-Galois special subvarieties and the Mumford-Tate conjecture

Abstract

We introduce -Galois special subvarieties as an -adic analog of the Hodge-theoretic notion of a special subvariety. The Mumford-Tate conjecture predicts that both notions are equivalent. We study some properties of these subvarieties and prove this equivalence for subvarieties satisfying a simple monodromy condition. As applications, we show that the -Galois exceptional locus is a countable union of algebraic subvarieties and, if the derived group of the generic Mumford-Tate group of a family is simple, its part of positive period dimension coincides with the Hodge locus of positive period dimension. We use this to prove that for n and d sufficiently large, the absolute Mumford-Tate conjecture in degree n holds on a dense open subset of the moduli space of smooth projective hypersurfaces of degree d in Pn+1, with the exception of hypersurfaces defined over number fields. Finally, we show that the Mumford-Tate conjecture for abelian varieties is equivalent to a conjecture about the local structure of -Galois special subvarieties in Ag.

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