Reflective subcategory

In mathematics, a subcategory A of a category B is said to be reflective in B when the inclusion functor from A to B has a left adjoint. This adjoint is sometimes called a reflector. Dually, A is said to be coreflective in B when the inclusion functor has a right adjoint.

A subcategory A of a category B is said to be reflective in B if for each B-object B there exists an A-object ${\displaystyle A_{B}}$ and a B-morphism ${\displaystyle r_{B}\colon B\to A_{B}}$ such that for each B-morphism ${\displaystyle f\colon B\to A}$ there exists a unique A-morphism ${\displaystyle {\overline {f}}\colon A_{B}\to A}$ with ${\displaystyle {\overline {f}}\circ r_{B}=f}$.

The pair ${\displaystyle (A_{B},r_{B})}$ is called the A-reflection of B. The morphism ${\displaystyle r_{B}}$ is called A-reflection arrow. (Although often, for the sake of brevity, we speak about ${\displaystyle A_{B}}$ only as about the A-reflection of B).

This is equivalent to saying that the embedding functor ${\displaystyle E\colon \mathbf {A} \hookrightarrow \mathbf {B} }$ is adjoint. The coadjoint functor ${\displaystyle R\colon \mathbf {B} \to \mathbf {A} }$ is called the reflector. The map ${\displaystyle r_{B}}$ is the unit of this adjunction.

The reflector assigns to ${\displaystyle B}$ the A-object ${\displaystyle A_{B}}$ and ${\displaystyle Rf}$ for a B-morphism ${\displaystyle f}$ is determined by the commuting diagram

If all A-reflection arrows are (extremal) epimorphisms, then the subcategory A is said to be (extremal) epireflective. Similarly, it is bireflective if all reflection arrows are bimorphisms.

All these notions are special case of the common generalization — ${\displaystyle E}$-reflective subcategory, where ${\displaystyle E}$ is a class of morphisms.

The ${\displaystyle E}$-reflective hull of a class A of objects is defined as the smallest ${\displaystyle E}$-reflective subcategory containing A. Thus we can speak about reflective hull, epireflective hull, extremal epireflective hull, etc.

Dual notions to the above mentioned notions are coreflection, coreflection arrow, (mono)coreflective subcategory, coreflective hull.

• The category of abelian groups Ab is a reflective subcategory of the category of groups, Grp. The reflector is the functor which sends each group to its abelianization. In its turn, the category of groups is a reflective subcategory of the category of inverse semigroups.^[1]
• Similarly, the category of commutative associative algebras is a reflective subcategory of all associative algebras, where the reflector is quotienting out by the commutator ideal. This is used in the construction of the symmetric algebra from the tensor algebra.
• Dually, the category of anti-commutative associative algebras is a reflective subcategory of all associative algebras, where the reflector is quotienting out by the anti-commutator ideal. This is used in the construction of the exterior algebra from the tensor algebra.
• The category of fields is a reflective subcategory of the category of integral domains (with injective ring homomorphisms as morphisms). The reflector is the functor which sends each integral domain to its field of fractions.
• The category of abelian torsion groups is a coreflective subcategory of the category of abelian groups. The coreflector is the functor sending each group to its torsion subgroup.
• The categories of elementary abelian groups, abelian p-groups, and p-groups are all reflective subcategories of the category of groups, and the kernels of the reflection maps are important objects of study; see focal subgroup theorem.
• The category of vector spaces over the field k is a (non full) reflective subcategory of the category of sets. The reflector is the functor which sends each set B in the free vector space generated by B over k, that can be identified with the vector space of all k valued functions on B vanishing outside a finite set. In similar way, several free construction functors are reflectors of the category of sets onto the corresponding reflective subcategory.

• Kolmogorov spaces (T₀ spaces) are a reflective subcategory of Top, the category of topological spaces, and the Kolmogorov quotient is the reflector.
• The category of completely regular spaces CReg is a reflective subcategory of Top. By taking Kolmogorov quotients, one sees that the subcategory of Tychonoff spaces is also reflective.
• The category of all compact Hausdorff spaces is a reflective subcategory of the category of all Tychonoff spaces. The reflector is given by the Stone–Čech compactification.
• The category of all complete metric spaces with uniformly continuous mappings is a reflective and full subcategory of the category of metric spaces. The reflector is the completion of a metric space on objects, and the extension by density on arrows.

• The category of Banach spaces is a reflective and full subcategory of the category of normed spaces and bounded linear operators. The reflector is the norm completion functor.

• For any Grothendieck site (C,J), the topos of sheaves on (C,J) is a reflective subcategory of the topos of presheaves on C, with the special further property that the reflector functor is left exact. The reflector is the sheafification functor a: Presh(C) → Sh(C,J), and the adjoint pair (a,i) is an important example of a geometric morphism in topos theory.

• Adámek, Jiří; Horst Herrlich; George E. Strecker (1990). Abstract and Concrete Categories (PDF). New York: John Wiley & Sons.{{cite book}}: CS1 maint: multiple names: authors list (link) CS1 maint: numeric names: authors list (link)
• Peter Freyd, Andre Scedrov (1990). Categories, Allegories. Mathematical Library Vol 39. North-Holland. ISBN 978-0-444-70368-2.
• Herrlich, Horst (1968). Topologische Reflexionen und Coreflexionen. Lecture Notes in Math. 78. Berlin: Springer.
• Mark V. Lawson (1998). Inverse semigroups: the theory of partial symmetries. World Scientific. ISBN 978-981-02-3316-7.