Boolean dimension and tree-width

Abstract

The dimension is a key measure of complexity of partially ordered sets. Small dimension allows succinct encoding. Indeed if P has dimension d, then to know whether x ≤ y in P it is enough to check whether x≤ y in each of the d linear extensions of a witnessing realizer. Focusing on the encoding aspect Nesetril and Pudl\'ak defined a more expressive version of dimension. A poset P has boolean dimension at most d if it is possible to decide whether x ≤ y in P by looking at the relative position of x and y in only d permutations of the elements of P. We prove that posets with cover graphs of bounded tree-width have bounded boolean dimension. This stays in contrast with the fact that there are posets with cover graphs of tree-width three and arbitrarily large dimension. This result might be a step towards a resolution of the long-standing open problem: Do planar posets have bounded boolean dimension?