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arxiv 1612.08691 v1 pith:OC2K6LQK submitted 2016-12-27 math.DG math.AP

Free boundary minimal surfaces of unbounded genus

classification math.DG math.AP
keywords boundaryfreeminimalsurfacesgenussigmaconstructfraser-schoen
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For each integer $g\geq 1$ we use variational methods to construct in the unit $3$-ball $B$ a free boundary minimal surface $\Sigma_g$ of symmetry group $\mathbb{D}_{g+1}$. For $g$ large, $\Sigma_g$ has three boundary components and genus $g$. As $g\rightarrow\infty$ the surfaces $\Sigma_g$ converge as varifolds to the union of the disk and critical catenoid. These examples are the first with genus greater than $1$ and were conjectured to exist by Fraser-Schoen. We also construct several new free boundary minimal surfaces in $B$ with the symmetry groups of the cube, tetrahedron and dodecahedron. Finally, we prove that free boundary minimal surfaces isotopic to those of Fraser-Schoen can be constructed variationally using an equivariant min-max procedure. We also prove an $\epsilon$-regularity theorem for free boundary minimal surfaces in $B$.

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Cited by 2 Pith papers

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  1. Embedded minimal $S^1$-bundles in $\mathbb{S}^4$

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    Constructs infinitely many embedded minimal S^1-bundles in S^4 of distinct topological types, including minimal embeddings of S^1 times odd-genus surfaces, via equivariant min-max theory and suspended weighted Hopf action.

  2. Minimal surfaces with closed curvature lines

    math.DG 2026-05 unverdicted novelty 4.0

    No complete non-orientable minimal surfaces of finite total curvature in R^3 with one end foliated by closed curvature lines exist.