English

Linear codes over Fq which are equivalent to LCD codes

Information Theory 2017-03-17 v2 math.IT

Abstract

Linear codes with complementary duals (abbreviated LCD) are linear codes whose intersection with their dual are trivial. When they are binary, they play an important role in armoring implementations against side-channel attacks and fault injection attacks. Non-binary LCD codes in characteristic 2 can be transformed into binary LCD codes by expansion. In this paper, we introduce a general construction of LCD codes from any linear codes. Further, we show that any linear code over Fq(q>3)\mathbb F_{q} (q>3) is equivalent to an Euclidean LCD code and any linear code over Fq2(q>2)\mathbb F_{q^2} (q>2) is equivalent to a Hermitian LCD code. Consequently an [n,k,d][n,k,d]-linear Euclidean LCD code over Fq\mathbb F_q with q>3q>3 exists if there is an [n,k,d][n,k,d]-linear code over Fq\mathbb F_q and an [n,k,d][n,k,d]-linear Hermitian LCD code over Fq2\mathbb F_{q^2} with q>2q>2 exists if there is an [n,k,d][n,k,d]-linear code over Fq2\mathbb F_{q^2}. Hence, when q>3q>3 (resp.q>2q>2) qq-ary Euclidean (resp. q2q^2-ary Hermitian) LCD codes possess the same asymptotical bound as qq-ary linear codes (resp. q2q^2-ary linear codes). Finally, we present an approach of constructing LCD codes by extending linear codes.

Keywords

Cite

@article{arxiv.1703.04346,
  title  = {Linear codes over Fq which are equivalent to LCD codes},
  author = {Claude Carlet and Sihem Mesnager and Chunming Tang and Yanfeng Qi},
  journal= {arXiv preprint arXiv:1703.04346},
  year   = {2017}
}

Comments

arXiv admin note: text overlap with arXiv:1702.08033

R2 v1 2026-06-22T18:44:06.956Z