Showing total 14 results

1. Nonlinearity and Kernel of Z-Linear Simplex and MacDonald Codes.

Author

Fernandez-Cordoba, Cristina, Vela, Carlos, and Villanueva, Merce

Subjects

*HADAMARD codes, *LINEAR codes, *BINARY codes

Abstract

$\mathbb {Z}_{2^{s}}$ -additive codes are subgroups of $\mathbb {Z}^{n}_{2^{s}}$ , and can be seen as a generalization of linear codes over $\mathbb {Z}_{2}$ and $\mathbb {Z}_{4}$. A $\mathbb {Z}_{2^{s}}$ -linear code is a binary code (not necessarily linear) which is the Gray map image of a $\mathbb {Z}_{2^{s}}$ -additive code. We consider $\mathbb {Z}_{2^{s}}$ -additive simplex codes of type $\alpha $ and $\beta $ , which are a generalization over $\mathbb {Z}_{2^{s}}$ of the binary simplex codes. These codes are related to the $\mathbb {Z}_{2^{s}}$ -additive Hadamard codes. In this paper, we use this relationship to find a linear subcode of the corresponding $\mathbb {Z}_{2^{s}}$ -linear codes, called kernel, and a representation of these codes as cosets of this kernel. In particular, this also gives the linearity of these codes. Similarly, $\mathbb {Z}_{2^{s}}$ -additive MacDonald codes are defined for $s>2$ , and equivalent results are obtained. [ABSTRACT FROM AUTHOR]

Published

2022

2. Systematic Encoding and Permutation Decoding for Z p s -Linear Codes.

Author

Torres-Martin, Adrian and Villanueva, Merce

Subjects

*BINARY codes, *PERMUTATIONS, *ENCODING, *LINEAR codes

Abstract

Linear codes over $\mathbb {Z}_{p^{s}}$ of length $n$ are subgroups of $\mathbb {Z}_{p^{s}}^{n}$. These codes are also called $\mathbb {Z}_{p^{s}}$ -additive codes and can be seen as a generalization of linear codes over $\mathbb {Z}_{2}$ and $\mathbb {Z}_{4}$. A $\mathbb {Z}_{p^{s}}$ -linear code is a code over $\mathbb {Z}_{p}$ , not necessarily linear, which is the generalized Gray map image of a $\mathbb {Z}_{p^{s}}$ -additive code. In 2015, a systematic encoding was found for $\mathbb {Z}_{4}$ -linear codes. Moreover, an alternative permutation decoding method, which is suitable for any binary code (not necessarily linear) with a systematic encoding, was established. In this paper, we generalize these results by presenting a systematic encoding for any $\mathbb {Z}_{p^{s}}$ -linear code with $s\geq 2$ and $p$ prime. We also describe a permutation decoding method for any systematic code over $\mathbb {Z}_{p}$ , not necessarily linear, and show some examples of how to use this systematic encoding in this decoding method. [ABSTRACT FROM AUTHOR]

Published

2022

3. Synchronization Strings and Codes for Insertions and Deletions—A Survey.

Author

Haeupler, Bernhard and Shahrasbi, Amirbehshad

Subjects

*SYNCHRONIZATION, *BINARY codes, *PSYCHOLOGICAL adaptation, *REED-Solomon codes

Abstract

Already in the 1960s, Levenshtein and others studied error-correcting codes that protect against synchronization errors, such as symbol insertions and deletions. However, despite significant efforts, progress on designing such codes has been lagging until recently, particularly compared to the detailed understanding of error-correcting codes for symbol substitution or erasure errors. This paper surveys the recent progress in designing efficient error-correcting codes over finite alphabets that can correct a constant fraction of worst-case insertions and deletions. Most state-of-the-art results for such codes rely on synchronization strings, simple yet powerful pseudo-random objects that have proven to be very effective solutions for coping with synchronization errors in various settings. This survey also includes an overview of what is known about synchronization strings and discusses communication settings related to error-correcting codes in which synchronization strings have been applied. [ABSTRACT FROM AUTHOR]

