Difference between revisions of "Category (category theory)"

Revision as of 00:09, 2 September 2008

A category, $\mathcal{C}$ , is a mathematical object consisting of:

A class, $\text{Ob}(\mathcal{C})$ of objects.
For every pair of objects $A,B\in \text{Ob}(\mathcal{C})$ , a class $\text{Hom}(A,B)$ of morphisms from $A$ to $B$ . (We sometimes write $f:A \to B$ to mean $f\in \text{Hom}(A,B)$ .)
For every three objects, , a binary operation called composition, which satisfies:
- (associativity) Given $f:A\to B$ , $g:B\to C$ and $h:C \to D$ we have $h\circ(g\circ f) = (h \circ g)\circ f.$
- (identity) For and object $X$ , there is an identity morphism $1_X:X\to X$ such that for any $f:A\to B$ : $1_B\circ f = f = f\circ 1_A.$

This article is a stub. Help us out by expanding it.

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 ** (associativity) Given <math>f:A\to B</math>, <math>g:B\to C</math> and <math>h:C \to D</math> we have <cmath>h\circ(g\circ f) = (h \circ g)\circ f.</cmath>
 ** (identity) For and object <math>X</math>, there is an identity morphism <math>1_X:X\to X</math> such that for any <math>f:A\to B</math>: <cmath>1_B\circ f = f = f\circ 1_A.</cmath>
+{{stub}}
+[[Category:Category theory]]