English

New Lower Bounds for Permutation Arrays Using Contraction

Combinatorics 2018-09-12 v3 Information Theory math.IT

Abstract

A permutation array AA is a set of permutations on a finite set Ω\Omega, say of size nn. Given distinct permutations π,σΩ\pi, \sigma\in \Omega, we let hd(π,σ)={xΩ:π(x)σ(x)}hd(\pi, \sigma) = |\{ x\in \Omega: \pi(x) \ne \sigma(x) \}|, called the Hamming distance between π\pi and σ\sigma. Now let hd(A)=hd(A) = min{hd(π,σ):π,σA}\{ hd(\pi, \sigma): \pi, \sigma \in A \}. For positive integers nn and dd with dnd\le n, we let M(n,d)M(n,d) be the maximum number of permutations in any array AA satisfying hd(A)dhd(A) \geq d. There is an extensive literature on the function M(n,d)M(n,d), motivated in part by suggested applications to error correcting codes for message transmission over power lines. A basic fact is that if a permutation group GG is sharply kk-transitive on a set of size nkn\geq k, then M(n,nk+1)=GM(n,n-k+1) = |G|. Motivated by this we consider the permutation groups AGL(1,q)AGL(1,q) and PGL(2,q)PGL(2,q) acting sharply 22-transitively on GF(q)GF(q) and sharply 33-transitively on GF(q){}GF(q)\cup \{\infty\} respectively. Applying a contraction operation to these groups, we obtain the following new lower bounds for prime powers qq satisfying q1q\equiv 1 (mod 33). 1. M(q1,q3)(q21)/2M(q-1,q-3)\geq (q^{2} - 1)/2 for qq odd, q7q\geq 7, 2. M(q1,q3)(q1)(q+2)/3M(q-1,q-3)\geq (q-1)(q+2)/3 for qq even, q8q\geq 8, 3. M(q,q3)Kq2logqM(q,q-3)\geq Kq^{2}\log q for some constant KK if qq is odd, q13q\geq 13. These results resolve a case left open in a previous paper \cite{BLS}, where it was shown that M(q1,q3)q2qM(q-1, q-3) \geq q^{2} - q and M(q,q3)q3qM(q,q-3) \geq q^{3} - q for all prime powers qq such that q≢1q\not \equiv 1 (mod 33). We also obtain lower bounds for M(n,d)M(n,d) for a finite number of exceptional pairs n,dn,d, by applying this contraction operation to the sharply 44 and 55-transitive Mathieu groups.

Keywords

Cite

@article{arxiv.1804.03768,
  title  = {New Lower Bounds for Permutation Arrays Using Contraction},
  author = {Sergey Bereg and Zevi Miller and Luis Gerardo Mojica and Linda Morales and I. H. Sudborough},
  journal= {arXiv preprint arXiv:1804.03768},
  year   = {2018}
}
R2 v1 2026-06-23T01:19:57.908Z