On the fields of definition of Hodge loci

Abstract

A polarizable variation of Hodge structure over a smooth complex quasi projective variety S is said to be defined over a number field L if S and the algebraic connection associated to the variation are both defined over L. Conjecturally any special subvariety (also called "an irreducible component of the Hodge locus) for such variations is defined over Q, and its Galois conjugates are also special subvarieties. We prove this conjecture for special subvarieties satisfying a simple monodromy condition. As a corollary we reduce the conjecture that special subvarieties for variation of Hodge structures defined over a number field are defined over Q to the case of special points.