English

Virtual double categories of split two-sided 2-fibrations

Category Theory 2026-02-11 v1

Abstract

This paper introduces and studies split two-sided 2-fibrations and locally discrete split two-sided 2-fibrations, using a formal categorical approach. We generalise Street's notion of split two-sided fibration internal to a 2-category to one internal to a sesquicategory. Given a sesquicategory we construct a virtual double category whose horizontal (loose) morphisms are its internal split two-sided fibrations. Specialising to the sesquicategory of lax natural transformations we obtain the virtual double category of split two-sided 2-fibrations, which we study in detail. We then restrict to the sub-virtual double category of locally discrete split two-sided 2-fibrations and show that therein the usual Yoneda 2-functors satisfy a double-categorical formal notion of Yoneda morphism, which formally captures universal properties similar to those satisfied by the morphisms comprising a Yoneda structure on a 2-category. As a consequence we obtain a 'two-sided Grothendieck correspondence' of locally discrete split two-sided 2-fibrations ABA \nrightarrow B and 2-functors BCatAopB \to Cat^{A^{op}}. Restricting to A=1A = 1, the terminal 2-category, we improve Buckley and Lambert's 'Grothendieck correspondence' for locally discrete split op-2-fibrations by extending the sense in which it is functorial.

Keywords

Cite

@article{arxiv.2602.10000,
  title  = {Virtual double categories of split two-sided 2-fibrations},
  author = {Seerp Roald Koudenburg},
  journal= {arXiv preprint arXiv:2602.10000},
  year   = {2026}
}

Comments

Dedicated to Bob Par\'e on the occasion of his 80th birthday

R2 v1 2026-07-01T10:30:04.636Z