English

Cubical rigidification, the cobar construction, and the based loop space

Algebraic Topology 2018-12-27 v5 Category Theory Quantum Algebra

Abstract

We prove the following generalization of a classical result of Adams: for any pointed and connected topological space (X,b)(X,b), that is not necessarily simply connected, the cobar construction of the differential graded (dg) coalgebra of normalized singular chains in XX with vertices at bb is weakly equivalent as a differential graded associative algebra (dga) to the singular chains on the Moore based loop space of XX at bb. We deduce this statement from several more general categorical results of independent interest. We construct a functor Cc\mathfrak{C}_{\square_c} from simplicial sets to categories enriched over cubical sets with connections which, after triangulation of their mapping spaces, coincides with Lurie's rigidification functor C\mathfrak{C} from simplicial sets to simplicial categories. Taking normalized chains of the mapping spaces of Cc\mathfrak{C}_{\square_c} yields a functor Λ\Lambda from simplicial sets to dg categories which is the left adjoint to the dg nerve functor. For any simplicial set SS with S0={x}S_0=\{x\}, Λ(S)(x,x)\Lambda(S)(x,x) is a dga isomorphic to ΩQΔ(S)\Omega Q_{\Delta}(S), the cobar construction on the dg coalgebra QΔ(S)Q_{\Delta}(S) of normalized chains on SS. We use these facts to show that QΔQ_{\Delta} sends categorical equivalences between simplicial sets to maps of connected dg coalgebras which induce quasi-isomorphisms of dga's under the cobar functor.

Keywords

Cite

@article{arxiv.1612.04801,
  title  = {Cubical rigidification, the cobar construction, and the based loop space},
  author = {Manuel Rivera and Mahmoud Zeinalian},
  journal= {arXiv preprint arXiv:1612.04801},
  year   = {2018}
}

Comments

Edits made mostly regarding exposition. Some references have been added. A typo in the title was fixed

R2 v1 2026-06-22T17:23:59.642Z