# Functor

*For functors in computer science, see the function object article.*

In category theory, a **functor** is a special type of mapping between categories. Functors can be thought of as morphisms in the category of small categories.

Functors were first considered in algebraic topology, where algebraic objects (like the fundamental group) are associated to topological spaces, and algebraic homomorphisms are associated to continuous maps. Nowadays, functors are used throughout modern mathematics to relate various categories.

## Contents

## Definition

Let *C* and *D* be categories. A **functor** *F* from *C* to *D* is a mapping that

- associates to each object
*X*in*C*an object*F*(*X*) in*D*, - associates to each morphism
*f*:*X*→*Y*in*C*a morphism*F*(*f*) :*F*(*X*) →*F*(*Y*) in*D*

such that the following two properties hold:

- for every object
- for all morphisms and .

That is, functors must preserve identity morphisms and composition of morphism.

### Covariance and contravariance

There are many constructions in mathematics which would be functors but for the fact that they "turn morphisms around" and "reverse composition". We then define a **contravariant functor** *F* from *C* to *D* as a mapping that

- associates to each object an object ,
- associates to each morphism a morphism such that
- for every object ,
- for all morphisms and .

Note that contravariant functors reverse the direction of composition.

Ordinary functors are also called **covariant functors** in order to distinguish them from contravariant ones. Note that one can also define a contravariant functor as a *covariant* functor on the dual category . Some authors prefer to write all expressions covariantly. That is, instead of saying is a contravariant functor, they simply write (or sometimes ) and call it a functor.

Contravariant functors are also occasionally called *cofunctors*. This is an incorrect usage of the prefix "co", which in a categorical context usually means "reverse all arrows". Recall that a functor *F* maps a morphism *f*:*X*→*Y* to a morphism *F(f)*:*F(X)*→*F(Y)*. Reversing all the arrows would map morphisms *f*:*X*←*Y* to morphisms *F(f)*:*F(X)*←*F(Y)*, but by transposing *X* and *Y* we see that this gives the same object as before. Consequently a cofunctor, properly speaking, is the same type of object as a functor.

## Examples

**Constant functor:** A very boring functor *C* → *D* is one which maps every object of *C* to a fixed object *X* in *D* and every morphism in *C* to the identity morphism on *X*. Such a functor is called a *constant* or *selection* functor.

**Power sets:** The power set functor *P* : **Set** → **Set** maps each set to its power set and each function to the map which sends to its image . One can also consider the contravariant power set functor which sends *f* to the map which sends *U* to its inverse image in *Y*.

**Dual vector space:** The map which assigns to every vector space its dual space and to every linear map its dual or transpose is a contravariant functor from the category of all vector spaces over a fixed field to itself.

**Fundamental group:** Consider the category of pointed topological spaces, i.e. topological spaces with distinguished points. The objects are pairs (*X*, *x*_{0}), where *X* is a topological space and *x*_{0} is a point in *X*. A morphism from (*X*, *x*_{0}) to (*Y*, *y*_{0}) is given by a continuous map *f* : *X* → *Y* with *f*(*x*_{0}) = *y*_{0}.

To every topological space *X* with distinguished point *x*_{0}, one can define the fundamental group based at *x*_{0}, denoted π_{1}(*X*, *x*_{0}). This is the group of homotopy classes of loops based at *x*_{0}. If *f* : *X* → *Y* morphism of pointed spaces, then every loop in *X* with base point *x*_{0} can be composed with *f* to yield a loop in *Y* with base point *y*_{0}. This operation is compatible with the homotopy equivalence relation and the composition of loops, and we get a group homomorphism from π(*X*, *x*_{0}) to π(*Y*, *y*_{0}). We thus obtain a functor from the category of pointed topological spaces to the category of groups.

In the category of topological spaces (without distinguished point), one considers homotopy classes of generic curves, but they cannot be composed unless they share an endpoint. Thus one has the **fundamental groupoid** instead of the fundamental group, and this construction is functorial.

**Algebra of continuous functions:** a contravariant functor from the category of topological spaces (with continuous maps as morphisms) to the category of real associative algebras is given by assigning to every topological space *X* the algebra C(*X*) of all real-valued continuous functions on that space. Every continuous map *f* : *X* → *Y* induces an algebra homomorphism C(*f*) : C(*Y*) → C(*X*) by the rule C(*f*)(φ) = φ o *f* for every φ in C(*Y*).

**Tangent and cotangent bundles:** The map which sends every differentiable manifold to its tangent bundle and every smooth map to its derivative is a covariant functor from the category of differentiable manifolds to the category of vector bundles. Likewise, the map which sends every differentiable manifold to its cotangent bundle and every smooth map to its pullback is a contravariant functor.

Doing these constructions pointwise gives covariant and contravariant functors from the category of pointed differentiable manifolds to the category of real vector spaces.

**Group actions/representations:** Every group *G* can be considered as a category (or groupoid) with a single object. A functor from *G* to **Set** is nothing but a group action of *G* on a particular set, i.e. a *G*-set. Likewise, a functor from *G* to the category of vector spaces, **Vect**_{K}, is a linear representation of *G*. In general, a functor *G* → *C* can be considered as an "action" of *G* on an object in the category *C*.

