English

Linked spaces and exit paths

Algebraic Topology 2025-11-05 v4

Abstract

Conically smooth spaces (CSSs), introduced by Ayala, Francis and Tanaka, constitute a large class of singular spaces including Whitney-stratified spaces. We reduce the stratified topology of CSSs over depth-11 posets to the ordinary topology of linked smooth manifolds, i.e., spans MπLιNM\xleftarrow{\pi} L\xrightarrow{\iota}N of smooth manifolds where π\pi is a fibre bundle and ι\iota is a closed embedding. To that end, we introduce explicit exit path quasi-categories (EPCs) for linked spaces and prove that this induces a fully faithful functor from a quasi-category of linked spaces to the quasi-category of all quasi-categories whose essential image includes the Lurie--MacPherson EPCs of CSSs over depth-11 posets. We use linked smooth manifolds to resolve various weaker versions of a conjecture of Ayala--Francis--Rozenblyum in the negative by exhibiting quasi-categories with conservative functors to {0<1}\{0<1\} satisfying certain finiteness conditions but which are not equivalent to EPCs of CSSs. In a sequel, we develop a tangential theory for linked smooth manifolds and reduce the classification conically smooth bundles over depth-11 posets to that of ordinary bundles on linked smooth manifolds.

Keywords

Cite

@article{arxiv.2301.02063,
  title  = {Linked spaces and exit paths},
  author = {Ödül Tetik},
  journal= {arXiv preprint arXiv:2301.02063},
  year   = {2025}
}

Comments

minor improvements

R2 v1 2026-06-28T08:03:46.293Z