English

The comprehension construction

Category Theory 2018-08-20 v2 Algebraic Topology

Abstract

In this paper we construct an analogue of Lurie's "unstraightening" construction that we refer to as the "comprehension construction". Its input is a cocartesian fibration p ⁣:EBp \colon E \to B between \infty-categories together with a third \infty-category AA. The comprehension construction then defines a map from the quasi-category of functors from AA to BB to the large quasi-category of cocartesian fibrations over AA that acts on f ⁣:ABf \colon A \to B by forming the pullback of pp along ff. To illustrate the versatility of this construction, we define the covariant and contravariant Yoneda embeddings as special cases of the comprehension functor. We then prove that the hom-wise action of the comprehension functor coincides with an "external action" of the hom-spaces of BB on the fibres of pp and use this to prove that the Yoneda embedding is fully faithful, providing an explicit equivalence between a quasi-category and the homotopy coherent nerve of a Kan-complex enriched category.

Keywords

Cite

@article{arxiv.1706.10023,
  title  = {The comprehension construction},
  author = {Emily Riehl and Dominic Verity},
  journal= {arXiv preprint arXiv:1706.10023},
  year   = {2018}
}

Comments

78 pages; a continuation of the program developed in the papers arXiv:1306.5144, arXiv:1310.8279, arXiv:1401.6247, arXiv:1506.05500, and arXiv:1507.01460, as summarized in arXiv:1608.05314; v2 is the final journal version to appear in Higher Structures

R2 v1 2026-06-22T20:34:06.766Z