Sharp regularity for degenerate obstacle type problems: a geometric approach (1911.00542v4)

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|^\gamma F(x, D^2u) = f(x)\chi_{{u>\phi}} \textrm{ in } B_1 ] with $\gamma>0$, $\phi \in C^{1, \alpha}(B_1)$ for some $\alpha\in(0,1]$ and $f\in L^\infty(B_1)$ constrained to satisfy [ u\geq \phi\textrm{ in } B_1 ] and prove that they are $C^{1,\beta}(B_{1/2})$ (and in particular along free boundary points) where $\beta=\min\left{\alpha, \frac{1}{\gamma+1}\right}$. 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 $\partial{u>\phi}$ has zero Lebesgue measure. Our results are new even for seemingly simple model as follows [ |Du|^\gamma \Delta u=\chi_{{u>\phi}} \quad \text{with}\quad \gamma>0. ]