English

Two new classes of quantum MDS codes

Information Theory 2018-07-17 v2 math.IT

Abstract

Let pp be a prime and let qq be a power of pp. In this paper, by using generalized Reed-Solomon (GRS for short) codes and extended GRS codes, we construct two new classes of quantum maximum-distance- separable (MDS) codes with parameters [[tq,tq2d+2,d]]q [[tq, tq-2d+2, d]]_{q} for any 1tq,2dtq+q1q+1+11 \leq t \leq q, 2 \leq d \leq \lfloor \frac{tq+q-1}{q+1}\rfloor+1, and [[t(q+1)+2,t(q+1)2d+4,d]]q [[t(q+1)+2, t(q+1)-2d+4, d]]_{q} for any 1tq1,2dt+21 \leq t \leq q-1, 2 \leq d \leq t+2 with (p,t,d)(2,q1,q)(p,t,d) \neq (2, q-1, q). Our quantum codes have flexible parameters, and have minimum distances larger than q2+1\frac{q}{2}+1 when t>q2t > \frac{q}{2}. Furthermore, it turns out that our constructions generalize and improve some previous results.

Keywords

Cite

@article{arxiv.1803.06602,
  title  = {Two new classes of quantum MDS codes},
  author = {Weijun Fang and Fang-Wei Fu},
  journal= {arXiv preprint arXiv:1803.06602},
  year   = {2018}
}

Comments

14 pages. Accepted by Finite Fields and Their Applications

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