List-decodable zero-rate codes

Abstract

We consider list-decoding in the zero-rate regime for two cases: the binary alphabet and the spherical codes in Euclidean space. Specifically, we study the maximal τ ∈ [0,1] for which there exists an arrangement of M balls of relative Hamming radius τ in the binary hypercube (of arbitrary dimension) with the property that no point of the latter is covered by L or more of them. As M ∞ the maximal τ decreases to a well-known critical value τL. In this work, we prove several results on the rate of this convergence. For the binary case, we show that the rate is (M-1) when L is even, thus extending the classical results of Plotkin and Levenshtein for L=2. For L=3 the rate is shown to be (M-23). For the similar question about spherical codes, we prove the rate is (M-1) and O(M-2LL2-L+2).