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A Hopf theorem for non-constant mean curvature and a conjecture of A.D. Alexandrov

We prove a uniqueness theorem for immersed spheres of prescribed (non-constant) mean curvature in homogeneous three-manifolds. In particular, this uniqueness theorem proves a conjecture by A.D. Alexandrov about immersed spheres of prescribed Weingarten curvature in R3 for the special but important case of prescribed mean curvature. As a consequence, we extend the classical Hopf uniqueness theorem for constant mean curvature spheres to the case of immersed spheres of prescribed antipodally symmetric mean curvature in R3.

preprint2015arXivOpen access
Jose A. GalvezPablo Mira
math.DG
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Jose A. GalvezPablo Mira

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