A geometric proof of regularity of all anisotropic minimal surfaces in R2

Abstract

A set of locally finite perimeter E ⊂ Rn is called an anisotropic minimal surface in an open set A if (E;A) (F;A) for some surface energy (E;A) = ∫∂*E A \| E\| d Hn-1 and all sets of locally finite perimeter F such that E F ⊂ ⊂ A. In this short note we provide the details of a geometric proof verifying that all anisotropic surface minimizers in R2 whose corresponding integrand \| · \| is strictly convex are locally disjoint unions of line segments. This demonstrates that, in the plane, strict convexity of \| · \| is both necessary and sufficient for regularity. The corresponding Bernstein theorem is also proven: global anisotropic minimizers E ⊂ R2 are half-spaces.