equalizer in nLab

Definition

An equalizer is a limit

eq \underset{e}{\to} x ⇉_{g}^{f} y

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

{x ⇉_{g}^{f} y} .

(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: $(eq (f, g) \to x \overset{f}{\to} y) = (eq (f, g) \to x \overset{g}{\to} y)$
- and $eq (f, g)$ is the universal object with this property.

The dual concept is that of coequalizer.

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

$eq (f, g) = {s \in c ∣ f (s) = g (s)} .$ 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 $f$ .

A category has equalizers if it has products and pullbacks.

For $S \overset{\overset{g}{\to}}{\underset{f}{\to}} T$ the given diagram, first form the pullback

\begin{matrix} S \times_{f, g} S & \to & S \\ ↓ & ↓^{g} \\ S & \overset{f}{\to} & T \end{matrix} .

This gives a morphism $S \times_{f, g} S \to S \times S$ into the product.

Define $eq (f, g)$ to be the further pullback

\begin{matrix} eq (f, g) & \to & S \times_{f, g} S \\ ↓ & ↓ \\ S & \overset{(id, id)}{\to} & S \times S \end{matrix} .

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