Configuration space integrals and formal smooth structures
Abstract
Watanabe disproved the 4-dimensional Smale conjecture by constructing topologically trivial D4-bundles over spheres and showing that they are smoothly nontrivial using configuration space integrals. In this paper, we define a new version of configuration space integrals that only relies on a formal smooth structure on the D4-bundle (i.e., a vector bundle structure on the vertical tangent microbundle). It coincides with Watanabe's definition when the D4-bundle is smooth. We obtain several applications. First, we give a lower bound (in terms of the graph homology) on the dimension of the rational homotopy and homology groups of Top(4) and Homeo(S4) (the homeomorphism group of R4 and S4). In particular, this implies that Top(4) and Homeo(S4) are not rationally equivalent to any finite-dimensional CW complexes. Second, we discover a generalized Miller-Morita-Mumford class θ(π)∈ H3(B;Q), which is defined for any topological 4-manifold bundle X E B. This class obstructs the existence of a formal smooth structure on the bundle. Third, we show that for any compact, orientable, smooth 4-manifold X (possibly with boundary), the inclusion map from its diffeomorphism group to its homeomorphism group is not rationally 2-connected (hence not a weak homotopy equivalence). This implies that the space of smooth structures on X has a nontrivial rational homotopy group in dimension 2.
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