Convergence of the inverse Monge-Ampere flow and Nadel multiplier ideal sheaves
Abstract
We generalize the inverse Monge-Ampere flow, which was introduced in CHT17, and provide conditions that guarantee the convergence of the flow without a priori assumption that X has a K\"ahler-Einstein metric. We also show that if the underlying manifold does not admit K\"ahler-Einstein metric, then the flow develops Nadel multiplier ideal sheaves. In addition, we establish the linear lower bound for ∈fX, and the theorem of Darvas and He for the inverse Monge-Ampere flow.
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