Self-Dual Codes better than the Gilbert--Varshamov bound
Abstract
We show that every self-orthogonal code over Fq of length n can be extended to a self-dual code, if there exists self-dual codes of length n. Using a family of Galois towers of algebraic function fields we show that over any nonprime field Fq, with q≥ 64, except possibly q=125, there are self-dual codes better than the asymptotic Gilbert--Varshamov bound.
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