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Definition

In category theory

An equalizer is a limit

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

(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 $\mathrm{eq}(f,g)\in C$;

• a morphism $\mathrm{eq}(f,g)\to x$

• such that

  • pulled back to $\mathrm{eq}(f,g)$ both morphisms become equal: $(\mathrm{eq}(f,g)\to x\stackrel{f}{\to }y)=(\mathrm{eq}(f,g)\to x\stackrel{g}{\to }y)$
  • and $\mathrm{eq}(f,g)$ is the universal object with this property.

The dual concept is that of coequalizer.

In type theory

In type theory the equalizer

is given by the dependent sum over the dependent equality type

Examples

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

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

Properties