English

Configuration space integrals and formal smooth structures

Geometric Topology 2023-10-24 v1 Algebraic Topology

Abstract

Watanabe disproved the 4-dimensional Smale conjecture by constructing topologically trivial D4D^{4}-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 D4D^{4}-bundle (i.e., a vector bundle structure on the vertical tangent microbundle). It coincides with Watanabe's definition when the D4D^{4}-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)\textrm{Top}(4) and Homeo(S4)\textrm{Homeo}(S^4) (the homeomorphism group of R4\mathbb{R}^4 and S4S^4). In particular, this implies that Top(4)\textrm{Top}(4) and Homeo(S4)\textrm{Homeo}(S^4) are not rationally equivalent to any finite-dimensional CW complexes. Second, we discover a generalized Miller-Morita-Mumford class κθ(π)H3(B;Q)\kappa_{\theta}(\pi)\in H^{3}(B;\mathbf{Q}), which is defined for any topological 4-manifold bundle XEBX\to E\to 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 XX (possibly with boundary), the inclusion map from its diffeomorphism group to its homeomorphism group is not rationally 22-connected (hence not a weak homotopy equivalence). This implies that the space of smooth structures on XX has a nontrivial rational homotopy group in dimension 2.

Keywords

Cite

@article{arxiv.2310.14156,
  title  = {Configuration space integrals and formal smooth structures},
  author = {Jianfeng Lin and Yi Xie},
  journal= {arXiv preprint arXiv:2310.14156},
  year   = {2023}
}

Comments

79 pages, comments welcome

R2 v1 2026-06-28T12:57:51.253Z