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Analytic extensions of constant mean curvature one geometric catenoids in de Sitter 3-space

We show that a certain simply-stated notion of "analytic completeness" of the image of a real analytic map implies the map admits no analytic extension. We also give a useful criterion for that notion of analytic completeness by defining arc-properness of continuous maps, which can be considered as a very weak version of properness. As an application, we judge the analytic completeness of a certain class of constant mean curvature surfaces (the so-called "G-catenoids") or their analytic extensions in the de Sitter 3-space.

preprint2022arXivOpen access
Shoichi FujimoriYu KawakamiMasatoshi KokubuWayne RossmanMasaaki UmeharaKotaro YamadaSeong-Deog Yang
math.DG
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Open access7 authors1 topic
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Shoichi FujimoriYu KawakamiMasatoshi KokubuWayne RossmanMasaaki UmeharaKotaro YamadaSeong-Deog Yang

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