English

Models for knot spaces and Atiyah duality

Algebraic Topology 2024-03-27 v4 Geometric Topology

Abstract

Let Emb(S1,M)\mathrm{Emb}(S^1,M) be the space of smooth embeddings from the circle to a closed manifold MM of dimension 4\geq 4. We study a cosimplicial model of Emb(S1,M)\mathrm{Emb}(S^1,M) in stable categories, using a spectral version of Poincar\'e-Lefschetz duality called Atiyah duality. We actually deal with a notion of a comodule instead of the cosimplicial model, and prove a comodule version of the duality. As an application, we introduce a new spectral sequence converging to H(Emb(S1,M))H^*(\mathrm{Emb}(S^1,M)) for simply connected MM and for major coefficient rings. Using this, we compute H(Emb(S1,Sk×Sl))H^*(\mathrm{Emb}(S^1, S^k\times S^l)) in low degrees with some conditions on kk, ll. We also prove the inclusion Emb(S1,M)Imm(S1,M)\mathrm{Emb}(S^1,M)\to \mathrm{Imm}(S^1,M) to the immersions induces an isomorphism on π1\pi_1 for some simply connected 44-manifolds, related to a question posed by Arone and Szymik. We also prove an equivalence of singular cochain complex of Emb(S1,M)\mathrm{Emb}(S^1,M) and a homotopy colimit of chain complexes of a Thom spectrum of a bundle over a comprehensible space. Our key ingredient is a structured version of the duality due to R. Cohen.

Keywords

Cite

@article{arxiv.2003.03815,
  title  = {Models for knot spaces and Atiyah duality},
  author = {Syunji Moriya},
  journal= {arXiv preprint arXiv:2003.03815},
  year   = {2024}
}

Comments

56 pages, errors corrected

R2 v1 2026-06-23T14:08:00.399Z