Showing total 738 results

101. Some Nonprimitive BCH Codes and Related Quantum Codes.

Author

Liu, Yang, Li, Ruihu, Guo, Guanmin, and Wang, Junli

Subjects

CIPHERS, LINEAR codes, TELECOMMUNICATION systems, ERROR correction (Information theory)

Abstract

Let $q$ be a prime power and $m\geq 3$ be odd. Suppose that $n=\frac {q^{2m}-1}{a}$ with $a|(q^{m}+1)$ and $3\leq a \leq 2(q^{2}-q+1)$. This paper mainly determines the actual maximum designed distance of Hermitian dual-containing Bose-Chaudhuri-Hocquenghem (BCH) codes over $\mathbb {F}_{q^{2}}$ of length $n$. Firstly, we give the maximum designed distance $\delta _{m,a}^{R}$ of narrow-sense Hermitian dual-containing BCH codes. Secondly, we show that there are also non-narrow-sense ones of designed distance up to $\delta _{m,a}^{R}$. It is worth mentioning that our maximum designed distance $\delta _{m,a}^{R}>\lceil \frac {a}{2}\rceil \delta _{m}^{A}$ , where $\delta _{m}^{A}$ is given by Aly et al. (IEEE Trans. Inf. Theory, vol. 53, no. 3, pp. 1183-1188, 2007). Thus, many families of Hermitian dual-containing BCH codes with relatively large designed distance are obtained. Using the Hermitian construction to them, we can subsequently construct different classes of nonprimitive quantum codes, which are new in the sense that their parameters are not covered in the literature. [ABSTRACT FROM AUTHOR]

Published

2019

102. On the Complete Weight Distribution of Subfield Subcodes of Algebraic-Geometric Codes.

Author

Chan, Chin Hei and Xiong, Maosheng

Subjects

LINEAR codes, CIPHERS, HAMMING distance, DEVIATION (Statistics), DIVISOR theory, ERROR correction (Information theory)

Abstract

In this paper, we first study deviations of the complete weight distribution of a linear code from that of a random code. Then, we consider a large family of subfield subcodes of algebraic-geometric codes over prime fields which include BCH codes and Goppa codes and prove that the complete weight distribution is close to that of a random code if the code length is large compared with the genus of the curve and the degree of the divisor defining the code. [ABSTRACT FROM AUTHOR]

Published

2019

103. 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

104. A Subfield-Based Construction of Optimal Linear Codes Over Finite Fields.

Author

Hu, Zhao, Li, Nian, Zeng, Xiangyong, Wang, Lisha, and Tang, Xiaohu

Subjects

RESEARCH & development, LINEAR codes, FINITE fields, QUANTUM computing

Abstract

In this paper, we construct four families of linear codes over finite fields from the complements of either the union of subfields or the union of cosets of a subfield, which can produce infinite families of optimal linear codes, including infinite families of (near) Griesmer codes. We also characterize the optimality of these four families of linear codes with an explicit computable criterion using the Griesmer bound and obtain many distance-optimal linear codes. In addition, by a more in-depth discussion on some special cases of these four families of linear codes, we obtain several classes of (distance-)optimal linear codes with few weights and completely determine their weight distributions. It is shown that most of our linear codes are self-orthogonal or minimal which are useful in applications. [ABSTRACT FROM AUTHOR]

Published

2022

105. Two New Families of Quadratic APN Functions.

Author

Li, Kangquan, Zhou, Yue, Li, Chunlei, and Qu, Longjiang

Subjects

LINEAR codes

Abstract

In this paper, we present two new families of APN functions. The first family is in bivariate form $\big (x^{3}+xy^{2}+ y^{3}+xy, x^{5}+x^{4}y+y^{5}+xy+x^{2}y^{2} \big)\,\,\vphantom {_{\int _{\int }}}$ over ${\mathbb F}_{2^{m}}^{2}$. It is obtained by adding certain terms of the form $\sum _{i}(a_{i}x^{2^{i}}y^{2^{i}},b_{i}x^{2^{i}}y^{2^{i}})$ to a family of APN functions recently proposed by Gölo&gcaron;lu. The $\vphantom {_{\int _{\int }}}$ second family has the form $L(z)^{2^{m}+1}+vz^{2^{m}+1}$ over ${\mathbb F}_{{2^{3m}}}$ , which generalizes a family of APN functions by Bracken et al. from 2011. By calculating the $\Gamma $ -rank of the constructed APN functions over ${\mathbb F}_{2^{8}}$ and ${\mathbb F}_{2^{9}}$ , we demonstrate that the two families are CCZ-inequivalent to all known families. In addition, the two new families cover two known sporadic APN instances over ${\mathbb F}_{2^{8}}$ and ${\mathbb F}_{2^{9}}$ , which were found by Edel and Pott in 2009 and by Beierle and Leander in 2021, respectively. [ABSTRACT FROM AUTHOR]

