Tautological classes and higher signatures
Abstract
For a bundle of oriented closed smooth -manifolds , the tautological class is defined by fibre integration of the Hirzebruch class of the vertical tangent bundle. More generally, given a discrete group , a class and a map , one has tautological classes associated to the Novikov higher signatures. For odd , it is well-known that for all bundles with -dimensional fibres. The aim of this note is to show that the question whether more generally (for odd ) depends sensitively on the group and the class . For example, given a nonzero cohomology class of a surface group, we show that always if , whereas sometimes if . The vanishing theorem is obtained by a generalization of the index-theoretic proof that , while the nontriviality theorem follows with little effort from the work of Galatius and Randal-Williams on diffeomorphism groups of even-dimensional manifolds.
Cite
@article{arxiv.2403.02755,
title = {Tautological classes and higher signatures},
author = {Johannes Ebert},
journal= {arXiv preprint arXiv:2403.02755},
year = {2025}
}
Comments
Final version, to appear in Journal of Topology and Analysis