Optimal codes with small constant weight in 1-metric

Abstract

Motivated by the duplication-correcting problem for data storage in live DNA, we study the construction of constant-weight codes in 1-metric. By using packings and group divisible designs in combinatorial design theory, we give constructions of optimal codes over non-negative integers and optimal ternary codes with 1-weight w≤ 4 for all possible distances. In general, we derive the size of the largest ternary code with constant weight w and distance 2w-2 for sufficiently large length n satisfying n 1,w,-w+2,-2w+3w(w-1).