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 $\tau \in [0,1]$ for which there exists an arrangement of $M$ balls of relative Hamming radius $\tau$ 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 $M\to \infty$ the maximal $\tau$ decreases to a well-known critical value $\tau_L$. In this work, we prove several results on the rate of this convergence. For the binary case, we show that the rate is $\Theta(M^{-1})$ 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 $\Theta(M^{-\tfrac{2}{3}})$. For the similar question about spherical codes, we prove the rate is $\Omega(M^{-1})$ and $O(M^{-\tfrac{2L}{L^2-L+2}})$.