Optimal Ternary Codes with Weight w and Distance 2w-2 in 1-Metric

Abstract

The study of constant-weight codes in 1-metric was motivated by the duplication-correcting problem for data storage in live DNA. It is interesting to determine the maximum size of a code given the length n, weight w, minimum distance d and the alphabet size q. In this paper, based on graph decompositions, we determine the maximum size of ternary codes with constant weight w and distance 2w-2 for all sufficiently large length n. Previously, this was known only for a very sparse family n of density 4/w(w-1).