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Cmc Doublings of Minimal Surfaces via Min-Max

Published 2 Oct 2020 in math.DG | (2010.01094v1)

Abstract: Let $\Sigma2 \subset M3$ be a minimal surface of index 0 or 1. Assume that a neighborhood of $\Sigma$ can be foliated by constant mean curvature (cmc) hypersurfaces. We use min-max theory and the catenoid estimate to construct $\varepsilon$-cmc doublings of $\Sigma$ for small $\varepsilon > 0$. Such cmc doublings were previously constructed for minimal hypersurfaces $\Sigman \subset M{n+1}$ with $n+1\ge 4$ by Pacard and Sun using gluing methods.

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