Published

2022

106. 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

107. Infinite Families of 3-Designs and 2-Designs From Almost MDS Codes.

Author

Xu, Guangkui, Cao, Xiwang, and Qu, Longjiang

Subjects

LINEAR codes, FINITE fields, HAMMING weight

Abstract

Combinatorial designs are closely related to linear codes. Recently, some near MDS codes were employed to construct $t$ -designs by Ding and Tang, which settles the question as to whether there exists an infinite family of near MDS codes holding an infinite family of $t$ -designs for $t \geq 2$. This paper is devoted to the construction of infinite families of 3-designs and 2-designs from special equations over finite fields. First, we present an infinite family of almost MDS codes over ${\mathrm{ GF}}(p^{m})$ holding an infinite family of 3-designs. We then provide an infinite family of almost MDS codes over ${\mathrm{ GF}}(p^{m})$ holding an infinite family of 2-designs for any field ${\mathrm{ GF}}(q)$. In particular, some of these almost MDS codes are near MDS. Second, we present an infinite family of near MDS codes over ${\mathrm{ GF}}(2^{m})$ holding an infinite family of 3-designs by considering the number of roots of a special linearized polynomial. Compared to previous constructions of 3-designs or 2-designs from linear codes, the parameters of some of our designs are new and flexible. [ABSTRACT FROM AUTHOR]

Published

2022

108. Quaternary Linear Codes and Related Binary Subfield Codes.

Author

Wu, Yansheng, Li, Chengju, and Xiao, Fu

Subjects

BINARY codes, LINEAR codes, SPHERE packings, CODE generators

Abstract

In this paper, we mainly study quaternary linear codes and their binary subfield codes. First we obtain a general explicit relationship between quaternary linear codes and their binary subfield codes in terms of generator matrices and defining sets. Second, we construct quaternary linear codes via simplicial complexes and determine the weight distributions of these codes. Third, the weight distributions of the binary subfield codes of these quaternary codes are also computed by employing the general characterization. Furthermore, we present two infinite families of optimal linear codes with respect to the Griesmer Bound, and a class of binary almost optimal codes with respect to the Sphere Packing Bound. We also need to emphasize that we obtain at least 9 new quaternary linear codes. [ABSTRACT FROM AUTHOR]

Published

2022

109. On One-Dimensional Linear Minimal Codes Over Finite (Commutative) Rings.

Author

Maji, Makhan, Mesnager, Sihem, Sarkar, Santanu, and Hansda, Kalyan

Subjects

LINEAR codes, CODING theory, FINITE rings, COMMUTATIVE rings, ALGEBRAIC fields, ABSTRACT algebra, FINITE fields

Abstract

Minimal linear codes have significant applications in secret sharing schemes and secure two-party computation. When they are defined over finite fields, those codes have been intensively studied, especially in recent years, but they have been firstly partially characterized by Ashikhmin and Barg since 1998. Next, they were completely characterized in 2018 by Ding, Heng, and Zhou in terms of the minimum and maximum nonzero weights in the corresponding codes. Since then, many construction methods for minimal linear codes over finite fields throughout algebraic and geometric approaches have been proposed in the literature. In particular, the algebraic approach gives rise to minimal codes from (cryptographic) functions. Linear codes over finite fields have been expanded into the collection of acceptable alphabets for codes and study codes over finite commutative rings. A natural way to extend the known results available in the literature is to consider minimal linear codes over commutative rings with unity. In extending coding theory to codes over rings, several essential principles must be considered. Particularly extending the minimality property from finite fields to rings and creating such codes is not simple. Such an extension offers more flexibility in the construction of minimal codes. The present article investigates one-dimensional minimal linear codes over the rings $\mathbb {Z}_{p^{n}}$ (where $p$ is a prime) and $\mathbb {Z}_{p^{m}q^{n}}$ (where $p < q$ are distinct primes and $m\leq n$). Our ultimate objective is to characterize such codes’ minimality and design minimal linear codes over the considered rings. Given our objective, we first introduced the notion of minimal codes over (commutative) rings and succeeded in deriving simple characterization of one-dimensional minimal linear codes over the underlying rings mentioned above. Our new algebraic approach allows designing new minimal linear codes. Almost minimal codes over rings are also presented. To the best of our knowledge, the present paper offers a wide variety of minimal codes over (commutative) rings for the first time. Novel perspectives and developments in this direction are expected in the future. [ABSTRACT FROM AUTHOR]

