On invariants of foliated sphere bundles

Abstract

Morita showed that for each power of the Euler class, there are examples of flat S1-bundles for which the power of the Euler class does not vanish. Haefliger asked if the same holds for flat odd-dimensional sphere bundles. In this paper, for a manifold M with a free torus action, we prove that certain M-bundles are cobordant to a flat M-bundle and as a consequence, we answer Haefliger's question. We show that the powers of the Euler class and Pontryagin classes pi for i≤ n-1 are all non-trivial in H*(BDiffδ+(S2n-1);Q). In the appendix, Nils Prigge corrects a claim by Haefliger about the vanishing of certain classes in the smooth group cohomology of Diff+(S3).