The complex Monge-Ampere equation and an application to uniformisation of surfaces
Abstract
We prove that a complete noncompact K\"ahler surface with positive and bounded sectional curvature is biholomorphic to C2. This result confirms a special case of Yau's conjecture that a complete noncompact K\"ahler n-manifold with positive holomorphic bisectional curvature is biholomorphic to Cn. In contrast to all known results on Yau's conjecture, we do not need additional assumptions on the global/asymptotic geometry of the K\"ahler surface apart from completeness. Towards this end, we prove that the integral of the square of the Ricci form of a complete K\"ahler surface with positive sectional curvature is finite. The work of Chen and Zhu shows that this latter result implies that the surface is biholomorphic to C2 . The main new idea is the construction of a Lipschitz continuous plurisubharmonic weight function with finite Monge-Amp\`ere mass. This weight function is obtained by solving a complex Monge-Amp\`ere equation.
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