If X is a smooth projective complex threefold, the Hodge conjecture holds for degree 4 rational Hodge classes on X. Kollar gave examples where it does not hold for integral Hodge classes of degree 4, that is integral Hodge classes need not be classes of algebraic 1-cycles with integral coefficients. We show however that the Hodge conjecture holds for integral Hodge classes of degree 4 on a uniruled or a Calabi-Yau threefold.
Calabi-Yau threefolds with Picard number three
Abel-Jacobi map, integral Hodge classes and decomposition of the diagonal
Abel-Jacobi map, integral Hodge classes and decomposition of the diagonal
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