Decoding Trombetti-Zhou codes: a new syndrome-based decoding approach
Abstract
In 2019, Trombetti and Zhou introduced a new family of Fqn-linear Maximum Rank Distance (MRD) codes over Fq2n. For such codes we propose a new syndrome-based decoding algorithm. It is well known that a syndrome-based decoding approach relies heavily on a parity-check matrix of a linear code. Nonetheless, Trombetti-Zhou codes are not linear over the entire field Fq2n, but only over its subfield Fqn. Due to this lack of linearity, we introduce the notions of Fqn-generator matrix and Fqn-parity-check matrix for a generic Fqn-linear rank-metric code over Fqrn in analogy with the roles that generator and parity-check matrices play in the context of linear codes. Accordingly, we present an Fqn-generator matrix and Fqn-parity-check matrix for Trombetti-Zhou codes as evaluation codes over an Fq-basis of Fq2n. This relies on the choice of a particular basis called trace almost dual basis. Subsequently, denoting by d the minimum distance of the code, we show that if the rank weight t of the error vector is strictly smaller than d-12, the syndrome-based decoding of Trombetti-Zhou codes can be converted to the decoding of Gabidulin codes of dimension one larger. On the other hand, when t=d-12, we reduce the decoding to determining the rank of a certain matrix. The complexity of the proposed decoding for Trombetti-Zhou codes is also discussed.
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