English

A necessary and sufficient condition for induced model structures

Algebraic Topology 2022-05-23 v2 Category Theory

Abstract

A common technique for producing a new model category structure is to lift the fibrations and weak equivalences of an existing model structure along a right adjoint. Formally dual but technically much harder is to lift the cofibrations and weak equivalences along a left adjoint. For either technique to define a valid model category, there is a well-known necessary "acyclicity" condition. We show that for a broad class of "accessible model structures" - a generalization introduced here of the well-known combinatorial model structures - this necessary condition is also sufficient in both the right-induced and left-induced contexts, and the resulting model category is again accessible. We develop new and old techniques for proving the acyclity condition and apply these observations to construct several new model structures, in particular on categories of differential graded bialgebras, of differential graded comodule algebras, and of comodules over corings in both the differential graded and the spectral setting. We observe moreover that (generalized) Reedy model category structures can also be understood as model categories of "bialgebras" in the sense considered here.

Keywords

Cite

@article{arxiv.1509.08154,
  title  = {A necessary and sufficient condition for induced model structures},
  author = {Kathryn Hess and Magdalena Kedziorek and Emily Riehl and Brooke Shipley},
  journal= {arXiv preprint arXiv:1509.08154},
  year   = {2022}
}

Comments

49 pages; final journal version to appear in the Journal of Topology

R2 v1 2026-06-22T11:06:35.386Z