Showing total 14 results

1. The Subfield Codes of Some [ q + 1, 2, q ] MDS Codes.

Author

Heng, Ziling and Ding, Cunsheng

Subjects

*FINITE fields, *HAMMING weight, *LINEAR codes

Abstract

Recently, subfield codes of geometric codes over large finite fields ${\mathrm {GF}}(q)$ with dimension 3 and 4 were studied and distance-optimal subfield codes over ${\mathrm {GF}}(p)$ were obtained, where $q=p^{m}$. The key idea for obtaining very good subfield codes over small fields is to choose very good linear codes over an extension field with small dimension. This paper first presents a general construction of $[q+1, 2, q]$ MDS codes over ${\mathrm {GF}}(q)$ , and then studies the subfield codes over ${\mathrm {GF}}(p)$ of some of the $[q+1, 2,q]$ MDS codes over ${\mathrm {GF}}(q)$. Two families of dimension-optimal codes over ${\mathrm {GF}}(p)$ are obtained, and several families of nearly optimal codes over ${\mathrm {GF}}(p)$ are produced. Several open problems are also proposed in this paper. [ABSTRACT FROM AUTHOR]

Published

2022

2. The Subfield Codes of Ovoid Codes.

Author

Ding, Cunsheng and Heng, Ziling

Subjects

*CODING theory, *CIPHERS, *LINEAR codes, *HAMMING weight, *FINITE geometries, *COMBINATORICS, *QUADRICS

Abstract

Ovoids in ${\mathrm {PG}}(3, {\mathrm {GF}}(q))$ have been an interesting topic in coding theory, combinatorics, and finite geometry for a long time. So far only two families of ovoids are known. The first is the elliptic quadrics and the second is the Tits ovoids. It is known that an ovoid in ${\mathrm {PG}}(3, {\mathrm {GF}}(q))$ corresponds to a $[q^{2}+1, 4, q^{2}-q]$ code over ${\mathrm {GF}}(q)$ , which is called an ovoid code. The objectives of this paper are to develop the general theories of subfield codes and to study the subfield codes of the two families of ovoid codes. The dimensions, minimum weights, and the weight distributions of the subfield codes of the elliptic quadric codes and Tits ovoid codes are settled. The parameters of the duals of these subfield codes are also studied. Some of the codes presented in this paper are optimal, and some are distance-optimal. The parameters of the subfield codes are new. [ABSTRACT FROM AUTHOR]

Published

2019

3. Generalized Column Distances.

Author

Cardell, Sara D., Firer, Marcelo, and Napp, Diego

Subjects

*PARITY-check matrix, *HAMMING weight, *CODING theory, *TWO-dimensional bar codes, *BLOCK codes

Abstract

The notion of Generalized Hamming weights of block codes has been investigated since the nineties due to its significant role in coding theory and cryptography. In this paper we extend this concept to the context of convolutional codes. In particular, we focus on column distances and introduce the novel notion of generalized column distances (GCD). We first show that the hierarchy of GCD is strictly increasing. We then provide characterizations of such distances in terms of the truncated parity-check matrix of the code, that will allow us to determine their values. Finally, the case in which the parity-check matrix is in systematic form is treated. [ABSTRACT FROM AUTHOR]

Published

2020

4. Infinite Families of Near MDS Codes Holding t-Designs.

Author

Ding, Cunsheng and Tang, Chunming

Subjects

*LINEAR codes, *FINITE fields, *STEINER systems, *CIPHERS, *HAMMING weight, *CYCLIC codes, *FAMILIES

Abstract

An $[{n}, {k}, {n}-{k}+1]$ linear code is called an MDS code. An $[{n}, {k}, {n}-{k}]$ linear code is said to be almost maximum distance separable (almost MDS or AMDS for short). A code is said to be near maximum distance separable (near MDS or NMDS for short) if the code and its dual code both are almost maximum distance separable. The first near MDS code was the [11, 6, 5] ternary Golay code discovered in 1949 by Golay. This ternary code holds 4-designs, and its extended code holds a Steiner system ${S}(5, 6, 12)$ with the largest strength known. In the past 70 years, sporadic near MDS codes holding t-designs were discovered and a lot of infinite families of near MDS codes over finite fields were constructed. However, the question as to whether there is an infinite family of near MDS codes holding an infinite family of t-designs for $ {t}\geq 2$ remains open for 70 years. This paper settles this long-standing problem by presenting an infinite family of near MDS codes over $ {GF}(3^{ {s}})$ holding an infinite family of 3-designs and an infinite family of near MDS codes over $ {GF}(2^{2 {s}})$ holding an infinite family of 2-designs. The subfield subcodes of these two families of codes are also studied, and are shown to be dimension-optimal or distance-optimal. [ABSTRACT FROM AUTHOR]

Published

2020

5. New Lower Bounds for Permutation Codes Using Linear Block Codes.

Author

Micheli, Giacomo and Neri, Alessandro

Subjects

*BLOCK codes, *LINEAR codes, *PARITY-check matrix, *CODING theory, *PERMUTATIONS, *CUBES

