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Answer to a question by Fujita on Variation of Hodge Structures

We first provide details for the proof of Fujita's second theorem for Kähler fibre spaces over a curve, asserting that the direct image $V$ of the relative dualizing sheaf splits as the direct sum $ V = A \oplus Q$, where $A$ is ample and $Q$ is unitary flat. Our main result then answers in the negative the question posed by Fujita whether $V$ is semiample. In fact, $V$ is semiample if and only if $Q$ is associated to a representation of the fundamental group of $B$ having finite image. Our examples are based on hypergeometric integrals.

preprint2013arXivOpen access
Fabrizio CataneseMichael Dettweiler
math.CVmath.AG
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Fabrizio CataneseMichael Dettweiler

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