Explicit MDS Codes With Complementary Duals

“…So, the following is immediate. 22,7] , [28, 20,9] , [28, 18,11] , [28, 16,13] , [28, 14,15] , [14,12,3] , [14,10,5] , [14,8,7] , [14,6,9] , [14,4,11] , [14,2,13] , [7,6,2] , [7,4,4] , [7,2,6] , [4,3,2] .…”

Section: Proofmentioning

confidence: 99%

“…In [6], Chen and Liu have proposed a different approach to obtain new LCD MDS codes from generalized Reed-Solomon codes. In [2], Beelen and Jin gave an explicit construction of several classes of LCD MDS codes, using tools from algebraic function fields. In [4], Carlet et al have studied several constructions of new Euclidean and Hermitian LCD MDS codes.…”

Section: Introductionmentioning

confidence: 99%

On MDS negacyclic LCD codes

Koroglu¹,

Sarı²

2019

Filomat

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Linear codes with complementary duals (LCD) have a great deal of significance amongst linear codes. Maximum distance separable (MDS) codes are also an important class of linear codes since they achieve the greatest error correcting and detecting capabilities for fixed length and dimension. The construction of linear codes that are both LCD and MDS is a hard task in coding theory. In this paper, we study the constructions of LCD codes that are MDS from negacyclic codes over finite fields of odd prime power q elements. We construct four families of MDS negacyclic LCD codes of length n| q−1 2 , n| q+1 2 and a family of negacyclic LCD codes of length n = q − 1. Furthermore, we obtain five families of q 2 -ary Hermitian MDS negacyclic LCD codes of length n| (q − 1) and four families of Hermitian negacyclic LCD codes of length n = q 2 + 1. For both Euclidean and Hermitian cases the dimensions of these codes are determined and for some classes the minimum distances are settled. For the other cases, by studying q and q 2 -cyclotomic classes we give lower bounds on the minimum distance.

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“…In [22], X. Yang and J. L. Massey obtained a necessary and sufficient condition for a cyclic code C of length n to be an LCD code which is that the generator polynomial g(x) of C be self-reciprocal and all the monic irreducible factors of g(x) have the same multiplicity in g(x) as in x n − 1. For other constructions of LCD codes we refer to [2] and [6]. Moreover, H. Liu and S. Liu studied MDS LCD multi-twisted RS codes in [11].…”

Section: Introductionmentioning

confidence: 99%