Row Reduction Applied to Decoding of Rank Metric and Subspace Codes

Abstract

We show that decoding of -Interleaved Gabidulin codes, as well as list- decoding of Mahdavifar--Vardy codes can be performed by row reducing skew polynomial matrices. Inspired by row reduction of [x] matrices, we develop a general and flexible approach of transforming matrices over skew polynomial rings into a certain reduced form. We apply this to solve generalised shift register problems over skew polynomial rings which occur in decoding -Interleaved Gabidulin codes. We obtain an algorithm with complexity O( μ2) where μ measures the size of the input problem and is proportional to the code length n in the case of decoding. Further, we show how to perform the interpolation step of list--decoding Mahdavifar--Vardy codes in complexity O( n2), where n is the number of interpolation constraints.