Approximation, complex analysis, and potential theory
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Bibliographic Information
Approximation, complex analysis, and potential theory
(NATO science series, Sub-series II,
Kluwer Academic Publishers, c2001
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Library, Research Institute for Mathematical Sciences, Kyoto University数研
C-P(*)||NATO S-II||3701051434
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National Institutes of Natural Sciences Okazaki Library and Information Center図
421.5/Ap9108303621
Note
"Proceedings of the NATO Advanced Study Institute on Modern Methods in Scientific Computing and Applications, Montréal, Québec, Canada, 3 to 14 July, 2000" -- T.p. verso
Includes bibliographical references and index
Description and Table of Contents
Description
Hermann Weyl considered value distribution theory to be the greatest mathematical achievement of the first half of the 20th century. The present lectures show that this beautiful theory is still growing. An important tool is complex approximation and some of the lectures are devoted to this topic. Harmonic approximation started to flourish astonishingly rapidly towards the end of the 20th century, and the latest development, including approximation manifolds, are presented here.
Since de Branges confirmed the Bieberbach conjecture, the primary problem in geometric function theory is to find the precise value of the Bloch constant. After more than half a century without progress, a breakthrough was recently achieved and is presented. Other topics are also presented, including Jensen measures.
A valuable introduction to currently active areas of complex analysis and potential theory. Can be read with profit by both students of analysis and research mathematicians.
Table of Contents
- Preface. Key to group picture. Participants. Contributors. Approximation and value distribution
- N. Arakelian. Uniform and tangential harmonic approximation
- D.H. Armitage. Sobolev spaces and approximation problems for differential operators
- T. Bagby, N. Castaneda. Holomorphic and harmonic approximation on Riemann surfaces
- A. Boivin, P.M. Gauthier. On the Bloch constant
- H. Chen. Approximation of subharmonic functions with applications
- D. Drasin. Harmonic approximation and its applications
- S.J. Gardiner. Jensen measures
- T.J. Ransford. Simultaneous approximation in function spaces
- A. Stray. Index.
by "Nielsen BookData"