Regularity of Lipschitz free boundaries for weak solutions of Alt-Caffarelli type problems

Abstract

Motivated by the Serrin problem, we study weak solutions of the generalised Alt-Caffarelli problem - u = f in , u = 0 on ∂, ∂ u = Q on ∂. Our main result establishes that if is Lipschitz, then it is actually C∞ (provided that f and Q are smooth). This was known before only for viscosity solutions. As a corollary, we obtain an alternative solution of Serrin's problem in the case of Lipschitz domains. We also discuss the characterisation of the regularity of Lipschitz domains in terms of their Poisson kernel.