Asymptotics and convergence for the complex Monge-Ampere equation
Abstract
We study the asymptotics of complete Kaehler-Einstein metrics on strictly pseudoconvex domains in Cn and derive a convergence theorem for solutions to the corresponding Monge-Ampere equation. If only a portion of the boundary is analytic, the solutions satisfy Gevrey type estimates for tangential derivatives. A counterexample for the model linearized equation suggests that there is no local convergence theorem for the complex Monge-Ampere equation
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