Torelli loci, product cycles, and the homomorphism conjecture for Ag

Abstract

The tautological Q-subalgebra R*(Ag) ⊂ CH*(Ag) of the Chow ring of the moduli space of principally polarized abelian varieties is generated by the Chern classes of the Hodge bundle. There is a canonical Q-linear projection operator taut: CH*(Ag) → R*(Ag). We present here new calculations of intersection products of the Torelli locus in Ag with the product loci Ar× Ag-r → Ag for r≤ 3. The results suggest that taut is a Q-algebra homomorphism, at least for special cycles. We discuss a conjectural framework for this homomorphism property. Our calculations follow two independent approaches. The first is a direct study of the excess intersection geometry of the fiber product of the Torelli and product morphisms. The second recasts the geometry in terms of families Gromov-Witten classes, which are computed by a wall-crossing formula related to unramified maps. We define tautological projections of cycles on the fiber products Xgs Ag of the universal family. We compute these projections for a class of product cycles on Xgs in terms of a determinant involving the universal theta divisors and Poincaré classes. Using Abel-Jacobi pullbacks of product cycles on Xgs and their projections, we construct a new family of classes which we conjecture to lie in the Gorenstein kernels of the tautological rings R*( Mctg,n). In particular, we construct nontrivial elements of the Gorenstein kernels of R5(M5,2ct) and R5(M4,4ct).