Closure operator

In mathematics, a closure operator on a set S is a function $\operatorname {cl} :{\mathcal {P}}(S)\rightarrow {\mathcal {P}}(S)$ from the power set of S to itself that satisfies the following conditions for all sets $X,Y\subseteq S$

$X\subseteq \operatorname {cl} (X)$	(cl is extensive),
$X\subseteq Y\Rightarrow \operatorname {cl} (X)\subseteq \operatorname {cl} (Y)$	(cl is increasing),
$\operatorname {cl} (\operatorname {cl} (X))=\operatorname {cl} (X)$	(cl is idempotent).

Closure operators are determined by their closed sets, i.e., by the sets of the form cl(X), since the closure cl(X) of a set X is the smallest closed set containing X. Such families of "closed sets" are sometimes called closure systems or "Moore families".^[1] A set together with a closure operator on it is sometimes called a closure space. Closure operators are also called "hull operators", which prevents confusion with the "closure operators" studied in topology.

^ Diatta, Jean (2009-11-14). "On critical sets of a finite Moore family". Advances in Data Analysis and Classification. 3 (3): 291–304. doi:10.1007/s11634-009-0053-8. ISSN 1862-5355. S2CID 26138007.

[1] Diatta, Jean (2009-11-14). "On critical sets of a finite Moore family". Advances in Data Analysis and Classification. 3 (3): 291–304. doi:10.1007/s11634-009-0053-8. ISSN 1862-5355. S2CID 26138007.

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