Kähler-Ricci Flow: from divisors to cusps
Abstract
We study the geometric regularization of positive closed currents by the Kähler-Ricci flow on compact Kähler manifolds. In a previous work of ours, it was shown that the Kähler-Ricci flow immediately smoothes out such a current when it has zero Lelong numbers. We study here the case when T0 has divisorial singularities, showing that the flow gradually replaces the latter by Poincaré type ones, providing an approximation of T0 by complete Kähler metrics with bounded curvature in a Zariski open set.
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