Abstract
For the obstacle problem involving a convex fully nonlinear elliptic operator, we show that the singular set in the free boundary stratifies. The top stratum is locally covered by a C^{1,\alpha} manifold, and the lower strata are covered by C^{1,\log^\varepsilon} manifolds. This recovers some of the recent regularity results due to Colombo–Spolaor–Velichkov (2018) and Figalli–Serra (2019) when the operator is the Laplacian.
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