The Saturation Number for the Diamond is Linear

Abstract

For a fixed poset P we say that a family F⊂eq P([n]) is P-saturated if it does not contain an induced copy of P, but whenever we add a new set to F, we form an induced copy of P. The size of the smallest such family is denoted by sat*(n, P). For the diamond poset D2 (the two-dimensional Boolean lattice), while it is easy to see that the saturation number is at most n+1, the best known lower bound has stayed at O( n) since the introduction of the area of poset saturation. In this paper we prove that sat*(n, D2)≥ n+15, establishing that the saturation number for the diamond is linear. The proof uses a result about certain pairs of set systems.