Examples of compact embedded mean convex λ-hypersurfaces
Abstract
There is a well-known conjecture asserts that the round sphere should be the only compact embedded self-shrinker (i.e. 0-hypersurface) which is diffeomorphic to a sphere. S. Brendle confirmed the conjecture for 2-dimensional 0-hypersurfaces. For any dimensional λ-hypersurfaces, if λ<0, we constructed compact convex embedded λ-hypersurface which is diffeomorphic to a sphere and is not a round sphere. In this paper, for λ>0, we construct a compact mean convex embedded λ-hypersurface which is diffeomorphic to a sphere and is not a round sphere. In fact, for λ>0, there are no compact convex embedded λ-hypersurfaces which are diffeomorphic to spheres except a round sphere.
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