New Lower Bounds for Permutation Arrays Using Contraction
Abstract
A permutation array is a set of permutations on a finite set , say of size . Given distinct permutations , we let , called the Hamming distance between and . Now let min. For positive integers and with , we let be the maximum number of permutations in any array satisfying . There is an extensive literature on the function , 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 is sharply -transitive on a set of size , then . Motivated by this we consider the permutation groups and acting sharply -transitively on and sharply -transitively on respectively. Applying a contraction operation to these groups, we obtain the following new lower bounds for prime powers satisfying (mod ). 1. for odd, , 2. for even, , 3. for some constant if is odd, . These results resolve a case left open in a previous paper \cite{BLS}, where it was shown that and for all prime powers such that (mod ). We also obtain lower bounds for for a finite number of exceptional pairs , by applying this contraction operation to the sharply and -transitive Mathieu groups.
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}
}