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Minimum saturated families of sets
We call a family F of subsets of [n] s‐saturated if it contains no s pairwise disjoint sets, and moreover no set can be added to F while preserving this property (here [n]={1,…,n}). More than 40 years ago, Erdős and Kleitman conjectured that an s‐saturated family of subsets of [n] has size at least...
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| Published in: | The Bulletin of the London Mathematical Society 2018-08, Vol.50 (4), p.725-732 |
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| Main Authors: | , , , |
| Format: | Article |
| Language: | English |
| Subjects: | |
| Citations: | Items that this one cites Items that cite this one |
| Online Access: | Get full text |
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| Summary: | We call a family F of subsets of [n] s‐saturated if it contains no s pairwise disjoint sets, and moreover no set can be added to F while preserving this property (here [n]={1,…,n}).
More than 40 years ago, Erdős and Kleitman conjectured that an s‐saturated family of subsets of [n] has size at least (1−2−(s−1))2n. It is easy to show that every s‐saturated family has size at least 12·2n, but, as was mentioned by Frankl and Tokushige, even obtaining a slightly better bound of (1/2+ε)2n, for some fixed ε>0, seems difficult. In this note, we prove such a result, showing that every s‐saturated family of subsets of [n] has size at least (1−1/s)2n.
This lower bound is a consequence of a multipartite version of the problem, in which we seek a lower bound on |F1|+⋯+|Fs| where F1,…,Fs are families of subsets of [n], such that there are no s pairwise disjoint sets, one from each family Fi, and furthermore no set can be added to any of the families while preserving this property. We show that |F1|+⋯+|Fs|⩾(s−1)·2n, which is tight, for example, by taking F1 to be empty, and letting the remaining families be the families of all subsets of [n]. |
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| ISSN: | 0024-6093 1469-2120 |
| DOI: | 10.1112/blms.12184 |