English

Shattering $k$-sets with Permutations

Combinatorics 2023-04-06 v2

Abstract

Many concepts from extremal set theory have analogues for families of permutations. This paper is concerned with the notion of shattering for permutations. A family P\mathcal{P} of permutations of an nn-element set XX shatters a kk-set from XX if it appears in each of the k!k! possible orders in some permutation in P\mathcal{P}. The smallest family P\mathcal{P} which shatters every kk-subset of XX is known to have size Θ(logn)\Theta(\log n). Our aim is to introduce and study two natural partial versions of this shattering problem. Our first main result concerns the case where our family must contain only tt out of k!k! of the possible orders. When k=3k=3 we show that there are three distinct regimes depending on tt: constant, Θ(loglogn)\Theta(\log\log n), Θ(logn)\Theta(\log n). We also show that for larger kk these same regimes exist although they may not cover all values of tt. Our second direction concerns the problem of determining the largest number of kk-sets that can be totally shattered by a family with given size. We show that for any nn, a family of 66 permutations is enough to shatter a proportion between 1742\frac{17}{42} and 1114\frac{11}{14} of all triples.

Keywords

Cite

@article{arxiv.2112.01946,
  title  = {Shattering $k$-sets with Permutations},
  author = {J. Robert Johnson and Belinda Wickes},
  journal= {arXiv preprint arXiv:2112.01946},
  year   = {2023}
}

Comments

25 pages, 0 figures; Revised notation and simplified proofs generally, section 3 has some minor improvements as well as some restructuring

R2 v1 2026-06-24T08:03:14.769Z