English

$C^{1+\alpha}$-Regularity for Two-Dimensional Almost-Minimal Sets in $\R^n$

Classical Analysis and ODEs 2008-12-18 v1

Abstract

We give a new proof and a partial generalization of Jean Taylor's result [Ta] that says that Almgren almost-minimal sets of dimension 2 in R3\R^3 are locally C1+αC^{1+\alpha}-equivalent to minimal cones. The proof is rather elementary, but uses a local separation result proved in [D3] and an extension of Reifenberg's parameterization theorem [DDT]. The key idea is still that if XX is the cone over an arc of small Lipschitz graph in the unit sphere, but XX is not contained in a disk, we can use the graph of a harmonic function to deform XX and diminish substantially its area. The local separation result is used to reduce to unions of cones over arcs of Lipschitz graphs. A good part of the proof extends to minimal sets of dimension 2 in Rn\R^n, but in this setting our final regularity result on EE may depend on the list of minimal cones obtained as blow-up limits of EE at a point.

Keywords

Cite

@article{arxiv.0806.2080,
  title  = {$C^{1+\alpha}$-Regularity for Two-Dimensional Almost-Minimal Sets in $\R^n$},
  author = {Guy David},
  journal= {arXiv preprint arXiv:0806.2080},
  year   = {2008}
}

Comments

115 pages, 4 figures

R2 v1 2026-06-21T10:49:58.784Z