Tame topology of arithmetic quotients and algebraicity of Hodge loci

Abstract

In this paper we prove the following results: 1) We show that any arithmetic quotient of a homogeneous space admits a natural real semi-algebraic structure for which its Hecke correspondences are semi-algebraic. A particularly important example is given by Hodge varieties, which parametrize pure polarized integral Hodge structures. 2) We prove that the period map associated to any pure polarized variation of integral Hodge structures V on a smooth complex quasi-projective variety S is definable with respect to an o-minimal structure on the relevant Hodge variety induced by the above semi-algebraic structure. 3) As a corollary of 2) and of Peterzil-Starchenko's o-minimal Chow theorem we recover that the Hodge locus of (S, V) is a countable union of algebraic subvarieties of S, a result originally due to Cattani-Deligne-Kaplan. Our approach simplifies the proof of Cattani-Deligne-Kaplan, as it does not use the full power of the difficult multivariable SL2-orbit theorem of Cattani-Kaplan-Schmid.