On an acyclic relaxation of incomparable families of sets

Abstract

For two families A, B ⊂eq P([k]), we write A if A⊃eq B for each two sets A ∈ A and B ∈ B. A and B are called incomparable if A and B. Seymour proved that the maximum size of two incomparable equal-sized families in P([k]) is 142k. A sequence of families B1,…,Bl \ ⊂eq P([k]) is called d-exceeding if Bij for all i,j∈ [l] with j-i∈ [d]. Cyclically reusing d+1 pairwise incomparable families yields arbitrarily long d-exceeding sequences of families. We prove inversely that the maximum size of equal-sized families of a sufficiently long 1-exceeding sequence in P([k]) is also 142k. A sequence of sets B1,…,Bl ⊂eq [k] is called d-exceeding if \B1\,…,\Bl\ is d-exceeding, that is, if Bi ⊃eq Bj for all i,j∈ [l] with j-i∈ [d]. We locate the maximum d such that there exist arbitrarily long d-exceeding sequences of subsets of [k] between (1-o(1)) 1e 2k and 122k-2.

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