nLab equalizer

Contents

Context

Limits and colimits

Definition

In category theory
In type theory

Examples
Properties
Related concepts
References

Definition

In category theory

An equalizer is a limit

\operatorname{eq}\underset{\quad e \quad}{\to}x\underoverset{\quad g \quad}{f}{\rightrightarrows}y

over a parallel pair i.e. of the diagram of the shape

\left\lbrace x \underoverset{\quad g \quad}{f}{\rightrightarrows} y \right\rbrace.

(See also fork diagram).

This means that for $f : x \to y$ and $g : x \to y$ two parallel morphisms in a category $C$ , their equalizer is, if it exists

an object $eq(f,g) \in C$ ;
a morphism $eq(f,g) \to x$
such that
- pulled back to $eq(f,g)$ both morphisms become equal: $(eq(f,g) \to x \stackrel{f}{\to} y) = (eq(f,g) \to x \stackrel{g}{\to} y)$
- and $eq(f,g)$ is the universal object with this property.

The dual concept is that of coequalizer.

In type theory

In type theory the equalizer

P \to A \stackrel{\overset{f}{\longrightarrow}}{\underset{g}{\longrightarrow}} B

is given by the dependent sum over the dependent equality type

P \simeq \sum_{a : A} (f(a) = g(a)).

Examples

In $C =$ Set the equalizer of two functions of sets is the subset of elements of $c$ on which both functions coincide.

$eq(f,g)=\left\{ s \in c | f(s) = g(s) \right\}.$
For $C$ a category with zero object the equalizer of a morphism $f : c \to d$ with the corresponding zero morphism is the kernel of $f$ .

Properties

Proposition

A category has equalizers if it has binary products and pullbacks.

Proof

For $S \stackrel{\overset{g}{\longrightarrow}}{\underset{f}{\longrightarrow}} T$ the given diagram, form the pullback along the diagonal morphism of $T$ :

\array{ eq(f,g) &\longrightarrow& S \\ \big\downarrow && \big\downarrow {}^{\mathrlap{(f, g)}} \\ T &\underset{(id, id)}{\longrightarrow}& T \times T }.

One checks that the horizontal morphism $eq(f,g) \to S$ equalizes $f$ and $g$ and that it does so universally.

Proposition

If a category has equalizers and (finite) products, then it has (finite) limits.

For the finite case, we may say equivalently:

Proposition

If a category has equalizers, binary products and a terminal object, then it has finite limits.

Proposition

(Eckmann and Hilton EH, Proposition 1.3.) Let $e: E \rightarrow X$ be an arrow in a category $\mathcal{C}$ which is an equaliser of a pair of arrows of $\mathcal{C}$ . Then $e$ is a monomorphism.

Proof

If $g,h : A \rightarrow E$ are arrows of $\mathcal{C}$ such that $e \circ g = e \circ h$ , then it follows immediately from the uniqueness part of the universal property of an equaliser that $g = h$ .

Proposition

$f = g$ if and only if $id : X \to X$ is an equalizer of $f$ and $g$ . Similarly, given any equalizer $e : eq \to X$ of $f$ and $g$ , $f = g$ if and only if $e$ is an isomorphism, which because $e$ is monic, one only needs to verify that it has a section.

Related concepts

homotopy equalizer

References

Equalizers were defined in the paper

Beno Eckmann, Peter J. Hilton, Group-like structures in general categories II. Equalizers, limits, lengths. Mathematische Annalen 151:2 (1963), 150–186. doi:10.1007/bf01344176.

for any finite collection of parallel morphisms. The paper refers to them as left equalizers, whereas coequalizers are referred to as right equalizers.

Textbook account:

Francis Borceux, Section 2.4 in Vol. 1: Basic Category Theory of: Handbook of Categorical Algebra, Encyclopedia of Mathematics and its Applications 50 Cambridge University Press (1994) (doi:10.1017/CBO9780511525858)

Last revised on October 8, 2024 at 20:36:53. See the history of this page for a list of all contributions to it.

nLab equalizer

Context

Limits and colimits

1-Categorical

2-Categorical

(∞,1)-Categorical

Model-categorical

Contents

Definition

In category theory

In type theory

Examples

Properties

Proposition

Proof

Proposition

Proposition

Proposition

Proof

Proposition

Related concepts

References