Poset saturation of unions of chains

Abstract

A family G of sets is a(n induced) copy of a poset P=(P,≤slant) if there exists a bijection b:P→ G such that p≤slant q holds if and only if b(p)⊂eq b(q). The induced saturation number sat*(n,P) is the minimum size of a family F⊂eq 2[n] that does not contain any copy of P, but for any G∈ 2[n] F, the family F \G\ contains a copy of P. We consider sat*(n,P) for posets P that are formed by pairwise incomparable chains, i.e. P=j=1mCij. We make the following two conjectures: (i) sat*(n,P)=O(n) for all such posets and (ii) sat*(n,P)=O(1) if not all chains are of the same size. (The second conjecture is known to hold if there is a unique longest among the chains.) We verify these conjectures in some special cases: we prove (i) if all chains are of the same length, we prove (ii) in the first unknown general case: for posets 2Ck+C1. Finally, we give an infinite number of examples showing that (ii) is not a necessary condition for sat*(n,P)=O(1) among posets P=j=1mCij: we prove sat*(n,(2tt+1)C2)=O(1) for all t 1.