Delaunay ends of constant mean curvature surfaces

M. Kilian; W. Rossman; N. Schmitt

doi:10.1112/S0010437X07003119

Delaunay ends of constant mean curvature surfaces

M. Kilian
, W. Rossman
, N. Schmitt

Research output: Contribution to journal › Article › peer-review

Abstract

The generalized Weierstrass representation is used to analyze the asymptotic behavior of a constant mean curvature surface that arises locally from an ordinary differential equation(ODE) with a regular singularity. We prove that a holomorphic perturbation of an ODE that represents a Delaunay surface generates a constant mean curvature surface which has a properly immersed end that is asymptotically Delaunay. Furthermore, that end is embedded if the Delaunay surface is unduloidal.

Original language	English
Pages (from-to)	186-220
Number of pages	35
Journal	Compositio Mathematica
Volume	144
Issue number	1
DOIs	https://doi.org/10.1112/S0010437X07003119
Publication status	Published - Jan 2008
Externally published	Yes

Keywords

Asymptotics
Constant mean curvature surface
Delaunay surface
Generalized Weierstrass representation

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10.1112/S0010437X07003119

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AB - The generalized Weierstrass representation is used to analyze the asymptotic behavior of a constant mean curvature surface that arises locally from an ordinary differential equation(ODE) with a regular singularity. We prove that a holomorphic perturbation of an ODE that represents a Delaunay surface generates a constant mean curvature surface which has a properly immersed end that is asymptotically Delaunay. Furthermore, that end is embedded if the Delaunay surface is unduloidal.

KW - Asymptotics

KW - Constant mean curvature surface

KW - Delaunay surface

KW - Generalized Weierstrass representation

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Delaunay ends of constant mean curvature surfaces

Abstract

Keywords

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