Binary additive MRD codes with minimum distance n-1 must contain a semifield spread set

Abstract

In this paper we prove a result on the structure of the elements of an additive maximum rank distance (MRD) code over the field of order two, namely that in some cases such codes must contain a semifield spread set. We use this result to classify additive MRD codes in Mn(F2) with minimum distance n-1 for n≤ 6. Furthermore we present a computational classification of additive MRD codes in M4(F3). The computational evidence indicates that MRD codes of minimum distance n-1 are much more rare than MRD codes of minimum distance n, i.e. semifield spread sets. In all considered cases, each equivalence class has a known algebraic construction.