On Kontsevich's characteristic classes for higher-dimensional sphere bundles II: Higher classes

This paper studies Kontsevich's characteristic classes of smooth bundles with fibre in a 'singularly framed' odd-dimensional homology sphere, which are defined through his graph complex and configuration space integral. We will give a systematic construction of smooth bundles parameterized by trivalent graphs and will show that our smooth bundles are non-trivially detected by Kontsevich's characteristic classes. It turns out that there are surprisingly many non-trivial elements of the rational homotopy groups of the diffeomorphism groups of spheres that are in some 'non-stable' range. In particular, the homotopy groups of the diffeomorphism groups in some 'non-stable' range are not finite.