De Rham-Betti classes with coefficients

Abstract

Let K and L be algebraic extensions of the rational numbers inside the field of complex numbers. An L-de Rham-Betti class on a smooth projective variety X over K is a class in the Betti cohomology with L-coefficients of the analytification of X that descends to a class in the algebraic de Rham cohomology of X via the period comparison isomorphism. The period conjecture of Grothendieck implies that L-de Rham-Betti classes should be L-linear combinations of algebraic cycle classes. We prove that L-de Rham-Betti classes on products of elliptic curves are L-linear combinations of algebraic classes, provided L contains at most one of the CM fields associated with the CM elliptic curves involved in the product. A key step consists in establishing a version of the analytic subgroup theorem with L-coefficients. Moreover, building on results of Deligne and Andr\'e regarding the Kuga-Satake correspondence, we show that codimension-2 L-de Rham-Betti classes on hyper-K\"ahler varieties of known deformation type are L-linear combinations of motivated cycles, and we obtain a global de Rham-Betti Torelli theorem for K3 surfaces defined over the algebraic numbers.