Kichoon Yang

(Author)

Complete Minimal Surfaces of Finite Total CurvaturePaperback, 5 December 2010

Complete Minimal Surfaces of Finite Total Curvature
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Part of Series
Mathematics and Its Applications
Part of Series
Mathematics and Its Applications (Closed)
Print Length
160 pages
Language
English
Publisher
Springer
Date Published
5 Dec 2010
ISBN-10
9048144434
ISBN-13
9789048144433

Description

This monograph contains an exposition of the theory of minimal surfaces in Euclidean space, with an emphasis on complete minimal surfaces of finite total curvature. Our exposition is based upon the philosophy that the study of finite total curvature complete minimal surfaces in R3, in large measure, coincides with the study of meromorphic functions and linear series on compact Riemann sur- faces. This philosophy is first indicated in the fundamental theorem of Chern and Osserman: A complete minimal surface M immersed in R3 is of finite total curvature if and only if M with its induced conformal structure is conformally equivalent to a compact Riemann surface Mg punctured at a finite set E of points and the tangential Gauss map extends to a holomorphic map Mg _ P2. Thus a finite total curvature complete minimal surface in R3 gives rise to a plane algebraic curve. Let Mg denote a fixed but otherwise arbitrary compact Riemann surface of genus g. A positive integer r is called a puncture number for Mg if Mg can be conformally immersed into R3 as a complete finite total curvature minimal surface with exactly r punctures; the set of all puncture numbers for Mg is denoted by P (M ). For example, Jorge and Meeks [JM] showed, by constructing an example g for each r, that every positive integer r is a puncture number for the Riemann surface pl.

Product Details

Author:
Kichoon Yang
Book Format:
Paperback
Country of Origin:
NL
Date Published:
5 December 2010
Dimensions:
23.39 x 15.6 x 0.91 cm
ISBN-10:
9048144434
ISBN-13:
9789048144433
Language:
English
Location:
Dordrecht
Pages:
160
Publisher:
Weight:
244.94 gm

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