Dimension of CPT posets

Abstract

A collection of linear orders on X, say L, is said to realize a partially ordered set (or poset) P = (X, ) if, for any two distinct x,y ∈ X, x y if and only if x L y, ∀ L ∈ L. We call L a realizer of P. The dimension of P, denoted by dim(P), is the minimum cardinality of a realizer of P. A containment model MP of a poset P=(X,) maps every x ∈ X to a set Mx such that, for every distinct x,y ∈ X,\ x y if and only if Mx My. We shall be using the collection (Mx)x ∈ X to identify the containment model MP. A poset P=(X,) is a Containment order of Paths in a Tree (CPT poset), if it admits a containment model MP=(Px)x ∈ X where every Px is a path of a tree T, which is called the host tree of the model. We show that if a poset P admits a CPT model in a host tree T of maximum degree and radius r, then dim(P) ≤ + (12 + o(1)) + r + 12 r + 12 π + 3. This bound is asymptotically tight up to an additive factor of (12 , 12 r). Further, let P(1,2;n) be the poset consisting of all the 1-element and 2-element subsets of [n] under `containment' relation and let dim(1,2;n) denote its dimension. The proof of our main theorem gives a simple algorithm to construct a realizer for P(1,2;n) whose cardinality is only an additive factor of at most 32 away from the optimum.