Asymptotic Improvement of the Gilbert-Varshamov Bound on the Size of Permutation Codes

Abstract

Given positive integers n and d, let M(n,d) denote the maximum size of a permutation code of length n and minimum Hamming distance d. The Gilbert-Varshamov bound asserts that M(n,d) ≥ n!/V(n,d-1) where V(n,d) is the volume of a Hamming sphere of radius d in n. Recently, Gao, Yang, and Ge showed that this bound can be improved by a factor ( n), when d is fixed and n ∞. Herein, we consider the situation where the ratio d/n is fixed and improve the Gilbert-Varshamov bound by a factor that is linear in n. That is, we show that if d/n < 0.5, then M(n,d)≥ cn\,n!V(n,d-1) where c is a positive constant that depends only on d/n. To establish this result, we follow the method of Jiang and Vardy. Namely, we recast the problem of bounding M(n,d) into a graph-theoretic framework and prove that the resulting graph is locally sparse.