The error-correcting pair for several classes of NMDS linear codes

Abstract

The error-correcting pair is a general algebraic decoding method for linear codes. The near maximal distance separable (NMDS) linear code is a subclass of linear codes and has applications in secret sharing scheme and communication systems due to the efficient performance, thus we focus on the error-correcting pair of NMDS linear codes. In 2023, He and Liao showed that for an NMDS linear code C with minimal distance 2+1 or 2+2, if C has an -error-correcting pair ( A, B ), then the parameters of A have 6 or 10 possibilities, respectively. In this manuscript, basing on Product Singleton Bound, we give several necessary conditions for that the NMDS linear code C with minimal distance 2+1 has an -error-correcting pair (A, B), where the parameters of A is the 1st, 2nd, 4th or 5th case, then basing on twisted generalized Reed-Solomon codes, we give an example for that the parameters of A is the 1st case. Moreover, we also give several necessary conditions for that the NMDS linear code C with minimal distance 2+2 has an -error-correcting pair (A, B), where the parameters of A is the 2nd, 4th, 7th or 8th case, then we give an example for that the parameters of A is the 1st or 2nd case, respectively.