Interior and exterior boundary value problems for the degenerate Monge-Ampère operator (Q1174492)

This paper deals with interior (exterior) Dirichlet and Neumann boundary value problems for the real Monge-Ampère equation: \[ \text{det } u_{x_i x_j}= f(|x|) g(|Du|)\quad \text{in} \quad B_i\;(\text{or } B_e),\tag{1} \] where \(B_i= \{x\in \mathbb{R}^n; |x|< R\}\), \(B_e= \{x\in \mathbb{R}^n; |x|> R\}\), \(f\geq 0\), \(g(|p|)\geq 0\). We propose complete results for existence, uniqueness and regularity of classical convex solutions of the Monge-Ampère operator with constant data in a ball \((B_i, B_e)\). In this case each classical solution turns out to be a radially symmetric one.