English

A 2Cat-inspired model structure for double categories

Algebraic Topology 2021-05-04 v5 Category Theory

Abstract

We construct a model structure on the category DblCat\mathrm{DblCat} of double categories and double functors. Unlike previous model structures for double categories, it recovers the homotopy theory of 2-categories through the horizontal embedding H ⁣:2CatDblCat\mathbb{H}\colon2\mathrm{Cat}\to\mathrm{DblCat}, which is both left and right Quillen, and homotopically fully faithful. Furthermore, we show that Lack's model structure on 2Cat2\mathrm{Cat} is both left- and right-induced along H\mathbb{H} from our model structure on DblCat\mathrm{DblCat}. In addition, we obtain a 2Cat2\mathrm{Cat}-enrichment of our model structure on DblCat\mathrm{DblCat}, by using a variant of the Gray tensor product. Under certain conditions, we prove a Whitehead theorem, characterizing our weak equivalences as the double functors which admit an inverse pseudo double functor up to horizontal pseudo natural equivalence. This retrieves the Whitehead theorem for 2-categories. Analogous statements hold for the category wkDblCats\mathrm{wkDblCat}_s of weak double categories and strict double functors, whose homotopy theory recovers that of bicategories. Moreover, we show that the full embedding DblCatwkDblCats\mathrm{DblCat}\to\mathrm{wkDblCat}_s is a Quillen equivalence.

Keywords

Cite

@article{arxiv.2004.14233,
  title  = {A 2Cat-inspired model structure for double categories},
  author = {Lyne Moser and Maru Sarazola and Paula Verdugo},
  journal= {arXiv preprint arXiv:2004.14233},
  year   = {2021}
}

Comments

42 pages; shortened the exposition, otherwise the same as the previous version

R2 v1 2026-06-23T15:11:09.041Z