Quasi-2-Segal sets
Abstract
We show that the 2-Segal spaces (also called decomposition spaces) of Dyckerhoff-Kapranov and G\'alvez-Kock-Tonks have a natural analogue within simplicial sets, which we call quasi-2-Segal sets, and that the two ideas enjoy a similar relationship as the one Segal spaces have with quasi-categories. In particular, we construct a model structure on the category of simplicial sets whose fibrant objects are the quasi-2-Segal sets which is Quillen equivalent to a model structure for complete 2-Segal spaces (where our notion of completeness comes from one of the equivalent characterizations of completeness for Segal spaces). We also prove a path space criterion, which says that a simplicial set is a quasi-2-Segal set if and only if its path spaces (also called d\'ecalage) are quasi-categories, as well as an edgewise subdivision criterion.
Cite
@article{arxiv.2204.01910,
title = {Quasi-2-Segal sets},
author = {Matthew Feller},
journal= {arXiv preprint arXiv:2204.01910},
year = {2023}
}
Comments
35 pages. v3: Accepted for publication. Corollary 7.9 and Subsection 7.1 added, discussion of Tau_2 moved to short appendix, and various other edits based on referee feedback