Tautological classes and higher signatures

Abstract

For a bundle of oriented closed smooth n-manifolds π: E X, the tautological class Lk (E) ∈ H4k-n(X;Q) is defined by fibre integration of the Hirzebruch class Lk (Tv E) of the vertical tangent bundle. More generally, given a discrete group G, a class u ∈ Hp(B G;Q) and a map f:E B G, one has tautological classes Lk ,u(E,f) ∈ H4k+p-n(X;Q) associated to the Novikov higher signatures. For odd n, it is well-known that Lk(E)=0 for all bundles with n-dimensional fibres. The aim of this note is to show that the question whether more generally Lk,u(E,f)=0 (for odd n) depends sensitively on the group G and the class u. For example, given a nonzero cohomology class u ∈ H2 (B π1 (g);Q) of a surface group, we show that always Lk,u(E,f)=0 if g ≥ 2, whereas sometimes Lk,u(E,f)≠ 0 if g=1. The vanishing theorem is obtained by a generalization of the index-theoretic proof that Lk(E)=0, while the nontriviality theorem follows with little effort from the work of Galatius and Randal-Williams on diffeomorphism groups of even-dimensional manifolds.