Algebraic cycles and functorial lifts from G2 to PGSp6

Abstract

We study instances of Beilinson-Tate conjectures for automorphic representations of PGSp6 whose Spin L-function has a pole at s=1. We construct algebraic cycles of codimension three in the Siegel-Shimura variety of dimension six and we relate its regulator to the residue at s=1 of the L-function of certain cuspidal forms of PGSp6. Using the exceptional theta correspondence between the split group of type G2 and PGSp6 and assuming the non-vanishing of a certain archimedean integral, this allows us to confirm a conjecture of Gross and Savin on rank 7 motives of type G2.