Category theory: Difference between revisions
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imported>Giovanni Antonio DiMatteo |
imported>Giovanni Antonio DiMatteo |
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#For objects <math>A,B,C\in ob(C)</math>, a set <math>\text{Mor}_{C}(A,B)</math> such that <math>\text{Mor}_{C}(A,B)\cap \text{Mor}_{C}(A',B')</math> is empty if <math>A\neq A'</math> and <math>B\neq B'</math> | #For objects <math>A,B,C\in ob(C)</math>, a set <math>\text{Mor}_{C}(A,B)</math> such that <math>\text{Mor}_{C}(A,B)\cap \text{Mor}_{C}(A',B')</math> is empty if <math>A\neq A'</math> and <math>B\neq B'</math> | ||
together with a "law of composition": <math>\circ :\text{Mor}_{\mathscr{C}}(B,C)\times\text{Mor}_{C}(A,B)\to \text{Mor}_{C}(A,C)</math> | together with a "law of composition": <math>\circ :\text{Mor}_{\mathscr{C}}(B,C)\times\text{Mor}_{C}(A,B)\to \text{Mor}_{C}(A,C)</math> which we denote by <math>(g,f)\mapsto g\circ f</math> having the following properties: | ||
## | ##Associativity: <math>(h\circ g)\circ f= h\circ (g\circ f)</math> whenever the compositions are defined | ||
## | ##Identity: for every object <math>A\in ob(C)</math> there is an element <math>id_{A}</math> such that for all <math>f\in\text{Mor}_{C}(A,B)</math>, <math>id_{B}\circ f = f</math> and <math>f\circ id_{A}=f</math>. | ||
==Examples== | ==Examples== |
Revision as of 07:58, 1 January 2008
Category theory
Definition
A category consists of the following data:
- A class of "objects," denoted
- For objects , a set such that is empty if and
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 having the following properties:
- Associativity: whenever the compositions are defined
- Identity: for every object there is an element such that for all , and .
Examples
- The category of sets:
- The category of topological spaces:
- 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.
- The category of schemes is one of the principal objects of study