Published

2022

110. Higher-Order CIS Codes.

Author

Carlet, Claude, Freibert, Finley, Guilley, Sylvain, Kiermaier, Michael, Kim, Jon-Lark, and Sole, Patrick

Subjects

LINEAR codes, BOOLEAN functions, COMPUTER security, PARALLEL algorithms, ERROR correction (Information theory)

Abstract

We introduce complementary information set codes of higher order. A binary linear code of length \(tk\) and dimension \(k\) is called a complementary information set code of order \(t\) ( \(t\) -CIS code for short) if it has \(t\) pairwise disjoint information sets. The duals of such codes permit to reduce the cost of masking cryptographic algorithms against side-channel attacks. As in the case of codes for error correction, given the length and the dimension of a \(t\) -CIS code, we look for the highest possible minimum distance. In this paper, this new class of codes is investigated. The existence of good long CIS codes of order 3 is derived by a counting argument. General constructions based on cyclic and quasi-cyclic codes and on the building up construction are given. A formula similar to a mass formula is given. A classification of 3-CIS codes of length \(\le 12\) is given. Nonlinear codes better than linear codes are derived by taking binary images of \( {\mathbb Z}_{4}\) -codes. A general algorithm based on Edmonds’ basis packing algorithm from matroid theory is developed with the following property: given a binary linear code of rate \(1/t\) , it either provides \(t\) disjoint information sets or proves that the code is not \(t\) -CIS. Using this algorithm, all optimal or best known \([tk, k]\) codes, where \(t=3, 4, {\dots }, 256\) and \(1 \le k \le \lfloor 256/t \rfloor \) are shown to be \(t\) -CIS for all such \(k\) and \(t\) , except for \(t=3\) with \(k=44\) and \(t=4\) with \(k=37\) . [ABSTRACT FROM AUTHOR]

Published

2014

111. \mathbb Z2\mathbb Z2[u] ?Cyclic and Constacyclic Codes.

Author

Aydogdu, Ismail, Abualrub, Taher, and Siap, Irfan

Subjects

CYCLIC codes, LINEAR codes, ORDERED algebraic structures, MODULES (Algebra), MATHEMATICAL bounds

Abstract

Following the very recent studies on \mathbb Z2\mathbb Z4 -additive codes, \mathbb Z2\mathbb Z2[u] -linear codes have been introduced by Aydogdu et al. In this paper, we introduce and study the algebraic structure of cyclic, constacyclic codes and their duals over the R -module \mathbb {Z}_{2}^\alpha R^\beta where R=\mathbb {Z}_{2}+u\mathbb {Z}_{2}=\left \{{0,1,u,u+1}\right \} is the ring with four elements and u^2=0 . We determine the generating independent sets and the types and sizes of both such codes and their duals. Finally, we present a bound and an optimal family of codes attaining this bound and also give some illustrative examples of binary codes that have good parameters which are obtained from the cyclic codes in \mathbb Z_2^\alpha R^\beta . [ABSTRACT FROM AUTHOR]

Published

2017

112. Construction of MDS Codes With Complementary Duals.

Author

Jin, Lingfei

Subjects

LINEAR codes, LIQUID crystal displays, REED-Solomon codes, DIGITAL signal processing -- Mathematics, COMPUTER science

Abstract

A linear complementary dual (LCD) code is a linear code with complimentary dual. LCD codes have been extensively studied in literature. On the other hand, maximum distance separable (MDS) codes are an important class of linear codes that have found wide applications in both theory and practice. However, little is known about MDS codes with complimentary duals. The main purpose of this paper is to construct several classes of MDS codes with complimentary duals, i.e., LCD MDS codes, through generalized Reed-Solomon codes. [ABSTRACT FROM PUBLISHER]

