Sizes of witnesses in Covtree

Abstract

Given a set of k unlabelled posets, each of size n, we say that a poset Q is a witness to if is the set of downsets of size n of Q. We say that Q is a minimal witness if it does not contain a proper downset that is itself a witness to . Motivated by the causal set approach to quantum gravity, we study the upper bound on the size of minimal witnesses as a function of n and k. We show that there is no linear upper bound of the form n+k+c for any constant c. We introduce the exchange graph of downsets as a new tool to study this scenario, and use it to show that all minimal witnesses Q satisfy the bound |Q|≤ nk-n, and that when k=3 there is at least one minimal witness Q that satisfies the bound |Q|≤ 32(n+1).