Published

2021

4. Binary LCD Codes and Self-Orthogonal Codes From a Generic Construction.

Author

Zhou, Zhengchun, Li, Xia, Tang, Chunming, and Ding, Cunsheng

Subjects

*LINEAR codes, *INJECTIONS, *POLYNOMIALS, *BINARY codes, *GENERIC drugs

Abstract

Linear codes with certain special properties have received renewed attention in recent years due to their practical applications. Among them, binary linear complementary dual (LCD) codes play an important role in implementations against side-channel attacks and fault injection attacks. Self-orthogonal codes can be used to construct quantum codes. In this paper, four classes of binary linear codes are constructed via a generic construction which has been intensively investigated in the past decade. Simple characterizations of these linear codes to be LCD or self-orthogonal are presented. Resultantly, infinite families of binary LCD codes and self-orthogonal codes are obtained. Infinite families of binary LCD codes from the duals of these four classes of linear codes are produced. Many LCD codes and self-orthogonal codes obtained in this paper are optimal or almost optimal in the sense that they meet certain bounds on general linear codes. In addition, the weight distributions of two sub-families of the proposed linear codes are established in terms of Krawtchouk polynomials. [ABSTRACT FROM AUTHOR]

Published

2019

5. Weak Flip Codes and their Optimality on the Binary Erasure Channel.

Author

Lin, Hsuan-Yin, Moser, Stefan M., and Chen, Po-Ning

Subjects

*BINARY erasure channels (Telecommunications), *CODING theory, *MAXIMUM likelihood decoding, *ERROR probability, *HAMMING distance

Abstract

This paper investigates fundamental properties of nonlinear binary codes by looking at the codebook matrix not row-wise (codewords), but column-wise. The family of weak flip codes is presented and shown to contain many beautiful properties. In particular the subfamily fair weak flip codes, which goes back to Shannon et al. and which was shown to achieve the error exponent with a fixed number of codewords $\mathsf {M}$ , can be seen as a generalization of linear codes to an arbitrary number of codewords. The fair weak flip codes are related to binary nonlinear Hadamard codes. Based on the column-wise approach to the codebook matrix, the $r$ -wise Hamming distance is introduced as a generalization to the well-known and widely used (pairwise) Hamming distance. It is shown that the minimum $r$ -wise Hamming distance satisfies a generalized $r$ -wise Plotkin bound. The $r$ -wise Hamming distance structure of the nonlinear fair weak flip codes is analyzed and shown to be superior to many codes. In particular, it is proven that the fair weak flip codes achieve the $r$ -wise Plotkin bound with equality for all $r$. In the second part of this paper, these insights are applied to a binary erasure channel with an arbitrary erasure probability 0 < $\delta$ < 1. An exact formula for the average error probability of an arbitrary (linear or nonlinear) code using maximum likelihood decoding is derived and shown to be expressible using only the $r$ -wise Hamming distance structure of the code. For a number of codewords $\mathsf {M}$ satisfying $\mathsf {M}\le 4$ and an arbitrary finite blocklength $n$ , the globally optimal codes (in the sense of minimizing the average error probability) are found. For $\mathsf {M}$ = 5 or $\mathsf {M}$ = 6 and an arbitrary finite blocklength $n$ , the optimal codes are conjectured. For larger $\mathsf {M}$ , observations regarding the optimal design are presented, e.g., that good codes have a large $r$ -wise Hamming distance structure for all $r$. Numerical results validate our code design criteria and show the superiority of our best found nonlinear weak flip codes compared with the best linear codes. [ABSTRACT FROM AUTHOR]

Published

2018

6. Euclidean and Hermitian Hulls of MDS Codes and Their Applications to EAQECCs.

Author

Fang, Weijun, Fu, Fang-Wei, Li, Lanqiang, and Zhu, Shixin

Subjects

*ERROR-correcting codes, *BINARY codes, *REED-Solomon codes, *LIQUID crystal displays, *CIPHERS, *LINEAR codes

Abstract

In this paper, we construct several classes of maximum distance separable (MDS) codes via generalized Reed-Solomon (GRS) codes and extended GRS codes, where we can determine the dimensions of their Euclidean hulls or Hermitian hulls. It turns out that the dimensions of Euclidean hulls or Hermitian hulls of the codes in our constructions can take all or almost all possible values. As a consequence, we can apply our results to entanglement-assisted quantum error-correcting codes (EAQECCs) and obtain several new families of MDS EAQECCs with flexible parameters. The required number of maximally entangled states of these MDS EAQECCs can take all or almost all possible values. Moreover, several new classes of q-ary MDS EAQECCs of length $ {n} > {q}+1$ are also obtained. [ABSTRACT FROM AUTHOR]

