GABORIT, Philippe; ZEMOR, Gilles

doi:10.1109/TIT.2008.928288

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GABORIT, Philippe
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ZEMOR, Gilles
Institut de Mathématiques de Bordeaux [IMB]

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IEEE Transactions on Information Theory. 2008-09, vol. 54, n° 9, p. 3865-3872

Institute of Electrical and Electronics Engineers

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The Gilbert-Varshamov bound states that the maximum size A_2(n,d) of a binary code of length n and minimum distance d satisfies A_2(n,d) >= 2^n/V(n,d-1) where V(n,d) stands for the volume of a Hamming ball of radius d. Recently Jiang and Vardy showed that for binary non-linear codes this bound can be improved to A_2(n,d) >= cn2^n/V(n,d-1) for c a constant and d/n <= 0.499. In this paper we show that certain asymptotic families of linear binary [n,n/2] random double circulant codes satisfy the same improved Gilbert-Varshamov bound.Read less <

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Asymptotic improvement of the Gilbert-Varshamov bound for linear codes

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