Abstract

In this paper we prove new lower bounds for the maximal size of permutation codes by connecting the theory of permutation codes with the theory of linear block codes. More specifically, using the columns of a parity check matrix of an $[{\it{ n,k,d}}]_{ {q}}$ linear block code, we are able to prove the existence of a permutation code in the symmetric group of degree n, having minimum distance at least d and large cardinality. With our technique, we obtain new lower bounds for permutation codes that enhance the ones in the literature and provide asymptotic improvements in certain regimes of length and distance of the permutation code. [ABSTRACT FROM AUTHOR]

Published

2020

6. Several Classes of Minimal Linear Codes With Few Weights From Weakly Regular Plateaued Functions.

Author

Mesnager, Sihem and Sinak, Ahmet

Subjects

*FINITE fields, *INFORMATION theory, *HAMMING weight, *LINEAR codes

Abstract

Minimal linear codes have significant applications in secret sharing schemes and secure two-party computation. There are several methods to construct linear codes, one of which is based on functions over finite fields. Recently, many construction methods for linear codes from functions have been proposed in the literature. In this paper, we generalize the recent construction methods given by Tang et al. in [IEEE Transactions on Information Theory, 62(3), 1166-1176, 2016] to weakly regular plateaued functions over finite fields of odd characteristic. We first construct three-weight linear codes from weakly regular plateaued functions based on the second generic construction and then determine their weight distributions. We also give a punctured version and subcode of each constructed code. We note that they may be (almost) optimal codes and can be directly employed to obtain (democratic) secret sharing schemes, which have diverse applications in the industry. We next observe that the constructed codes are minimal for almost all cases and finally describe the access structures of the secret sharing schemes based on their dual codes. [ABSTRACT FROM AUTHOR]

Published

2020

7. Locally Repairable Codes: Joint Sequential–Parallel Repair for Multiple Node Failures.

Author

Yavari, Ehsan and Esmaeili, Morteza

Abstract

Locally repairable codes (LRC) have been studied from two approaches to locally repair multiple failed nodes: 1) parallel approach, in which a coordinate $i$ of an $[n,k,d]$ linear code is said to have locality $r$ and availability $t$ if there exist $t$ disjoint repair sets each of which contains at most $r$ other coordinates that can recover the value of the $i$ -th coordinate; 2) sequential approach, in which the erased symbols (failed nodes) are repaired, one by one, and any previously repaired node can be used to repair the remaining failed nodes. In this paper, we first consider LRC aiming at joint sequential-parallel repairing multiple failed nodes, and study the $(n,k,r,t,u)$ -ELRCs (Exact locally repairable codes) which are $[n,k]$ linear codes with the property that any set of failed nodes of size at most $t$ can be simultaneously repaired in parallel mode, and each element of a set $E$ of failed nodes of size at most $u$ can be sequentially repaired by $r$ ($r< k$) other coordinates. We present a method by which with a given parity-check matrix of an $(n,k,r,t,u)$ -ELRC with minimum Hamming distance $d$ , a new ELRC with minimum Hamming distance $2d$ and availability $t+1$ is constructed that can repair each set of failed nodes $E$ of size at most $2u+1$ in sequential mode and this repair is done in at most $u-t+2$ steps. We construct a big family of LRCs by making use of orthogonal Latin rectangles and permutation cubes and some other combinatorial designs; the constructed codes contain the family of direct product codes; we also use $m$ -dimensional permutation cubes to construct LRCs with short block length for each $r$. [ABSTRACT FROM AUTHOR]

Published

2020

8. Bent Vectorial Functions, Codes and Designs.

Author

Ding, Cunsheng, Munemasa, Akihiro, and Tonchev, Vladimir D.

Subjects

*BENT functions, *BINARY codes, *DIFFERENCE sets, *LINEAR codes, *BOOLEAN functions, *ABELIAN groups, *HAMMING weight

Abstract

Bent functions, or equivalently, Hadamard difference sets in the elementary Abelian group (${\mathrm {GF}}(2^{2m}), $ +), have been employed to construct symmetric and quasi-symmetric designs having the symmetric difference property. The main objective of this paper is to use bent vectorial functions for a construction of a two-parameter family of binary linear codes that do not satisfy the conditions of the Assmus–Mattson theorem, but nevertheless hold 2-designs. A new coding-theoretic characterization of bent vectorial functions is presented. [ABSTRACT FROM AUTHOR]

Published

2019

9. On Two Classes of Primitive BCH Codes and Some Related Codes.

Author

Li, Chengju, Wu, Peng, and Liu, Fengmei

Subjects

*BCH codes, *CODING theory, *MATHEMATICAL bounds, *INFORMATION storage & retrieval systems, *CRYPTOGRAPHY

Abstract

BCH codes are an interesting type of cyclic codes and have wide applications in communication and storage systems. Generally, it is very hard to determine the minimum distances of BCH codes. In this paper, we determine the weight distributions of two classes of primitive BCH codes $\mathcal C_{(q, m, \delta _{2})}$ and $\mathcal C_{(q, m, \delta _{3})}$ and their extended codes, which solve two problems proposed by Ding et al. It is shown that the extended codes $\overline {\mathcal C}_{(q, m, \delta _{2})}$ have four nonzero weights. We also employ the Hartmann-Tzeng bound to present the minimum distance of the dual code $\mathcal C_{(q, m, \delta _{2})}^\perp $ for $q \ge 5$. Inspired by the idea, we then determine the dimensions of a class of cyclic codes and give lower bounds on their minimum distances, which is greatly improved comparing with the BCH bound. Some optimal codes are obtained. [ABSTRACT FROM AUTHOR]

Published

2019

10. All Binary Linear Codes That Are Invariant Under ${\mathrm{PSL}}_2(n)$.

Author

Ding, Cunsheng, Liu, Hao, and Tonchev, Vladimir D.

