Almost Affine Vector Rank-Metric Codes

Abstract

We define almost affine vector rank-metric codes as subsets C⊂eq Fqmn whose canonical projections have cardinalities that are powers of qm, and prove that they naturally induce q-matroids. We establish that the operations of puncturing and shortening correspond to restriction and contraction of the q-matroid, and show that the rank-weight and formal dual distance distributions are determined by the induced q-matroid. We briefly discuss applications to perfect q-matroid ports in linear network coding, and show that disconnected q-matroids need not induce disconnected ports. Finally, we show that certain Additive Generalized Twisted Gabidulin codes yield direct examples of strictly almost affine rank-metric codes, alongside a separate construction derived from proper finite semifields.