The uniqueness of Poincar\'e type extremal K\"ahler metric

Abstract

Let D be a smooth divisor on a closed K\"ahler manifold X. Suppose that Aut0(D)=\Id\. We prove that the Poincar\'e type extremal K\"ahler metric with a cusp singularity at D is unique up to a holomorphic transformation on X that preserves D. This generalizes Berman-Berndtson's work on the uniqueness of extremal K\"ahler metrics from closed manifolds to some complete and noncompact manifolds.

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