CONFORMAL ASYMPTOTICS OF PROPERLY EMBEDDED ANNULAR CMC ENDS

Dorfmeister shows that, after a coordinate transformation about the end, the approximation by a Delaunay surface is also strongly exponential in conformal coordinates. This result opens the door for the investigation of the DPW-data of arbitrary properly embedded annular constant mean curvature (CMC...

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Bibliographic Details
Published inPacific journal of applied mathematics Vol. 3; no. 1/2; p. 3
Main Author Dorfmeister, Josef
Format Journal Article
LanguageEnglish
Published Hauppauge Nova Science Publishers, Inc 01.01.2011
Subjects
Annular
Approximation
Asymptotic properties
Constants
Coordinate transformations
Curvature
Differential equations
Doors
Geometry
Mathematical analysis
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ISSN1941-3963

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Summary:Dorfmeister shows that, after a coordinate transformation about the end, the approximation by a Delaunay surface is also strongly exponential in conformal coordinates. This result opens the door for the investigation of the DPW-data of arbitrary properly embedded annular constant mean curvature (CMC) ends and for the investigation of arbitrary CMC-k-noids with embedded ends (of arbitrary genus).
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ISSN:1941-3963