Improved efficiency for covering codes matching the sphere-covering bound

Abstract

A covering code is a subset C ⊂eq \0,1\n with the property that any z ∈ \0,1\n is close to some c ∈ C in Hamming distance. For every ε,δ>0, we show a construction of a family of codes with relative covering radius δ + ε and rate 1 - H(δ) with block length at most (O((1/ε) (1/ε))) for every ε > 0. This improves upon a folklore construction which only guaranteed codes of block length (1/ε2). The main idea behind this proof is to find a distribution on codes with relatively small support such that most of these codes have good covering properties.