Conditions for Eliminating Cusps in One-Phase Free Boundary Problems with Degeneracy

Abstract

In this paper, we continue the study local minimizers of a degenerate version of the Alt-Caffarelli functional. Specifically, we consider local minimizers of the functional JQ(u, ):= ∫ |∇ u|2 + Q(x)2\u>0\dx where Q(x) = dist(x, )γ for γ>0 and a submanifold of dimension 0 k n-1. Previously, it was shown that on , the free boundary ∂ \u>0\ may be decomposed into a rectifiable set S, which satisfies effective estimates, and a cusp set . In this note, we prove that under mild assumptions, in the case n = 2 and a line, the cusp set does not exist. Building upon the work of Arama and Leoni AramaLeoni12, our results apply to the physical case of a variational formulation of the Stokes' wave and provide a complete characterization of the singular portion of the free boundary in complete generality in this context.