On the Locus of Hodge Classes
Abstract
Let f: X → S be a family of non singular projective varieties parametrized by a complex algebraic variety S. Fix s ∈ S, an integer p, and a class h ∈ H2p(Xs,) of Hodge type (p,p). We show that the locus, on S, where h remains of type (p,p) is algebraic. This result, which in the geometric case would follow from the rational Hodge conjecture, is obtained in the setting of variations of Hodge structures.
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