Finite distance problem on the moduli of non-K\"ahler Calabi--Yau ∂∂-threefolds
Abstract
In this article, we study the finite distance problem with respect to the period-map metric on the moduli of non-K\"ahler Calabi--Yau ∂∂-threefolds via Hodge theory. We extended C.-L. Wang's finite distance criterion for one-parameter degenerations to the present setting. As a byproduct, we also obtained a sufficient condition for a non-K\"ahler Calabi--Yau to support the ∂∂-lemma which generalizes the results by Friedman and Li. We also proved that the non-K\"ahler Calabi--Yau threefolds constructed by Hashimoto and Sano support the ∂∂-lemma.
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