The Mumford-Tate conjecture for the product of an abelian surface and a K3 surface

Abstract

In this paper we prove the Mumford-Tate conjecture in degree 2 for the product of an abelian surface A and a K3 surface X over a finitely generated field K ⊂ C. The Mumford-Tate conjecture is a precise way of saying that the Hodge structure on singular cohomology conveys the same information as the Galois representation on -adic \'etale cohomology. To make this precise, let GB be the Mumford-Tate group of the Hodge structure H2sing(A(C) × X(C), Q). Let G be the connected component of the identity of the Zariski closure of the image of the Galois group Gal(K/K) in GL(H2\'et(AK × XK, Q)). The Mumford-Tate conjecture asserts that GB Q G. The proof presented in this paper uses input from number theory (Chebotaryov's density theorem), Lie theory, and some facts about K3 surfaces over finite fields.