Minimal Surfaces [electronic resource]: Part I

By:

Dierkes, Ulrich [Author]

Contributor(s):

Material type: Text

TextSeries: Grundlehren der mathematischen Wissenschaften SerPublication details: New York : Springer Oct. 2010Edition: 2nd edISBN:

9783642116971
3642116973 (Trade Cloth)

DDC classification:

516.362 22

LOC classification:

QA644

Online resources:

Full text available from SpringerLink ebooks - Mathematics and Statistics (2010)

SpringerLink ebooks - Mathematics and Statistics (2010)Summary: Annotation Minimal Surfaces is the first volume of a three volume treatise on minimal surfaces (Grundlehren Nr. 339-341). Each volume can be read and studied independently of the others. The central theme is boundary value problems for minimal surfaces. The treatise is a substantially revised and extended version of the monograph Minimal Surfaces I, II (Grundlehren Nr. 295 & 296). The first volume begins with an exposition of basic ideas of the theory of surfaces in three-dimensional Euclidean space, followed by an introduction of minimal surfaces as stationary points of area, or equivalently, as surfaces of zero mean curvature. The final definition of a minimal surface is that of a non-constant harmonic mapping X: \Omega\to\R^3 which is conformally parametrized on \Omega\subset\R^2 and may have branch points. Thereafter the classical theory of minimal surfaces is surveyed, comprising many examples, a treatment of BjörlingÂ´s initial value problem, reflection principles, a formula of the second variation of area, the theorems of Bernstein, Heinz, Osserman, and Fujimoto. The second part of this volume begins with a survey of PlateauÂ´s problem and of some of its modifications. One of the main features is a new, completely elementary proof of the fact that area A and Dirichlet integral D have the same infimum in the class C(G) of admissible surfaces spanning a prescribed contour G. This leads to a new, simplified solution of the simultaneous problem of minimizing A and D in C(G), as well as to new proofs of the mapping theorems of Riemann and Korn-Lichtenstein, and to a new solution of the simultaneous Douglas problem for A and D where G consists of several closed components. Then basic facts of stable minimal surfaces are derived; this is done in the context of stable H-surfaces (i.e. of stable surfaces of prescribed mean curvature H), especially of cmc-surfaces (H = const), and leads to curvature estimates for stable, immersed cmc-surfaces and to NitscheÂ´s uniqueness theorem and TomiÂ´s finiteness result. In addition, a theory of unstable solutions of PlateauÂ´s problems is developed which is based on CourantÂ´s mountain pass lemma. Furthermore, DirichletÂ´s problem for nonparametric H-surfaces is solved, using the solution of PlateauÂ´s problem for H-surfaces and the pertinent estimates.

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Previous	516.36 TOT Finite Möbius groups, minimal immersions of spheres, and moduli /	516.36 UME Differential geometry of curves and surfaces with singularities /	516.3/62 Convex surfaces /	516.362 Minimal Surfaces	516.362 Vanishing and finiteness results in geometric analysis	516.362 NIC Lectures On The Geometry Of Manifolds /	516.373 Families of conformally covariant differential operators, Q-curvature and holography	Next

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Annotation Minimal Surfaces is the first volume of a three volume treatise on minimal surfaces (Grundlehren Nr. 339-341). Each volume can be read and studied independently of the others. The central theme is boundary value problems for minimal surfaces. The treatise is a substantially revised and extended version of the monograph Minimal Surfaces I, II (Grundlehren Nr. 295 & 296). The first volume begins with an exposition of basic ideas of the theory of surfaces in three-dimensional Euclidean space, followed by an introduction of minimal surfaces as stationary points of area, or equivalently, as surfaces of zero mean curvature. The final definition of a minimal surface is that of a non-constant harmonic mapping X: \Omega\to\R^3 which is conformally parametrized on \Omega\subset\R^2 and may have branch points. Thereafter the classical theory of minimal surfaces is surveyed, comprising many examples, a treatment of BjörlingÂ´s initial value problem, reflection principles, a formula of the second variation of area, the theorems of Bernstein, Heinz, Osserman, and Fujimoto. The second part of this volume begins with a survey of PlateauÂ´s problem and of some of its modifications. One of the main features is a new, completely elementary proof of the fact that area A and Dirichlet integral D have the same infimum in the class C(G) of admissible surfaces spanning a prescribed contour G. This leads to a new, simplified solution of the simultaneous problem of minimizing A and D in C(G), as well as to new proofs of the mapping theorems of Riemann and Korn-Lichtenstein, and to a new solution of the simultaneous Douglas problem for A and D where G consists of several closed components. Then basic facts of stable minimal surfaces are derived; this is done in the context of stable H-surfaces (i.e. of stable surfaces of prescribed mean curvature H), especially of cmc-surfaces (H = const), and leads to curvature estimates for stable, immersed cmc-surfaces and to NitscheÂ´s uniqueness theorem and TomiÂ´s finiteness result. In addition, a theory of unstable solutions of PlateauÂ´s problems is developed which is based on CourantÂ´s mountain pass lemma. Furthermore, DirichletÂ´s problem for nonparametric H-surfaces is solved, using the solution of PlateauÂ´s problem for H-surfaces and the pertinent estimates.

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