Upper bound on list-decoding radius of binary codes

Consider the problem of packing Hamming balls of a given relative radius subject to the constraint that they cover any point of the ambient Hamming space with multiplicity at most L. For odd L ≥ 3 an asymptotic upper bound on the rate of any such packing is proven. The resulting bound improves the b...

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Vydané v:	Proceedings / IEEE International Symposium on Information Theory s. 2231 - 2235
Hlavný autor:	Polyanskiy, Yury
Médium:	Konferenčný príspevok.. Journal Article
Jazyk:	English
Vydavateľské údaje:	IEEE 01.06.2015
Predmet:	Asymptotic properties Binary codes Combinatorial coding theory converse bounds Decoding Estimates Information theory Joints list-decoding Polynomials Programming Slopes Thresholds Tin Upper bound Upper bounds
ISSN:	2157-8095, 2157-8117
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Popis
Shrnutí:	Consider the problem of packing Hamming balls of a given relative radius subject to the constraint that they cover any point of the ambient Hamming space with multiplicity at most L. For odd L ≥ 3 an asymptotic upper bound on the rate of any such packing is proven. The resulting bound improves the best known bound (due to Blinovsky' 1986) for rates below a certain threshold. The method is a superposition of the linear- programming idea of Ashikhmin, Barg and Litsyn (that was used previously to improve the estimates of Blinovsky for L = 2) and a Ramsey-theoretic technique of Blinovsky. As an application it is shown that for all odd L the slope of the rate-radius tradeoff is zero at zero rate.
Bibliografia:	ObjectType-Article-2 SourceType-Scholarly Journals-1 ObjectType-Conference-1 ObjectType-Feature-3 content type line 23 SourceType-Conference Papers & Proceedings-2
ISSN:	2157-8095 2157-8117
DOI:	10.1109/ISIT.2015.7282852