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Infinitesimal Geometry of Quasiconfo...

Bojarski, Bogdan,

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Infinitesimal Geometry of Quasiconformal and Bi-Lipschitz Mappings in the Plane

紀錄類型:	書目-電子資源 : Monograph/item
正題名/作者:	Infinitesimal Geometry of Quasiconformal and Bi-Lipschitz Mappings in the Plane/ Bogdan Bojarski, Vladimir Gutlyanskii, Olli Martio, Vladimir Ryazanov
作者:	Bojarski, Bogdan,
其他作者:	Gutlyanskii, Vladimir,
出版者:	Zuerich, Switzerland :European Mathematical Society Publishing House, : 2013,
面頁冊數:	1 online resource (214 pages)
標題:	Calculus & mathematical analysis -
電子資源:	https://doi.org/10.4171/122
電子資源:	https://www.ems-ph.org/img/books/bojarski_mini.jpg
ISBN:	9783037196229

Infinitesimal Geometry of Quasiconformal and Bi-Lipschitz Mappings in the Plane
Bojarski, Bogdan,

Infinitesimal Geometry of Quasiconformal and Bi-Lipschitz Mappings in the Plane[electronic resource] /Bogdan Bojarski, Vladimir Gutlyanskii, Olli Martio, Vladimir Ryazanov - Zuerich, Switzerland :European Mathematical Society Publishing House,2013 - 1 online resource (214 pages) - EMS Tracts in Mathematics (ETM)19.

Restricted to subscribers:https://www.ems-ph.org/ebooks.php

This book is intended for researchers interested in new aspects of local behavior of plane mappings and their applications. The presentation is self-contained, but the reader is assumed to know basic complex and real analysis. The study of the local and boundary behavior of quasiconformal and bi-Lipschitz mappings in the plane forms the core of the book. The concept of the infinitesimal space is used to investigate the behavior of a mapping at points without differentiability. This concept, based on compactness properties, is applied to regularity problems of quasiconformal mappings and quasiconformal curves, boundary behavior, weak and asymptotic conformality, local winding properties, variation of quasiconformal mappings, and criteria of univalence. Quasiconformal and bi-Lipschitz mappings are instrumental for understanding elasticity, control theory and tomography and the book also offers a new look at the classical areas such as the boundary regularity of a conformal map. Complicated local behavior is illustrated by many examples. The text offers a detailed development of the background for graduate students and researchers. Starting with the classical methods to study quasiconformal mappings, this treatment advances to the concept of the infinitesimal space and then relates it to other regularity properties of mappings in Part II. The new unexpected connections between quasiconformal and bi-Lipschitz mappings are treated in Part III. There is an extensive bibliography.

ISBN: 9783037196229

Standard No.: 10.4171/122doiSubjects--Topical Terms:

3480907
Calculus & mathematical analysis

Infinitesimal Geometry of Quasiconformal and Bi-Lipschitz Mappings in the Plane
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