Mathematics – Geometric Topology
Scientific paper
2006-10-09
Mathematics
Geometric Topology
31 pages, 9 figures, Corollary 4.4, 4.5 and detailed proof for Proposition 4.15 are added. Many typos are corrected. Proof of
Scientific paper
M. Kontsevich constructed universal characteristic classes of smooth bundles with fiber a framed odd-dimensional integral homology sphere. In dimension 3, they are known to give a universal finite type invariants of homology 3-spheres. However, they have not been well understood for higher fiber dimensions. The purpose of the present paper is twofold. First, we obtain a bordism invariant of smooth unframed bundles with fiber a 5-dimensional homology sphere, which is defined as a sum of the simplest Kontsevich class and the second signature defect. It may be in some sense a higher dimensional analogue of the Casson invariant. Second, we construct a family of M-bundles. By evaluating on those M-bundles, we show that Kontsevich's universal characteristic classes are highly non-trivial in the case of fiber dimension 7. As a corollary, new estimates for unstable rational homotopy groups of Diff(D^7,\partial D^7) are obtained.
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