Category theory

Category theory

Definition

A category consists of the following data:

1. A class of "objects," denoted ${\displaystyle ob(C)}$
2. For objects ${\displaystyle A,B,C\in ob(C)}$, a set ${\displaystyle {\text{Mor}}_{C}(A,B)}$ such that ${\displaystyle {\text{Mor}}_{C}(A,B)\cap {\text{Mor}}_{C}(A',B')}$ is empty if ${\displaystyle A\neq A'}$ and ${\displaystyle B\neq B'}$

together with a "law of composition": Failed to parse (unknown function "\mathscr"): {\displaystyle \circ :\text{Mor}_{\mathscr{C}}(B,C)\times\text{Mor}_{C}(A,B)\to \text{Mor}_{C}(A,C)} which we denote by ${\displaystyle (g,f)\mapsto g\circ f}$ having the following properties:

1. 1. Associativity: ${\displaystyle (h\circ g)\circ f=h\circ (g\circ f)}$ whenever the compositions are defined
   2. Identity: for every object ${\displaystyle A\in ob(C)}$ there is an element ${\displaystyle id_{A}}$ such that for all ${\displaystyle f\in {\text{Mor}}_{C}(A,B)}$, ${\displaystyle id_{B}\circ f=f}$ and ${\displaystyle f\circ id_{A}=f}$.

Examples

1. The category of sets:
2. The category of topological spaces:
3. The category of functors: if Failed to parse (unknown function "\mathscr"): {\displaystyle \mathscr{C}} and Failed to parse (unknown function "\mathscr"): {\displaystyle \mathscr{D}} are two

categories, then there is a category consisting of all contravarient functors from Failed to parse (unknown function "\mathscr"): {\displaystyle \mathscr{C}} to Failed to parse (unknown function "\mathscr"): {\displaystyle \mathscr{D}} , where morphisms are natural transformations.

1. The category of schemes is one of the principal objects of study