Hodge classes on the moduli space of W(E6)-covers and the geometry of A6

Abstract

In previous work we showed that the Hurwitz space of W(E6)-covers of the projective line branched over 24 points dominates via the Prym-Tyurin map the moduli space A6 of principally polarized abelian 6-folds. Here we determine the 25 Hodge classes on the Hurwitz space of W(E6)-covers corresponding to the 25 irreducible representations of the Weyl group W(E6). This result has direct implications to the intersection theory of the toroidal compactification A6. In the final part of the paper, we present an alternative, elementary proof of our uniformization result on A6 via Prym-Tyurin varieties of type W(E6).