The coherence theorem for bicategories #
In this file, we prove the coherence theorem for bicategories, stated in the following form: the free bicategory over any quiver is locally thin.
The proof is almost the same as the proof of the coherence theorem for monoidal categories that
has been previously formalized in mathlib, which is based on the proof described by Ilya Beylin
and Peter Dybjer. The idea is to view a path on a quiver as a normal form of a 1-morphism in the
free bicategory on the same quiver. A normalization procedure is then described by
normalize : Pseudofunctor (FreeBicategory B) (LocallyDiscrete (Paths B))
, which is a
pseudofunctor from the free bicategory to the locally discrete bicategory on the path category.
It turns out that this pseudofunctor is locally an equivalence of categories, and the coherence
theorem follows immediately from this fact.
Main statements #
locally_thin
: the free bicategory is locally thin, that is, there is at most one 2-morphism between two fixed 1-morphisms.
References #
- [Ilya Beylin and Peter Dybjer, Extracting a proof of coherence for monoidal categories from a proof of normalization for monoids][beylin1996]
Auxiliary definition for inclusionPath
.
Equations
Instances For
Category structure on Hom a b
. In this file, we will use Hom a b
for a b : B
(precisely, FreeBicategory.Hom a b
) instead of the definitionally equal expression
a ⟶ b
for a b : FreeBicategory B
. The main reason is that we have to annoyingly write
@Quiver.Hom (FreeBicategory B) _ a b
to get the latter expression when given a b : B
.
Equations
Instances For
The discrete category on the paths includes into the category of 1-morphisms in the free bicategory.
Equations
- CategoryTheory.FreeBicategory.inclusionPath a b = CategoryTheory.Discrete.functor CategoryTheory.FreeBicategory.inclusionPathAux
Instances For
The inclusion from the locally discrete bicategory on the path category into the free bicategory
as a prelax functor. This will be promoted to a pseudofunctor after proving the coherence theorem.
See inclusion
.
Equations
- One or more equations did not get rendered due to their size.
Instances For
The normalization of the composition of p : Path a b
and f : Hom b c
.
p
will eventually be taken to be nil
and we then get the normalization
of f
alone, but the auxiliary p
is necessary for Lean to accept the definition of
normalizeIso
and the whisker_left
case of normalizeAux_congr
and normalize_naturality
.
Equations
- CategoryTheory.FreeBicategory.normalizeAux x (CategoryTheory.FreeBicategory.Hom.of f) = x.cons f
- CategoryTheory.FreeBicategory.normalizeAux x (CategoryTheory.FreeBicategory.Hom.id x✝) = x
- CategoryTheory.FreeBicategory.normalizeAux x (f.comp g) = CategoryTheory.FreeBicategory.normalizeAux (CategoryTheory.FreeBicategory.normalizeAux x f) g
Instances For
A 2-isomorphism between a partially-normalized 1-morphism in the free bicategory to the fully-normalized 1-morphism.
Equations
- One or more equations did not get rendered due to their size.
- CategoryTheory.FreeBicategory.normalizeIso x (CategoryTheory.FreeBicategory.Hom.id x✝) = CategoryTheory.Bicategory.rightUnitor ((CategoryTheory.FreeBicategory.preinclusion B).map { as := x })
Instances For
Given a 2-morphism between f
and g
in the free bicategory, we have the equality
normalizeAux p f = normalizeAux p g
.
The 2-isomorphism normalizeIso p f
is natural in f
.
The normalization pseudofunctor for the free bicategory on a quiver B
.
Equations
- One or more equations did not get rendered due to their size.
Instances For
Auxiliary definition for normalizeEquiv
.
Equations
- One or more equations did not get rendered due to their size.
Instances For
Normalization as an equivalence of categories.
Equations
- One or more equations did not get rendered due to their size.
Instances For
The coherence theorem for bicategories.
Equations
- ⋯ = ⋯
Auxiliary definition for inclusion
.
Equations
- One or more equations did not get rendered due to their size.
- CategoryTheory.FreeBicategory.inclusionMapCompAux x Quiver.Path.nil = (CategoryTheory.Bicategory.rightUnitor ((CategoryTheory.FreeBicategory.preinclusion B).map { as := x })).symm
Instances For
The inclusion pseudofunctor from the locally discrete bicategory on the path category into the free bicategory.
Equations
- One or more equations did not get rendered due to their size.