Subjects

*LINEAR codes, *CYCLIC codes, *BLOCK codes, *RESIDUE codes, *INFORMATION theory

Abstract

The projective special linear group ${\mathrm {PSL}}_{2}(n)$ is 2-transitive for all primes $n$ and 3-homogeneous for $n \equiv 3 \pmod {4}$ on the set $\{0,1, \ldots, n-1, \infty \}$. It is known that the extended odd-like quadratic residue codes are invariant under ${\mathrm {PSL}}_{2}(n)$. Hence, the extended quadratic residue codes hold an infinite family of 2-designs for primes $n \equiv 1 \pmod {4}$ , an infinite family of 3-designs for primes $n \equiv 3 \pmod {4}$. To construct more $t$ -designs with $t \in \{2, 3\}$ , one would search for other extended cyclic codes over finite fields that are invariant under the action of ${\mathrm {PSL}}_{2}(n)$. The objective of this paper is to prove that the extended quadratic residue binary codes are the only nontrivial extended binary cyclic codes that are invariant under ${\mathrm {PSL}}_{2}(n)$. [ABSTRACT FROM AUTHOR]

Published

2018

11. The Weight Hierarchy of Some Reducible Cyclic Codes.

Author

Xiong, Maosheng, Li, Shuxing, and Ge, Gennian

Subjects

*HAMMING weight, *LINEAR codes, *CYCLIC codes, *VECTOR spaces, *CRYPTOGRAPHY

Abstract

The generalized Hamming weights (GHWs) of linear codes are fundamental parameters, the knowledge of which is of great interest in many applications. However, to determine the GHWs of linear codes is difficult in general. In this paper, we study the GHWs for a family of reducible cyclic codes and obtain the complete weight hierarchy in several cases. This is achieved by extending the idea of Yang et al. into higher dimension and by employing some interesting combinatorial arguments. It shall be noted that these cyclic codes may have arbitrary number of nonzeros. [ABSTRACT FROM PUBLISHER]

Published

2016

12. On the Covering Dimension of a Linear Code.

Author

Britz, Thomas and Shiromoto, Keisuke

Subjects

*CODING theory, *MULTIPLEXING, *BROADCAST channels, *BROADCAST data systems, *SIGNAL theory, *INFORMATION theory, *DECODING algorithms, *ERROR-correcting codes

Abstract

This paper introduces the covering dimension of a linear code over a finite field, which is analogous to the critical exponent of a representable matroid and, thus, generalizes invariants that lie at the heart of several fundamental problems in a coding theory. An upper bound on the covering dimension is proved, improving Kung’s classical bound for the critical exponent. In addition, a construction is given for linear codes that attain equality in this covering dimension bound. [ABSTRACT FROM AUTHOR]

Published

2016

13. A Construction of New MDS Symbol-Pair Codes.

Author

Kai, Xiaoshan, Zhu, Shixin, and Li, Ping

Subjects

*CODING theory, *INFORMATION retrieval, *MATHEMATICAL bounds, *DISCRETE Fourier transforms, *EULERIAN graphs, *DECODING algorithms

Abstract

Recently, symbol-pair codes are proposed to protect against pair errors in symbol-pair read channels. One main task in symbol-pair coding theory is to design codes with large minimum pair distance. Maximum distance separable (MDS) symbol-pair codes are optimal in the sense they attain maximal minimum pair distance. In this paper, based on constacyclic codes, we construct some new MDS symbol-pair codes with minimum pair-distance five and six. Compared with classical $q$ -ary MDS codes, the constructed MDS symbol-pair codes have length up to q^{2}+q+1 . [ABSTRACT FROM PUBLISHER]

Published

2015

14. A Class of Two-Weight and Three-Weight Codes and Their Applications in Secret Sharing.

Author

Ding, Kelan and Ding, Cunsheng

Subjects

*LINEAR codes, *DISTRIBUTION (Probability theory), *HAMMING weight, *FINITE fields, *GAUSSIAN distribution, *GAUSSIAN sums, *CODING theory

Abstract

In this paper, a class of two-weight and three-weight linear codes over \mathrm GF(p) is constructed, and their application in secret sharing is investigated. Some of the linear codes obtained are optimal in the sense that they meet certain bounds on linear codes. These codes have applications also in authentication codes, association schemes, and strongly regular graphs, in addition to their applications in consumer electronics, communication and data storage systems. [ABSTRACT FROM PUBLISHER]

Published

2015