English

Free decomposition spaces

Category Theory 2026-03-13 v2 Algebraic Topology Combinatorics

Abstract

We introduce the notion of free decomposition spaces: they are simplicial spaces freely generated by their inert maps. We show that left Kan extension along the inclusion j ⁣:ΔinertΔj \colon \Delta_{\operatorname{inert}} \to \Delta takes general objects to M\"obius decomposition spaces and general maps to CULF maps. We establish an equivalence of \infty-categories PrSh(Δinert)Decomp/BN\mathbf{PrSh}(\Delta_{\operatorname{inert}}) \simeq \mathbf{Decomp}_{/B\mathbb{N}}. Although free decomposition spaces are rather simple objects, they abound in combinatorics: it seems that all comultiplications of deconcatenation type arise from free decomposition spaces. We give an extensive list of examples, including quasi-symmetric functions.

Keywords

Cite

@article{arxiv.2210.11192,
  title  = {Free decomposition spaces},
  author = {Philip Hackney and Joachim Kock},
  journal= {arXiv preprint arXiv:2210.11192},
  year   = {2026}
}

Comments

31 pages. v2: Accepted version. Many improvements based on suggestions of the referee. Added a proof that j_! is fully faithful. Streamlined applications sections. Removed discussion of IKEO maps, Aguiar--Bergeron--Sottile map, and zeta functions -- this material will be given an expanded treatment elsewhere

R2 v1 2026-06-28T04:04:43.093Z