Optimal Embeddings of Posets in Hypercubes

Abstract

Given a finite poset P, the hypercube-height, denoted by h*( P), is defined to be the largest h such that, for any natural number n, the subsets of [n] of size less than h do not contain an induced copy of P. The hypercube-width, denoted by w*( P), is the smallest w such that the subsets of [w] of size at most h*( P) contain an induced copy of P. In other words, h*( P) asks how `low' can a poset be embedded, and w*( P) asks for the first hypercube in which such an `optimal' embedding occurs. These notions were introduced by Bastide, Groenland, Ivan and Johnston in connection to upper bounds for the poset saturation numbers. While it is not hard to see that h*( P)≤ | P|-1 (and this bound can be tight), the hypercube-width has proved to be much more elusive. It was shown by the authors mentioned above that w*( P)≤| P|2/4, but they conjectured that in fact w*( P)≤ | P| for any finite poset P. In this paper we prove this conjecture. The proof uses Hall's theorem for bipartite graphs as a precision tool for modifing an existing copy of our poset.