Hyperkahler SYZ conjecture and semipositive line bundles
classification
🧮 math.AG
keywords
conjectureholomorphiclinemanifoldadmitsadmittingbundlebundles
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Let $M$ be a compact, holomorphic symplectic Kaehler manifold, and $L$ a non-trivial line bundle admitting a metric of semi-positive curvature. We show that some power of $L$ is effective. This result is related to the hyperkaehler SYZ conjecture, which states that such a manifold admits a holomorphic Lagrangian fibration, if $L$ is not big.
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