Published

2017

113. Efficiently Decoding Reed–Muller Codes From Random Errors.

Author

Saptharishi, Ramprasad, Shpilka, Amir, and Volk, Ben Lee

Subjects

LINEAR codes, REED-Muller codes, DECODING algorithms, ERRORS, POLYNOMIALS

Abstract

Reed–Muller (RM) codes encode an m -variate polynomial of degree at most r by evaluating it on all points in \0,1\^m . We denote this code by RM(r,m) . The minimum distance of RM(r,m) is 2^{m-r} and so it cannot correct more than half that number of errors in the worst case. For random errors one may hope for a better result. In this paper we give an efficient algorithm (in the block length n=2^{m} ) for decoding random errors in RM codes far beyond the minimum distance. Specifically, for low-rate codes (of degree r=o(\sqrt m) ), we can correct a random set of (1/2-o(1))n errors with high probability. For high rate codes (of degree m-r for r=o(\sqrt {m/\log m}) ), we can correct roughly m^{r/2}$ errors. More generally, for any integer $r$ , our algorithm can correct any error pattern in $RM(m-(2r+2),m)$ , for which the same erasure pattern can be corrected in $RM(m-(r+1),m)$ . The results above are obtained by applying recent results of Abbe, Shpilka, and Wigderson (STOC, 2015) and Kudekar et al. (STOC, 2016) regarding the ability of RM codes to correct random erasures. The algorithm is based on solving a carefully defined set of linear equations and thus it is significantly different than other algorithms for decoding RM codes that are based on the recursive structure of the code. It can be seen as a more explicit proof of a result of Abbe et al. that shows a reduction from correcting erasures to correcting errors, and it also bares some similarities with the error-locating pair method of Pellikaan, Duursma, and Kötter that generalizes the Berlekamp–Welch algorithm for decoding Reed–Solomon codes. [ABSTRACT FROM PUBLISHER]

Published

2017

114. Distributed Structure: Joint Expurgation for the Multiple-Access Channel.

Author

Haim, Eli, Kochman, Yuval, and Erez, Uri

Subjects

ERROR probability, ERROR-correcting codes, INFORMATION filtering, LINEAR codes, MULTIPLE access protocols (Computer network protocols)

Abstract

In this paper, we obtain an improved lower bound on the error exponent of the memoryless multiple-access channel via the use of linear codes, thus demonstrating that structure can be beneficial even when capacity may be achieved via random codes. We show that if the multiple-access channel is additive over a finite field, then any error probability, and hence any error exponent, achievable by a linear code for the associated single-user channel, is also achievable for the multiple-access channel. In particular, linear codes allow to attain joint expurgation, and hence, attain the single-user expurgated exponent of the single-user channel, whenever the latter is achieved by a uniform distribution. Thus, for additive channels, at low rates, where expurgation is needed, our approach strictly improves performance over previous results, where expurgation was used for at most one of the users. Even when the multiple-access channel is not additive, it may be transformed into such a channel. While the transformation is information-lossy, we show that the distributed structure gain in some “nearly additive” cases outweighs the loss. Finally, we apply a similar approach to the Gaussian multiple-access channel. While we believe that due to the power constraints, it is impossible to attain the single-user error exponent, we do obtain an improvement over the best known achievable error exponent, given by Gallager, for certain parameters. This is accomplished using a nested lattice triplet with judiciously chosen parameters. [ABSTRACT FROM PUBLISHER]

Published

2017

115. Quantum Codes Derived From Certain Classes of Polynomials.

Author

Zhang, Tao and Ge, Gennian

Subjects

CODING theory, QUANTUM computing, POLYNOMIALS, SET theory, ERROR correction (Information theory)

Abstract

One central theme in quantum error-correction is to construct quantum codes that have a relatively large minimum distance. In this paper, we first present a construction of classical linear codes based on certain classes of polynomials. Through these classical linear codes, we are able to obtain some new quantum codes. It turns out that some of the quantum codes exhibited here have better parameters than the ones available in the literature. [ABSTRACT FROM PUBLISHER]

Published

2016

116. Stopping Sets of Hermitian Codes.

Author

Anderson, Sarah E. and Matthews, Gretchen L.

Subjects

HERMITIAN structures, SET theory, COMBINATORICS, LINEAR codes, PERFORMANCE evaluation, DECODING algorithms

Abstract

Combinatorial structures called stopping sets are useful in analyzing the performance of a linear code when coupled with an iterative decoding algorithm over an erasure channel. In this paper, we consider stopping sets of Hermitian codes. [ABSTRACT FROM PUBLISHER]

Published

2016

117. Coded Distributed Computing With Partial Recovery.

Author

Ozfatura, Emre, Ulukus, Sennur, and Gunduz, Deniz

Subjects

DISTRIBUTED computing, LINEAR codes, MACHINE learning, MATHEMATICAL optimization, COMPUTER simulation, GRID computing

