On the List-Decodability of Random Linear Rank-Metric Codes

Abstract

The list-decodability of random linear rank-metric codes is shown to match that of random rank-metric codes. Specifically, an Fq-linear rank-metric code over Fqm × n of rate R = (1-)(1-nm)- is shown to be (with high probability) list-decodable up to fractional radius ∈ (0,1) with lists of size at most C,q, where C,q is a constant depending only on and q. This matches the bound for random rank-metric codes (up to constant factors). The proof adapts the approach of Guruswami, H stad, Kopparty (STOC 2010), who established a similar result for the Hamming metric case, to the rank-metric setting.