Improved bounds for induced poset saturation

Abstract

Given a finite poset P, a family F of elements in the Boolean lattice is induced-P-saturated if F contains no copy of P as an induced subposet but every proper superset of F contains a copy of P as an induced subposet. The minimum size of an induced-P-saturated family in the n-dimensional Boolean lattice, denoted sat*(n,P), was first studied by Ferrara et al. (2017). Our work focuses on strengthening lower bounds. For the 4-point poset known as the diamond, we prove sat*(n,D2)≥n, improving upon a logarithmic lower bound. For the antichain with k+1 elements, we prove sat*(n,Ak+1)≥ (1-ok(1))kn2 k, improving upon a lower bound of 3n-1 for k≥ 3.