Displayed Categories

Benedikt Ahrens, Peter LeFanu Lumsdaine

Research output: Chapter in Book/Report/Conference proceedingConference contribution

3 Citations (Scopus)
40 Downloads (Pure)

Abstract

We introduce and develop the notion of displayed categories. A displayed category over a category C is equivalent to ‘a category D and functor F : D > C’, but instead of having a single collection of ‘objects of D’ with a map to the objects of C, the objects are given as a family indexed by objects of C, and similarly for the morphisms. This encapsulates a common way of building categories in practice, by starting with an existing category and adding extra data/properties to the objects and morphisms. The interest of this seemingly trivial reformulation is that various properties of functors are more naturally defined as properties of the corresponding displayed categories. Grothendieck fibrations, for example, when defined as certain functors, use equality on objects in their definition. When defined instead as certain displayed categories, no reference to equality on objects is required. Moreover, almost all examples of fibrations in nature are, in fact, categories whose standard construction can be seen as going via displayed categories. We therefore propose displayed categories as a basis for the development of fibrations in the type-theoretic setting, and similarly for various other notions whose classical definitions involve equality on objects. Besides giving a conceptual clarification of such issues, displayed categories also provide a powerful tool in computer formalisation, unifying and abstracting common constructions and proof techniques of category theory, and enabling modular reasoning about categories of multicomponent structures. As such, most of the material of this article has been formalised in Coq over the UniMath library, with the aim of providing a practical library for use in further developments.
Original languageEnglish
Title of host publication2nd International Conference on Formal Structures for Computation and Deduction (FSCD 2017)
EditorsDale Miller
PublisherSchloss Dagstuhl
Pages5:1–5:16
Volume84
ISBN (Print)9783959770477
DOIs
Publication statusPublished - 3 Sep 2017
Event2nd International Conference on Formal Structures for Computation and Deduction (FSCD 2017) - Oxford, United Kingdom
Duration: 3 Sep 20179 Sep 2017

Publication series

NameLeibniz International Proceedings in Informatics (LIPIcs)
Volume84
ISSN (Print)1868-8969

Conference

Conference2nd International Conference on Formal Structures for Computation and Deduction (FSCD 2017)
Country/TerritoryUnited Kingdom
CityOxford
Period3/09/179/09/17

Keywords

  • Category theory
  • Dependent type theory
  • Computer proof assistants
  • Coq
  • Univalent mathematics

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