Upper bound on list-decoding radius of binary codes
Information Theory
2015-12-29 v3 Discrete Mathematics
Combinatorics
math.IT
Abstract
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 . For odd an asymptotic upper bound on the rate of any such packing is proven. Resulting bound improves the best known bound (due to Blinovsky'1986) for rates below a certain threshold. 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 ) and a Ramsey-theoretic technique of Blinovsky. As an application it is shown that for all odd the slope of the rate-radius tradeoff is zero at zero rate.
Keywords
Cite
@article{arxiv.1409.7765,
title = {Upper bound on list-decoding radius of binary codes},
author = {Yury Polyanskiy},
journal= {arXiv preprint arXiv:1409.7765},
year = {2015}
}
Comments
IEEE Trans. Inform. Theory, accepted