English

The stable embedding tower and operadic structures on configuration spaces

Algebraic Topology 2023-05-30 v3 Geometric Topology

Abstract

Given smooth manifolds MM and NN, manifold calculus studies the space of embeddings Emb(M,N)\operatorname{Emb}(M,N) via the "embedding tower", which is constructed using the homotopy theory of presheaves on MM. The same theory allows us to study the stable homotopy type of Emb(M,N)\operatorname{Emb}(M,N) via the "stable embedding tower". By analyzing cubes of framed configuration spaces, we prove that the layers of the stable embedding tower are tangential homotopy invariants of NN. If MM is framed, the moduli space of disks EME_M is intimately connected to both the stable and unstable embedding towers through the EnE_n operad. The action of EnE_n on EME_M induces an action of the Poisson operad poisn\mathrm{pois}_n on the homology of configuration spaces H(F(M,))H_*(F(M,-)). In order to study this action, we introduce the notion of Poincare-Koszul operads and modules and show that EnE_n and EME_M are examples. As an application, we compute the induced action of the Lie operad on H(F(M,))H_*(F(M,-)) and show it is a homotopy invariant of M+M^+.

Keywords

Cite

@article{arxiv.2211.12654,
  title  = {The stable embedding tower and operadic structures on configuration spaces},
  author = {Connor Malin},
  journal= {arXiv preprint arXiv:2211.12654},
  year   = {2023}
}

Comments

Minor corrections; included a proof of Lemma 11.4; to appear in "Homology, Homotopy and Applications"

R2 v1 2026-06-28T06:38:32.904Z