Infinity-harmonic functions in the plane: Regularity by injectivity

Abstract

It has been a long standing conjecture that the ∞ -harmonic functions in the plane have a 1/3-Hölder continuous gradient. It is known that solutions are C1 and that the gradient is locally α-Hölder, but α comes without any positive lower bound. Aronsson's solution x4/3 - y4/3 shows that no better general regularity is possible. In the plane there is also a connection between the ∞ -Laplace equation and the one-dimensional heat equation, observed already by Aronsson himself. I shall show that this link can be accessed under a certain injectivity condition on the gradient, and that the caloric structure then is enough to prove the 1/3-Hölder continuity. Of course, an injective gradient is by no means a necessary condition, as seen by smooth solutions such as the planes and cones.