Polarized Hodge Structures for Clemens Manifolds
Abstract
Let X be a Calabi-Yau threefold. A conifold transition first contracts X along disjoint rational curves with normal bundles of type (-1,-1), and then smooth the resulting singular complex space X to a new compact complex manifold Y. Such Y is called a Clemens manifold and can be non-K\"ahler. We prove that any small smoothing Y of X satisfies ∂∂-lemma. We also show that the resulting pure Hodge structure of weight three on H3(Y) is polarized by the cup product. These results answer some questions of R. Friedman.
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