On the distribution of mixed Hodge loci

Abstract

Let V be an admissible and graded-polarized integral variation of mixed Hodge structures over a smooth and irreducible complex algebraic variety S. We show that if the typical Hodge locus HL(S,V)typ of V is non-empty, the full Hodge locus HL(S,V) is dense in S for the Zariski topology. In an other direction, we show that if the associated graded variation Gr(V) for the weight filtration has large monodromy and level at least 3 in the sense of Baldi- Klingler-Ullmo, the typical Hodge locus of V is empty, and the full Hodge locus of V is a strict Zariski-closed subset of S, at least if one restricts to its factorwise positive dimensional part, improving a classical result of Brosnan-Pearlstein-Schnell in this situation. These results follow from a detailed study of the transverse part HL(S,V)trans of the Hodge locus of S for V, a subset which contains HL(S,V)typ and whose Zariski-density in S is equivalent, under the Zilber-Pink conjecture for V, to the Zariski-density of HL(S,V)typ. We show that non-emptiness of HL(S,V)trans is equivalent to its Zariski-density in S, we completely classify variations whose transverse Hodge locus HL(S,V)trans is Zariski-dense, and we prove an independent criterion ensuring that HL(S,V)trans is empty.

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