Published

2020

7. On Z8-Linear Hadamard Codes: Rank and Classification.

Author

Fernandez-Cordoba, Cristina, Vela, Carlos, and Villanueva, Merce

Subjects

*HADAMARD codes, *LINEAR codes, *BINARY codes, *CLASSIFICATION, *ERROR correction (Information theory), *LINEAR algebraic groups

Abstract

The Z2s-additive codes are subgroups of Zn2s, and can be seen as a generalization of linear codes over Z2 and Z4. A Z2s-linear Hadamard code is a binary Hadamard code which is the Gray map image of a Z2s-additive code. It is known that either the rank or the dimension of the kernel can be used to give a complete classification for the Z4-linear Hadamard codes. However, when s > 2, the dimension of the kernel of Z2s-linear Hadamard codes of length 2t only provides a complete classification for some values of t and s. In this paper, the rank of these codes is computed for s = 3. Moreover, it is proved that this invariant, along with the dimension of the kernel, provides a complete classification, once t ≥ 3 is fixed. In this case, the number of nonequivalent such codes is also established. [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. Deletion Codes in the High-Noise and High-Rate Regimes.

Author

Guruswami, Venkatesan and Wang, Carol

Subjects

*DELETION (Linguistics), *ERROR correction (Information theory), *CODING standards (Coding theory), *BINARY sequences, *BINARY codes

Abstract

The noise model of deletions poses significant challenges in coding theory, with basic questions like the capacity of the binary deletion channel still being open. In this paper, we study the harder model of worst case deletions, with a focus on constructing efficiently decodable codes for the two extreme regimes of high-noise and high-rate. Specifically, we construct polynomial-time decodable codes with the following tradeoffs (for any \varepsilon > 0 ): 1) codes that can correct a fraction 1- \varepsilon of deletions with rate \mathop \mathrm poly\nolimits ( \varepsilon ) over an alphabet of size \mathop \mathrm poly\nolimits (1/ \varepsilon ) ; 2) binary codes of rate 1-\tilde O(\sqrt \varepsilon ) that can correct a fraction $ \varepsilon $ of deletions; and 3) Binary codes that can be list-decoded from a fraction (1/2- \varepsilon )$ of deletions with rate \mathop {\mathrm {poly}}\nolimits ( \varepsilon ) . This paper gives the first efficient constructions which meet the qualitative goals of correcting a deletion fraction approaching 1 over bounded alphabets, and correcting a constant fraction of bit deletions with rate approaching 1 over a fixed alphabet. The above-mentioned results bring our understanding of deletion code constructions in these regimes to a similar level as worst case errors. [ABSTRACT FROM PUBLISHER]

Published

2017

10. On Squares of Cyclic Codes.

Author

Cascudo, Ignacio

Subjects

*ERROR-correcting codes, *CYCLIC codes, *POLYNOMIALS, *MATHEMATICAL analysis, *RATIONAL numbers

Abstract

The square $C^{*2}$ of a linear error correcting code $C$ is the linear code spanned by the component-wise products of every pair of (non-necessarily distinct) words in $C$. Squares of codes have gained attention for several applications mainly in the area of cryptography, and typically in those applications, one is concerned about some of the parameters (dimension and minimum distance) of both $C^{*2}$ and $C$. In this paper, motivated mostly by the study of this problem in the case of linear codes defined over the binary field, squares of cyclic codes are considered. General results on the minimum distance of the squares of cyclic codes are obtained, and constructions of cyclic codes $C$ with a relatively large dimension of $C$ and minimum distance of the square $C^{*2}$ are discussed. In some cases, the constructions lead to codes $C$ such that both $C$ and $C^{*2}$ simultaneously have the largest possible minimum distances for their length and dimensions. [ABSTRACT FROM AUTHOR]

Published

2019

11. Constructions of Nonbinary WOM Codes for Multilevel Flash Memories.

Author

Gabrys, Ryan and Dolecek, Lara

Subjects

*WRITE once read many storage, *FLASH memory, *BINARY codes, *BINARY sequences, *INFORMATION theory

