On the minimum weights of binary LCD codes and ternary LCD codes

Abstract

Linear complementary dual (LCD) codes are linear codes that intersect with their dual codes trivially. We study the largest minimum weight d2(n,k) among all binary LCD [n,k] codes and the largest minimum weight d3(n,k) among all ternary LCD [n,k] codes. The largest minimum weights d2(n,5) and d3(n,4) are partially determined. We also determine the largest minimum weights d2(n,n-5), d3(n,n-i) for i ∈ \2,3,4\, and d3(n,k) for n ∈ \11,12,…,19\.