Global \(C^{1,\alpha}\) regularity for Monge-Ampère equation and convex envelope (Q2123133)

Consider the Monge-Ampère with a boundary data given by \begin{align*} \text{det} \ D^2 u &= f \ \text{in} \ \Omega \\ u &= \phi \ \text{on} \ \partial \Omega, \end{align*} where \(\Omega \subset \mathbb{R}^N \) is a bounded and convex domain and \(f\) is a nonnegative measurable function. Under certain conditions on \(f\), and regularity and geometrical assumptions on \(\partial \Omega\) and the function \(\phi\), an optimal \(C^{1,\alpha}\) estimate up to the boundary is obtained for the solutions of the above problem and the concave envelope.