Cup products in surface bundles, higher Johnson invariants, and MMM classes

Abstract

In this paper we prove a family of results connecting the problem of computing cup products in surface bundles to various other objects that appear in the theory of the cohomology of the mapping class group Modg and the Torelli group Ig. We show that N. Kawazumi's twisted MMM class m0,k can be used to compute k-fold cup products in surface bundles, and that m0,k provides an extension of the higher Johnson invariant τk-2 to Hk-2(Modg,*, k H1). These results are used to show that the behavior of the restriction of the even MMM classes e2i to H4i(Ig1) is completely determined by im(τ4i) 4i+2H1, and to give a partial answer to a question of D. Johnson. We also use these ideas to show that all surface bundles with monodromy in the Johnson kernel Kg,* have cohomology rings isomorphic to that of a trivial bundle, implying the vanishing of all τi when restricted to Kg,*.