Mac Lane coherence theorem

In category theory, a branch of mathematics, Mac Lane coherence theorem states, in the words of Saunders Mac Lane, “every diagram commutes”.^[1] More precisely (cf. #Counter-example), it states every formal diagram commutes, where "formal diagram" is an analog of well-formed formulae and terms in proof theory.

Counter-example[edit]

It is not reasonable to expect we can show literally every diagram commutes, due to the following example of Isbell.^[2]

Let ${\mathsf {Set}}_{0}\subset {\mathsf {Set}}$ be a skeleton of the category of sets and D a unique countable set in it; note $D\times D=D$ by uniqueness. Let $p:D=D\times D\to D$ be the projection onto the first factor. For any functions $f,g:D\to D$ , we have $f\circ p=p\circ (f\times g)$ . Now, suppose the natural isomorphisms $\alpha :X\times (Y\times Z)\simeq (X\times Y)\times Z$ are the identity; in particular, that is the case for $X=Y=Z=D$ . Then for any $f,g,h:D\to D$ , since $\alpha$ is the identity and is natural,

f\circ p=p\circ (f\times (g\times h))=p\circ \alpha \circ (f\times (g\times h))=p\circ ((f\times g)\times h)\circ \alpha =(f\times g)\circ p

.

Since $p$ is an epimorphism, this implies $f=f\times g$ . Similarly, using the projection onto the second factor, we get $g=f\times g$ and so $f=g$ , which is absurd.

Proof[edit]

Notes[edit]

^ Mac Lane 1998, Ch VII, § 2.
^ Mac Lane 1998, Ch VII. the end of § 1.

References[edit]

Mac Lane, Saunders (1998). Categories for the working mathematician. New York: Springer. ISBN 0-387-98403-8. OCLC 37928530.
Section 5 of Saunders Mac Lane, Topology and Logic as a Source of Algebra (Retiring Presidential Address), Bulletin of the AMS 82:1, January 1976.

External links[edit]

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[1] Mac Lane 1998, Ch VII, § 2.

[2] Mac Lane 1998, Ch VII. the end of § 1.

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