Semidefinite lower bounds for covering codes
Abstract
Let denote the minimum size of a -ary covering code of word length and covering radius . In other words, is the minimum size of a set of -ary codewords of length such that the Hamming balls of radius around the codewords cover the Hamming space . The special case is often referred to as the football pool problem, as it is equivalent to finding a set of forecasts on football matches that is guaranteed to contain a forecast with at most one wrong outcome. In this paper, we build and expand upon the work of Gijswijt (2005), who introduced a semidefinite programming lower bound on via matrix cuts. We develop techniques that strengthen this bound, by introducing new semidefinite constraints inspired by Lasserre's hierarchy for 0-1 programs and symmetry reduction methods, and a more powerful objective function. The techniques lead to sharper lower bounds, setting new records across a broad range of values of , , and .
Cite
@article{arxiv.2504.01932,
title = {Semidefinite lower bounds for covering codes},
author = {Dion Gijswijt and Sven Polak},
journal= {arXiv preprint arXiv:2504.01932},
year = {2025}
}