Parametrized Abel-Jacobi maps and abelian cycles in the Torelli group

Abstract

Let Ig,* denote the (pointed) Torelli group. This is the group of homotopy classes of homeomorphisms of the genus g >= 2 surface Sg with a marked point, acting trivially on H := H1(Sg). In 1983 Johnson constructed a beautiful family of invariants taui: Hi(Ig,*) -> /\i+2 H for 0 <= i <= 2g-2, using a kind of Abel-Jacobi map for families, in order to detect nontrivial cycles in Ig,*. Johnson proved that tau1 is an isomorphism rationally, and asked if the same is true for taui with i > 1. The goal of this paper is to introduce various methods for computing taui; in particular we prove that taui is not injective (even rationally) for any 2 <= i < g, and that tau2 is surjective. For g >= 3, we find enough classes in the image of taui to deduce that Hi(Ig,*, Q) is nonzero for each 1 <= i < g, in contrast with mapping class groups. Many of our classes are stable, so we can deduce that Hi(Iinfty,1, Q) is infinite-dimensional for each i >= 1. Finally, we conjecture a new kind of "representation-theoretic stability" for the homology of the Torelli group, for which our results provide evidence.