Sharp regularity for degenerate obstacle type problems: a geometric approach

Abstract

We prove sharp regularity estimates for solutions of obstacle type problems driven by a class of degenerate fully nonlinear operators; more specifically, we consider viscosity solutions of \[ |D u|γ F(x, D2u) = f(x)\u>φ\ in B1 \] with γ>0, φ ∈ C1, α(B1) for some α∈(0,1] and f∈ L∞(B1) constrained to satisfy \[ u≥ φ in B1 \] and prove that they are C1,β(B1/2) (and in particular along free boundary points) where β=\α, 1γ+1\. Moreover, we achieve such a feature by using a recently developed geometric approach which is a novelty for these kind of free boundary problems. Further, under a natural non-degeneracy assumption on the obstacle, we prove that the free boundary ∂\u>φ\ has zero Lebesgue measure. Our results are new even for seemingly simple model as follows \[ |Du|γ u=\u>φ\ with γ>0. \]