Equivalences of categories and a model structure on relative categories

• Published in: Theory and applications of categories Vol. 44; no. 26; p. 783
• Main Author: Lee, Seunghun
• Format: Journal Article
• Language: English
• Published: Sackville R. Rosebrugh 01.01.2025
• Subjects: Algebra; Categories; Equivalence; Localization; Theoretical mathematics
• ISSN: 1201-561X

We show that there is a model structure on the category RelCat of small relative categories such that for a morphism f in RelCat, f is a weak equivalence iff the associated functor on homotopy 1-categories is an equivalence of categories. In this model category (i) every object is cofibrant and (ii) the homotopy category functor becomes a fibrant replacement. The model structure is left-induced from the model category on small categories with equivalences of categories as weak equivalences by the homotopy category functor in a Quillen equivalent way.