Containment order

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In the mathematical field of order theory, a containment order is the partial order that arises as the subset-containment relation on some collection of objects. In a simple way, every poset P = (≤, X) is (isomorphic to) a containment order (just as every group is isomorphic to a permutation group - see Cayley's theorem). To see this, associate to each element x of X the set

${\displaystyle X_{\leq }(x)=\{y\in X|y\leq x\};}$

then the transitivity of ≤ ensures that for all a and b in X, we have

${\displaystyle X_{\leq }(a)\subseteq X_{\leq }(b){\mbox{ precisely when }}a\leq b.}$

There can be sets ${\displaystyle S}$ of cardinality less than ${\displaystyle |X|}$ such that P is isomorphic to the containment order on S. The size of the smallest possible S is called the 2-dimension of S.

Several important classes of poset arise as containment orders for some natural collections, like the Boolean lattice Qn, which is the collection of all 2n subsets of an n-element set, the interval-containment orders, which are precisely the orders of order dimension at most two, and the dimension-n orders, which are the containment orders on collections of n-boxes anchored at the origin. Other containment orders that are interesting in their own right include the circle orders, which arise from disks in the plane, and the angle orders.