Self-dual 2-quasi Negacyclic Codes over Finite Fields
Abstract
In this paper, we investigate the existence and asymptotic property of self-dual 2-quasi negacyclic codes of length 2n over a finite field of cardinality q. When n is odd, we show that the q-ary self-dual 2-quasi negacyclic codes exist if and only if q\,-\!1~( mod~4). When n is even, we prove that the q-ary self-dual 2-quasi negacyclic codes always exist. By using the technique introduced in this paper, we prove that q-ary self-dual 2-quasi negacyclic codes are asymptotically good.
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