Partial model categories and their simplicial nerves
Abstract
In this note we consider partial model categories, by which we mean relative categories that satisfy a weakened version of the model category axioms involving only the weak equivalences. More precisely, a partial model category will be a relative category that has the two out of six property and admits a 3-arrow calculus. We then show that Charles Rezk's result that the simplicial space obtained from a simplicial model category by taking a Reedy fibrant replacement of its simplicial nerve is a complete Segal space also holds for these partial model categories. We also note that conversely every complete Segal space is Reedy equivalent to the simplicial nerve of a partial model category and in fact of a homotopically full subcategory of a category of diagrams of simplicial sets.
Keywords
Cite
@article{arxiv.1102.2512,
title = {Partial model categories and their simplicial nerves},
author = {C. Barwick and D. M. Kan},
journal= {arXiv preprint arXiv:1102.2512},
year = {2013}
}
Comments
12 pages. Comments always welcome