English

The Disc-structure space

Algebraic Topology 2024-12-18 v3 Geometric Topology

Abstract

We study the Disc-structure space SDisc(M)S^{\rm Disc}_\partial(M) of a compact smooth manifold MM. Informally speaking, this space measures the difference between MM, together with its diffeomorphisms, and the diagram of ordered framed configuration spaces of MM with point-forgetting and point-splitting maps between them, together with its derived automorphisms. As the main results, we show that in high dimensions, the Disc-structure space a) only depends on the tangential 2-type of MM, b) is an infinite loop space, and c) is nontrivial as long as MM is spin. The proofs involve intermediate results that may be of independent interest, including an enhancement of embedding calculus to the level of bordism categories, results on the behaviour of derived mapping spaces between operads under rationalisation, and an answer to a question of Dwyer and Hess in that we show that the map BTop(d)BAut(Ed){\rm BTop}(d)\to {\rm BAut}(E_d) is an equivalence if and only if dd is at most 22.

Keywords

Cite

@article{arxiv.2205.01755,
  title  = {The Disc-structure space},
  author = {Manuel Krannich and Alexander Kupers},
  journal= {arXiv preprint arXiv:2205.01755},
  year   = {2024}
}

Comments

89 pages, 8 figures, to appear in Forum of Mathematics Pi

R2 v1 2026-06-24T11:06:23.621Z