Second order estimates for a free boundary phase transition

Abstract

It is well known that minimizers of the Allen-Cahn-type functional \[ Jε(u):=∫ε|∇ u|22+W(u)ε, \] where W is a double-well potential, resemble minimal surfaces in the sense that their level sets converge to a minimal surface as ε→ 0. In this work, we consider the indicator potential W(τ)=(-1,1)(τ), which leads to the Bernoulli-type free-boundary problem \[ \ alignedat2 u&=0&&in\|u|<1\\\ |∇ u|&=ε-1&&on∂ \|u|<1\. alignedat . \] We provide a short proof that the transition layers are uniformly C2,α regular, up to the free boundary. In addition to the uniform C2,α estimate, we also obtain improved Cα mean curvature bound that decays in an algebraic rate of ε, which confirms the convergence of interfaces to the minimal surface in a very strong sense. We present a simple elliptic equation \[ φ=H2-|A|2 \] where φ=(1/|∇ u|) is the log-gradient of u, H and A are the mean curvature and the second fundamental form of level surfaces, respectively. From this, the uniform estimates readily follow. The whole argument is performed in a general Riemannian manifold setting.