Fqn-linear rank distance codes and their distinguishers

Abstract

For any admissible value of the parameters there exist Maximum Rank distance (shortly MRD) Fqn-linear codes of Fqn× n. It has been shown in H-TNRR (see also ByrneRavagnani) that, if field extensions large enough are considered, then almost all (rectangular) rank distance codes are MRD. On the other hand, very few families of Fqn-linear codes are currently known up to equivalence. One of the possible applications of MRD-codes is for McEliece--like public key cryptosystems, as proposed by Gabidulin, Paramonov and Tretjakov in GPT. In this framework it is very important to obtain new families of MRD-codes endowed with fast decoding algorithms. Several decoding algorithms exist for Gabidulin codes as shown in Gabidulin, see also Loi06,PWZ,WT. In this work, we will survey the known families of Fqn-linear MRD-codes, study some invariants of MRD-codes and evaluate their value for the known families, providing a characterization of generalized twisted Gabidulin codes as done in GiuZ.