Minimum distances of binary optimal LCD codes of dimension five are completely determined

Abstract

Let t ∈ \2,8,10,12,14,16,18\ and n=31s+t≥ 14, da(n,5) and dl(n,5) be distances of binary [n,5] optimal linear codes and optimal linear complementary dual (LCD) codes, respectively. We show that an [n,5,da(n,5)] optimal linear code is not an LCD code, there is an [n,5,dl(n,5)]=[n,5,da(n,5)-1] optimal LCD code if t≠ 16, and an optimal [n,5,dl(n,5)] optimal LCD code has dl(n,5)=16s+6=da(n,5)-2 for t=16. Combined with known results on optimal LCD code, dl(n,5) of all [n,5] LCD codes are completely determined.