English

Formal category theory in augmented virtual double categories

Category Theory 2024-04-04 v3

Abstract

In this article we develop formal category theory within augmented virtual double categories. Notably we formalise the classical notions of Kan extension, Yoneda embedding yA ⁣:AA^\text y_A\colon A \to \hat A, exact square, total category and 'small' cocompletion; the latter in an appropriate sense. Throughout we compare our formalisations to their corresponding 22-categorical counterparts. Our approach has several advantages. For instance, the structure of augmented virtual double categories naturally allows us to isolate conditions that ensure small cocompleteness of formal presheaf objects A^\hat A. Given a monoidal augmented virtual double category K\mathcal K with a Yoneda embedding yI ⁣:II^\text y_I \colon I \to \hat I for its monoidal unit II we prove that, for any 'unital' object AA in K\mathcal K that has a 'horizontal dual' AA^\circ, the Yoneda embedding yA ⁣:AA^\text y_A \colon A \to \hat A exists if and only if the 'inner hom' [A,I^][A^\circ, \hat I] exists. This result is a special case of a more general result that, given a functor F ⁣:KLF\colon \mathcal K \to \mathcal L of augmented virtual double categories, allows a Yoneda embedding in L\mathcal L to be "lifted", along a pair of 'universal morphisms' in L\mathcal L, to a Yoneda embedding in K\mathcal K.

Keywords

Cite

@article{arxiv.2205.04890,
  title  = {Formal category theory in augmented virtual double categories},
  author = {Seerp Roald Koudenburg},
  journal= {arXiv preprint arXiv:2205.04890},
  year   = {2024}
}

Comments

126 pages. Comprises a streamlined and much expanded version of Sections 4 and 5 of the draft paper arXiv:1511.04070. v3: Section 5 moved to the end and Proposition 4.26 added. Several other small changes. Major changes in numbering. Final version as published in TAC. v2: many small improvements and small corrections

R2 v1 2026-06-24T11:13:08.185Z