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In this work, we establish universal moduli of continuity for viscosity solutions to fully nonlinear elliptic equations with oblique boundary conditions, whose general model is given by \ array{rcl F (D²u, x) &=& f (x) in \, \, \\ (x) Du (x) + (x) \, u (x) &=& g (x) on \, \,. array. Such regularity estimates are achieved by exploring the integrability properties of f based on different scenarios, making a VMO assumption on the coefficients of F, and by considering suitable smoothness properties on the boundary data, and g. Particularly, we derive sharp estimates for borderline cases where f Lⁿ () and f p-BMO (). Additionally, for source terms in Lᵖ (), for p (n, ), we obtain sharp gradient estimates. Finally, we also address Schauder-type estimates for convex/concave operators and suitable H\"older data.
Bessa et al. (Tue,) studied this question.
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