Induced and non-induced poset saturation problems

Abstract

A subfamily G⊂eq F⊂eq 2[n] of sets is a non-induced (weak) copy of a poset P in F if there exists a bijection i:P→ G such that pP q implies i(p)⊂eq i(q). In the case where in addition pP q holds if and only if i(p)⊂eq i(q), then G is an induced (strong) copy of P in F. We consider the minimum number sat(n,P) [resp.\ sat*(n,P)] of sets that a family F⊂eq 2[n] can have without containing a non-induced [induced] copy of P and being maximal with respect to this property, i.e., the addition of any G∈ 2[n] F creates a non-induced [induced] copy of P. We prove for any finite poset P that sat(n,P) 2|P|-2, a bound independent of the size n of the ground set. For induced copies of P, there is a dichotomy: for any poset P either sat*(n,P) KP for some constant depending only on P or sat*(n,P) 2 n. We classify several posets according to this dichotomy, and also show better upper and lower bounds on sat(n,P) and sat*(n,P) for specific classes of posets. Our main new tool is a special ordering of the sets based on the colexicographic order. It turns out that if P is given, processing the sets in this order and adding the sets greedily into our family whenever this does not ruin non-induced [induced] P-freeness, we tend to get a small size non-induced [induced] P-saturating family.