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Inclusion order

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Partial order that arises as the subset-inclusion relation on some collection of objects
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In the mathematical field of order theory, an inclusion order is the partial order that arises as the subset-inclusion relation on some collection of objects. In a simple way, every poset P = (X,≤) is (isomorphic to) an inclusion 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

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

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

X ( a ) X ( b )  precisely when  a b . {\displaystyle X_{\leq (a)}\subseteq X_{\leq (b)}{\text{ precisely when }}a\leq b.}

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

Several important classes of poset arise as inclusion orders for some natural collections, like the Boolean lattice Q, which is the collection of all 2 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.

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