Thresholds of Random Quasi-Abelian Codes

Abstract

For a random quasi-abelian code of rate r, it is shown that the GV-bound is a threshold point: if r is less than the GV-bound at δ, then the probability of the relative distance of the random code being greater than δ is almost 1; whereas, if r is bigger than the GV-bound at δ, then the probability is almost 0. As a consequence, there exist many asymptotically good quasi-abelian codes with any parameters attaining the GV-bound.