Saturation for the Butterfly Poset

Abstract

Given a finite poset P, we call a family F of subsets of [n] P-saturated if F does not contain an induced copy of P, but adding any other set to F creates an induced copy of P. The induced saturated number of P, denoted by sat*(n, P), is the size of the smallest P-saturated family with ground set [n]. In this paper we are mainly interested in the four-point poset called the butterfly. Ferrara, Kay, Kramer, Martin, Reiniger, Smith and Sullivan showed that the saturation number for the butterfly lies between 2n and n2. We give a linear lower bound of n+1. We also prove some other results about the butterfly and the poset N.