Locally Removable Singularities for K\"ahler Metrics with Constant Holomorphic Sectional Curvature
Abstract
Let n 2 be an integer, and Bn⊂ Cn the unit ball. Let K⊂ Bn be a compact subset such that Bn K is connected, or K=\z=(z1,·s, zn)|z1=z2=0\⊂ Cn. By the theory of developing maps, we prove that a K\"ahler metric on Bn K with constant holomorphic sectional curvature uniquely extends to Bn.
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