster Год: 2006 |
Finite Element Method Автор: O. C. Zienkiewicz Год: 2000 |