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Difference between revisions of "SFN:Math-test"


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$
 
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{{defn|name=Definition 1|note=Definition of set-based categories|label=df:sbcat
 
{{defn|name=Definition 1|note=Definition of set-based categories|label=df:sbcat
|Let $\cc$ be a small category and let $U:\cc\to\set$ be a functor. We
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|statement=Let $\cc$ be a small category and let $U:\cc\to\set$ be a functor. We
 
say that $\cc$ is ''set-based'' ($\sbcat$ for short) with respect
 
say that $\cc$ is ''set-based'' ($\sbcat$ for short) with respect
 
to $U$ if the pair $(\cc,U)$ satisfy the following:
 
to $U$ if the pair $(\cc,U)$ satisfy the following:

Revision as of 05:48, 29 March 2014

$ \newcommand\cc{\mathcal{C}} \newcommand\set{\mathsf{Set}} \newcommand\sbcat{\mathit{Category}}

$

Definition 1  (Definition of set-based categories)

Let $\cc$ be a small category and let $U:\cc\to\set$ be a functor. We

say that $\cc$ is set-based ($\sbcat$ for short) with respect to $U$ if the pair $(\cc,U)$ satisfy the following:

(Sb:a) $U$ is an embedding.

(Sb:b) $U(\im f)=\im U(f)$ for all $f\in\cc$.

(Sb:c) The functor $U$ has the following property: for $c,c'\in\vrt

\cc$ and $x\in U(c)\cap U(c')$ there is $d\in\vrt\cc$ such that

Notice that the condition (Sb:b) implies that the functor $U$ preserves image--factorizations: