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

Abstract

We prove the following generalization of a classical result of Adams: for any pointed and connected topological space (X,b), that is not necessarily simply connected, the cobar construction of the differential graded (dg) coalgebra of normalized singular chains in X with vertices at b is weakly equivalent as a differential graded associative algebra (dga) to the singular chains on the Moore based loop space of X at b. We deduce this statement from several more general categorical results of independent interest. We construct a functor C_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 from simplicial sets to simplicial categories. Taking normalized chains of the mapping spaces of C_c yields a functor from simplicial sets to dg categories which is the left adjoint to the dg nerve functor. For any simplicial set S with S0=\x\, (S)(x,x) is a dga isomorphic to Q(S), the cobar construction on the dg coalgebra Q(S) of normalized chains on S. We use these facts to show that Q sends categorical equivalences between simplicial sets to maps of connected dg coalgebras which induce quasi-isomorphisms of dga's under the cobar functor.