Title :
A remark on Plotkin´s bound
Author :
De Launey, Warwick ; Gordon, Daniel M.
Author_Institution :
IDA Center for Commun. Res., San Diego, CA, USA
fDate :
1/1/2001 12:00:00 AM
Abstract :
Let A(n,d) denote the greatest number of codewords possible in a binary block code of length n and distance d. Plotkin gave a simple counting argument which leads to an upper bound B(n,d) for A(n,d) when d>n/2. Levenshtein (1964) proved that if Hadamard´s conjecture is true then Plotkin´s bound is sharp. Though Hadamard´s conjecture is probably true, its resolution remains a difficult open question. So it is natural to ask what one can prove about the ratio R(n,d)=A(n,d)/B(n,d). This note presents an efficient heuristic for constructing, for any d⩾n/2, a binary code which has at least 0.495B(n,d) codewords. A computer calculation confirms that R(n,d)>0.495 for d up to one trillion
Keywords :
Hadamard matrices; binary codes; block codes; Hadamard conjecture; Hadamard matrices; Plotkin bound; binary block code; codewords; upper bound; Binary codes; Block codes; Decoding; Equations; Error correction; Error correction codes; Galois fields; Geometry; Mathematics; Upper bound;
Journal_Title :
Information Theory, IEEE Transactions on
