Lower bounds for superpatterns and universal sequences
Combinatorics
2021-02-03 v2
Abstract
A permutation is said to be -universal or a -superpattern if for every , there is a subsequence of that is order-isomorphic to . A simple counting argument shows that can be a -superpattern only if , and Arratia conjectured that this lower bound is best-possible. Disproving Arratia's conjecture, we improve the trivial bound by a small constant factor. We accomplish this by designing an efficient encoding scheme for the patterns that appear in . This approach is quite flexible and is applicable to other universality-type problems; for example, we also improve a bound by Engen and Vatter on a problem concerning -ary sequences which contain all -permutations.
Cite
@article{arxiv.2004.02375,
title = {Lower bounds for superpatterns and universal sequences},
author = {Zachary Chroman and Matthew Kwan and Mihir Singhal},
journal= {arXiv preprint arXiv:2004.02375},
year = {2021}
}
Comments
12 pages