**Lie algebras:** Assigning to every real (complex) Lie group its real (complex) Lie algebra defines a functor.

**Tensor products:** If *C* denotes the category of vector spaces over a fixed field, with linear maps as morphisms, then the tensor product defines a functor *C* × *C* → *C* which is covariant in both arguments.

**Forgetful functors:** The functor *U* : **Grp** → **Set** which maps a group to its underlying set and a group homomorphism to its underlying function of sets is a functor. Functors like these, which "forget" some structure, are termed *forgetful functors*. Another example is the functor **Rng** → **Ab** which maps a ring to its underlying additive abelian group. Morphisms in **Rng** (ring homomorphisms) become morphisms in **Ab** (abelian group homomorphisms).

**Free functors:** Going in the opposite direction of forgetful functors are free functors. The free functor *F* : **Set** → **Grp** sends every set *X* to the free group generated by *X*. Functions get mapped to group homomorphisms between free groups. Free constructions exist for many categories based on structured sets. See free object.

**Homomorphism groups:** To every pair *A*, *B* of abelian groups one can assign the abelian group Hom(*A*,*B*) consisting of all group homomorphisms from *A* to *B*. This is a functor which is contravariant in the first and covariant in the second argument, i.e. it is a functor **Ab**^{op} × **Ab** → **Ab** (where **Ab** denotes the category of abelian groups with group homomorphisms). If *f* : *A*_{1} → *A*_{2} and *g* : *B*_{1} → *B*_{2} are morphisms in **Ab**, then the group homomorphism Hom(*f*,*g*) : Hom(*A*_{2},*B*_{1}) → Hom(*A*_{1},*B*_{2}) is given by φ `|->` *g* o φ o *f*. See Hom functor.

**Representable functors:** We can generalize the previous example to any category *C*. To every pair *X*, *Y* of objects in *C* one can assign the set Mor(*X*,*Y*) of morphisms from *X* to *Y*. This defines a functor to **Set** which is contravariant in the first argument and covariant in the second, i.e. it is a functor *C*^{op} × *C* → **Set**. If *f* : *X*_{1} → *X*_{2} and *g* : *Y*_{1} → *Y*_{2} are morphisms in *C*, then the group homomorphism Mor(*f*,*g*) : Mor(*X*_{2},*Y*_{1}) → Mor(*X*_{1},*Y*_{2}) is given by φ `|->` *g* o φ o *f*.

Functors like these are called representable functors. A major goal in many settings is to determine whether a given functor is representable.

**Presheaves:** If *X* is a topological space, then the open sets in *X* form a partially ordered set Open(*X*) under inclusion. Like every partially ordered set, Open(*X*) forms a small category by adding a single arrow *U* → *V* if and only if . Contravariant functors on Open(*X*) are called *presheaves* on *X*. For instance, by assigning to every open set *U* the associative algebra of real-valued continuous functions on *U*, one obtains a presheaf of algebras on *X*.

## Properties

Two important consequences of the functor axioms are:

*F*transforms each commutative diagram in*C*into a commutative diagram in*D*;- if
*f*is an isomorphism in*C*, then*F*(*f*) is an isomorphism in*D*.

On any category *C* one can define the **identity functor** 1_{C} which maps each object and morphism to itself. One can also compose functors, i.e. if *F* is a functor from *A* to *B* and *G* is a functor from *B* to *C* then one can form the composite functor *GF* from *A* to *C*. Composition of functors is associative where defined. This shows that functors can be considered as morphisms in categories of categories.

A category with a single object is equivalent to a monoid whose elements are morphisms and whose operation is composition. Functors between monoids, considered as categories, are nothing more than monoid homomorphisms. So in a sense, functors between arbitrary categories are a kind of generalization of monoid homomorphisms to categories with more than one object.

## Relation to other categorical concepts

Functors themselves can be considered as objects in a category called a functor category. Morphisms in this category are natural transformations between functors.

Functors are often defined by universal properties; examples are the tensor product, the direct sum and direct product of groups or vector spaces, construction of free groups and modules, direct and inverse limits. The concepts of limit and colimit generalize several of the above.

Universal constructions often give rise to pairs of adjoint functors.

## See also

- faithful functor a functor which is injective on the set of morphisms with given domain and codomain
- forgetful functor a forgetful functor takes a set with structures to the underlying set with fewer or none of its structures
- full functor a functor which is surjective on the set of morphisms with given domain and codomain
- adjoint functors
*F*and*G*are adjoint if Hom(*FX*,*Y*)≅Hom(*X*,*GY*) - additive functor a functor between categories whose hom-sets are abelian groups is additive if it is a group homomorphism of the hom-sets
- exact functor takes short exact sequences to short exact sequences
- derived functor the image of a short exact sequence under a functor that is only half-exact can be extended to a long exact sequence. the objects of which are images of a derived functor
- enriched functor
- Kan extension