Hermitian rank distance codes

Abstract

Let X=X(n,q) be the set of n× n Hermitian matrices over Fq2. It is well known that X gives rise to a metric translation association scheme whose classes are induced by the rank metric. We study d-codes in this scheme, namely subsets Y of X with the property that, for all distinct A,B∈ Y, the rank of A-B is at least d. We prove bounds on the size of a d-code and show that, under certain conditions, the inner distribution of a d-code is determined by its parameters. Except if n and d are both even and 4 d n-2, constructions of d-codes are given, which are optimal among the d-codes that are subgroups of (X,+). This work complements results previously obtained for several other types of matrices over finite fields.