English

Diametric problem for permutations with the Ulam metric (optimal anticodes)

Combinatorics 2024-03-05 v1

Abstract

We study the diametric problem (i.e., optimal anticodes) in the space of permutations under the Ulam distance. That is, let SnS_n denote the set of permutations on nn symbols, and for each σ,τSn\sigma, \tau \in S_n, define their Ulam distance as the number of distinct symbols that must be deleted from each until they are equal. We obtain a near-optimal upper bound on the size of the intersection of two balls in this space, and as a corollary, we prove that a set of diameter at most kk has size at most 2k+Ck2/3n!/(nk)!2^{k + C k^{2/3}} n! / (n-k)!, compared to the best known construction of size n!/(nk)!n!/(n-k)!. We also prove that sets of diameter 11 have at most nn elements.

Keywords

Cite

@article{arxiv.2403.02276,
  title  = {Diametric problem for permutations with the Ulam metric (optimal anticodes)},
  author = {Pat Devlin and Leo Douhovnikoff},
  journal= {arXiv preprint arXiv:2403.02276},
  year   = {2024}
}

Comments

11 pages

R2 v1 2026-06-28T15:08:44.170Z