The streamlines of ∞-harmonic functions obey the inverse mean curvature flow

Abstract

Given an ∞-harmonic function u∞ on a domain ⊂eq R2, consider the function w = - |∇ u∞|. If u∞ ∈ C2() with ∇ u∞ ≠ 0 and ∇ |∇ u∞| ≠ 0, then it is easy to check that (1) the streamlines of u∞ are the level sets of w and (2) w solves the level set formulation of the inverse mean curvature flow. For less regular solutions, neither statement is true in general, but even so, w is still a weak solution of the inverse mean curvature flow under far weaker assumptions. This is proved through an approximation of u∞ by p-harmonic functions, the use of conjugate p'-harmonic functions, and the known connection of the latter with the inverse mean curvature flow. A statement about the regularity of |∇ u∞| arises as a by-product.