English

New MDS Self-Dual Codes from Generalized Reed-Solomon Codes

Information Theory 2016-12-26 v2 math.IT

Abstract

Both MDS and Euclidean self-dual codes have theoretical and practical importance and the study of MDS self-dual codes has attracted lots of attention in recent years. In particular, determining existence of qq-ary MDS self-dual codes for various lengths has been investigated extensively. The problem is completely solved for the case where qq is even. The current paper focuses on the case where qq is odd. We construct a few classes of new MDS self-dual code through generalized Reed-Solomon codes. More precisely, we show that for any given even length nn we have a qq-ary MDS code as long as q1mod4q\equiv1\bmod{4} and qq is sufficiently large (say q2n×n2)q\ge 2^n\times n^2). Furthermore, we prove that there exists a qq-ary MDS self-dual code of length nn if q=r2q=r^2 and nn satisfies one of the three conditions: (i) nrn\le r and nn is even; (ii) qq is odd and n1n-1 is an odd divisor of q1q-1; (iii) r3mod4r\equiv3\mod{4} and n=2trn=2tr for any t(r1)/2t\le (r-1)/2.

Keywords

Cite

@article{arxiv.1601.04467,
  title  = {New MDS Self-Dual Codes from Generalized Reed-Solomon Codes},
  author = {Lingfei Jin and Chaoping Xing},
  journal= {arXiv preprint arXiv:1601.04467},
  year   = {2016}
}
R2 v1 2026-06-22T12:31:33.734Z