Global Calder\'on-Zygmund estimates for asymptotically convex fully nonlinear Grad-Mercier type equations

Abstract

In this paper, we consider the following Dirichlet problem for the fully nonlinear elliptic equation of Grad-Mercier type under asymptotic convexity conditions equation* \ arrayll F(D2u(x),Du(x),u(x),x)=g(|\y∈ :u(y) u(x)\|)+f(x) & in , u= &on ∂ . array . equation* In order to overcome the non-convexity of the operator F and the nonlocality of the nonhomogeneous term g, we apply the compactness methods and frozen technique to prove the existence of the W2,p-viscosity solutions and the global W2,p estimate. As an application, we derive a Cordes-Nirenberg type continuous estimate up to boundary. Furthermore, we establish a global BMO estimate for the second derivatives of solutions by using an asymptotic approach, thereby refining the borderline case of Calder\'on-Zygmund estimates.