The uniqueness of Poincar\'e type constant scalar curvature K\"ahler metric
Abstract
Let D be a smooth divisor on a closed K\"ahler manifold X. First, we prove that Poincar\'e type constant scalar curvature K\"ahler (cscK) metric with a singularity at D is unique up to a holomorphic transformation on X that preserves D, if there are no nontrivial holomorphic vector fields on D. For the general case, we propose a conjecture relating the uniqueness of Poincar\'e type cscK metric to its asymptotic behavior near D. We give an affirmative answer to this conjecture for those Poincar\'e type cscK metrics whose asymptotic behavior is invariant under any holomorphic transformation of X that preserve D. We also show that this conjecture can be reduced to a fixed point problem.
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