On the List Decodability of Self-orthogonal Rank Metric Codes

Abstract

V. Guruswami and N. Resch prove that the list decodability of Fq-linear rank metric codes is as good as that of random rank metric codes in~venkat2017. Due to the potential applications of self-orthogonal rank metric codes, we focus on list decoding of them. In this paper, we prove that with high probability, an q-linear self-orthogonal rank metric code over Fqn× m of rate R=(1-τ)(1-nmτ)-ε is shown to be list decodable up to fractional radius τ∈(0,1) and small ε∈(0,1) with list size depending on τ and q at most Oτ, q(1ε). In addition, we show that an Fqm-linear self-orthogonal rank metric code of rate up to the Gilbert-Varshamov bound is (τ n, (Oτ, q(1ε)))-list decodable.