Reflective subcategory

A full 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 ${\displaystyle f\colon B\to A}$ to an A-object ${\displaystyle A}$ 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 the A-reflection arrow. (Although often, for the sake of brevity, we speak about ${\displaystyle A_{B}}$ only as being the A-reflection of B).

This is equivalent to saying that the embedding functor ${\displaystyle E\colon \mathbf {A} \hookrightarrow \mathbf {B} }$ is a right adjoint. The left adjoint 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.

An anti-reflective subcategory is a full subcategory A such that the only objects of B that have an A-reflection arrow are those that are already in A.

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

• The components of the counit are isomorphisms.[2]^:140[1]
• If D is a reflective subcategory of C, then the inclusion functor D → C creates all limits that are present in C.[2]^:141
• A reflective subcategory has all colimits that are present in the ambient category.[2]^:141
• The monad induced by the reflector/localization adjunction is idempotent.[2]^:158

• Adámek, Jiří; Horst Herrlich; George E. Strecker (1990). Abstract and Concrete Categories (PDF). New York: John Wiley & Sons.
• 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.