Exact antichain saturation numbers via a generalisation of a result of Lehman-Ron
Abstract
For given positive integers k and n, a family F of subsets of \1,…,n\ is k-antichain saturated if it does not contain an antichain of size k, but adding any set to F creates an antichain of size k. We use sat*(n, k) to denote the smallest size of such a family. For all k and sufficiently large n, we determine the exact value of sat*(n, k). Our result implies that sat*(n, k)=n(k-1)-(k k), which confirms several conjectures on antichain saturation. Previously, exact values for sat*(n,k) were only known for k up to 6. We also prove a generalisation of a result of Lehman-Ron which may be of independent interest. We show that given m disjoint chains in the Boolean lattice, we can create m disjoint skipless chains that cover the same elements (where we call a chain skipless if any two consecutive elements differ in size by exactly one).
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