On the largest minimum distances of [n,6] LCD codes

Abstract

Linear complementary dual (LCD) codes can be used to against side-channel attacks and fault noninvasive attacks. Let da(n,6) and dl(n,6) be the minimum weights of all binary optimal linear codes and LCD codes with length n and dimension 6, respectively.In this article, we aim to obtain the values of dl(n,6) for n≥ 51 by investigating the nonexistence and constructions of LCD codes with given parameters. Suppose that s 0 and 0≤ t≤ 62 are two integers and n=63s+t. Using the theories of defining vectors, generalized anti-codes, reduced codes and nested codes, we exactly determine dl(n,6) for t \21,22,25,26,33,34,37,38,45,46\, while we show that dl(n,6)∈\da(n,6) -1,da(n,6)\ for t∈\21,22,26,34,37,38,46\ and dl(n,6)∈ \da(n,6)-2, da(n,6)-1\ fort∈25,33,45\.