Abstract

The goal of this paper is to present constructions of high-rate nonbinary write-once memory (WOM) codes for multilevel flash memories. The constructions provided here are all based on the basic idea of mapping high-rate binary codebooks to nonbinary codebooks. The proposed codes maintain the same length and encoding complexity as their underlying binary constituents. We begin by presenting some elementary, yet rate-efficient constructions. Afterward, we consider a high-rate two-write WOM-code defined over an alphabet of size four. In addition, we consider the application of our constructions to the creation of fixed-rate WOM codes. The constructions presented in this paper improve upon the best-known code constructions for certain code lengths. [ABSTRACT FROM AUTHOR]

Published

2015

12. Construction of Hadamard \mathbb Z2 \mathbb Z4 {Q}8 -Codes for Each Allowable Value of the Rank and Dimension of the Kernel.

Author

Montolio, Pere and Rifa, Josep

Subjects

*HADAMARD codes, *BINARY codes, *KERNEL functions, *DIRECT products (Mathematics), *CODE generators

Abstract

This paper deals with Hadamard \mathbb Z2 \mathbb Z4 {Q}8 -codes, which are binary codes after a Gray map from a subgroup of direct products of \mathbb Z2 , \mathbb Z4 , and Q8 , where Q8 is the quaternionic group. In a previous work, these codes were classified in five shapes. In this paper, we analyze the allowable range of values for the rank and dimension of the kernel, which depends on the particular shape of the code. We show that all these codes can be represented in a standard form, from a set of generators, which can help in understanding the characteristics of each shape. The main results we present are the characterization of Hadamard \mathbb Z2 \mathbb Z4 {Q}8 -codes as a quotient of a semidirect product of \mathbb Z2 \mathbb Z4 -linear codes and the construction of Hadamard \mathbb Z2 \mathbb Z4 {Q}8 -codes with each allowable pair of values for the rank and dimension of the kernel. [ABSTRACT FROM AUTHOR]

Published

2015

13. On Optimal Nonlinear Systematic Codes.

Author

Guerrini, Eleonora, Meneghetti, Alessio, and Sala, Massimiliano

Subjects

*OPTIMAL control theory, *CODING theory, *MATHEMATICAL bounds, *BINARY codes, *ERROR correction (Information theory)

Abstract

Most bounds on the size of codes hold for any code, whether linear or not. Notably, the Griesmer bound holds only in the linear case and so optimal linear codes are not necessarily optimal codes. In this paper, we identify code parameters $(q,d,k)$ , namely, field size, minimum distance, and combinatorial dimension, for which the Griesmer bound also holds in the (systematic) nonlinear case. Moreover, we show that the Griesmer bound does not necessarily hold for a systematic code by explicit construction of a family of optimal systematic binary codes. On the other hand, we are able to provide some versions of the Griesmer bound holding for all the systematic codes. [ABSTRACT FROM AUTHOR]

Published

2016

14. Classification of the Z2Z4 -Linear Hadamard Codes and Their Automorphism Groups.

Author

Krotov, Denis S. and Villanueva, Merce

Subjects

*HADAMARD codes, *AUTOMORPHISM groups, *COORDINATES, *PERMUTATIONS, *LINEAR codes

Abstract

A Z2Z4 -linear Hadamard code of length \alpha +2\beta =2^t is a binary Hadamard code, which is the Gray map image of a Z2Z4 -additive code with \alpha binary coordinates and \beta quaternary coordinates. It is known that there are exactly \lfloor \frac t-12 \rfloor and \lfloor \frac t2 \rfloor nonequivalent Z2Z4 -linear Hadamard codes of length 2^t , with $\alpha =0$ and \alpha \not =0$ , respectively, for all t\geq 3$ . In this paper, it is shown that each \alpha =0$ is equivalent to a Z2Z4 -linear Hadamard code with \alpha \not =0 nonequivalent Z2Z4 -linear Hadamard codes of length 2^t . Moreover, the order of the monomial automorphism group for the Z2Z4 -additive Hadamard codes and the permutation automorphism group of the corresponding Z2Z4 -linear Hadamard codes are given. [ABSTRACT FROM AUTHOR]

Published

2015