English

Bousfield-Kan completion as a codensity $\infty$-monad

Algebraic Topology 2025-09-24 v3

Abstract

Working in the setting of \infty-categories, we develop a general theory of the codensity monad TDT_\mathcal{D} associated with a full subcategory DC\mathcal{D}\subseteq \mathcal{C}. We show that TDT_\mathcal{D} has a canonical monad structure (unique up to a contractible space of choices), and characterize it as a terminal monad preserving all objects of D\mathcal{D}. For a monad M\mathcal{M} on an \infty-category C\mathcal{C}, we consider the M\mathcal{M}-completion functor defined as the totalization of the cosimplicial resolution associated with M\mathcal{M}. We show that the M\mathcal{M}-completion functor is the codensity monad associated with the full subcategory of C\mathcal{C} spanned by objects that admit a structure of M\mathcal{M}-algebra. In particular, the M\mathcal{M}-completion functor is the terminal monad preserving all objects that admit a structure of an M\mathcal{M}-algebra. This gives a full \infty-categorical characterization of the classical Bousfield-Kan RR-completion functor as the terminal monad on the category of spaces preserving the empty space and all products of Eilenberg-MacLane spaces K(A,n)K(A,n), where AA is an RR-module.

Keywords

Cite

@article{arxiv.2507.08414,
  title  = {Bousfield-Kan completion as a codensity $\infty$-monad},
  author = {Emmanuel Dror Farjoun and Sergei O. Ivanov},
  journal= {arXiv preprint arXiv:2507.08414},
  year   = {2025}
}
R2 v1 2026-07-01T03:56:12.937Z