Abstract

Coded computation techniques provide robustness against straggling workers in distributed computing. However, most of the existing schemes require exact provisioning of the straggling behavior and ignore the computations carried out by straggling workers. Moreover, these schemes are typically designed to recover the desired computation results accurately, while in many machine learning and iterative optimization algorithms, faster approximate solutions are known to result in an improvement in the overall convergence time. In this paper, we first introduce a novel coded matrix-vector multiplication scheme, called coded computation with partial recovery (CCPR), which benefits from the advantages of both coded and uncoded computation schemes, and reduces both the computation time and the decoding complexity by allowing a trade-off between the accuracy and the speed of computation. We then extend this approach to distributed implementation of more general computation tasks by proposing a coded communication scheme with partial recovery, where the results of subtasks computed by the workers are coded before being communicated. Numerical simulations on a large linear regression task confirm the benefits of the proposed scheme in terms of the trade-off between the computation accuracy and latency. [ABSTRACT FROM AUTHOR]

Published

2022

118. The Dual Codes of Several Classes of BCH Codes.

Author

Gong, Binkai, Ding, Cunsheng, and Li, Chengju

Subjects

LINEAR codes, HAMMING distance, TELECOMMUNICATION systems, CYCLIC codes

Abstract

As a special subclass of cyclic codes, BCH codes have wide applications in communication and storage systems. A BCH code of length $n$ over $\mathbb {F}_{q}$ is always relative to an $n$ -th primitive root of unity $\beta $ in an extension field of $\mathbb {F}_{q}$ , and is called a dually-BCH code if its dual is also a BCH code relative to the same $\beta $. The question as to whether a BCH code is a dually-BCH code is in general very hard to answer. In this paper, an answer to this question for primitive narrow-sense BCH codes and projective narrow-sense ternary BCH codes is given. Sufficient and necessary conditions in terms of the designed distances $\delta $ will be presented to ensure that these BCH codes are dually-BCH codes. In addition, the parameters of the primitive narrow-sense BCH codes and their dual codes are investigated. Some lower bounds on minimum distances of the dual codes of primitive and projective narrow-sense BCH codes are developed. Especially for binary primitive narrow-sense BCH codes, the new bounds on the minimum distances of the dual codes improve the classical Sidel’nikov bound, and are also better than the Carlitz and Uchiyama bound for large designed distances $\delta $. The question as to what subclasses of cyclic codes are BCH codes is also answered to some extent. As a byproduct, the parameters of some subclasses of cyclic codes are also investigated. [ABSTRACT FROM AUTHOR]

Published

2022

119. Short Minimal Codes and Covering Codes via Strong Blocking Sets in Projective Spaces.

Author

Heger, Tamas and Nagy, Zoltan Lorant

Subjects

LINEAR codes, FINITE fields, PROJECTIVE spaces, FINITE geometries

Abstract

Minimal linear codes are in one-to-one correspondence with special types of blocking sets of projective spaces over a finite field, which are called strong or cutting blocking sets. Minimal linear codes have been studied since decades but their tight connection with cutting blocking sets of finite projective spaces was unfolded only in the past few years, and it has not been fully exploited yet. In this paper we apply finite geometric and probabilistic arguments to contribute to the field of minimal codes. We prove an upper bound on the minimal length of minimal codes of dimension $k$ over the $q$ -element Galois field which is linear in both $q$ and $k$ , hence improve the previous superlinear bounds. This result determines the minimal length up to a small constant factor. We also improve the lower and upper bounds on the size of so called higgledy-piggledy line sets in projective spaces and apply these results to present improved bounds on the size of covering codes and saturating sets in projective spaces as well. [ABSTRACT FROM AUTHOR]

Published

2022

120. Cyclotomic Constructions of Cyclic Codes With Length Being the Product of Two Primes.

Author

Ding, Cunsheng

Subjects

CYCLOTOMY, CODING theory, PRIME numbers, ERROR-correcting codes, DATA encryption, ALGORITHMS

Abstract

Cyclic codes are an interesting type of linear codes and have applications in communication and storage systems due to their efficient encoding and decoding algorithms. In this paper, three types of generalized cyclotomy of order two are described and three classes of cyclic codes of length n1n2 and dimension (n1n2+1)/2 are presented and analyzed, where n1 and n2 are two distinct primes. Bounds on their minimum odd-like weight are also proved. Some of the codes presented in this paper are among the best cyclic codes. [ABSTRACT FROM AUTHOR]

Published

2012

121. Random Matrices From Linear Codes and Wigner’s Semicircle Law.

Author

Chan, Chin Hei, Kung, Enoch, and Xiong, Maosheng

Subjects

RANDOM matrices, LINEAR codes, FINITE fields, ALGEBRAIC codes, WIGNER distribution, INFINITY (Mathematics), ELECTROSTATIC discharges

Abstract

In this paper, we consider a new normalization of matrices obtained by choosing distinct codewords at random from linear codes over finite fields and find that under some natural algebraic conditions of the codes their empirical spectral distribution converges to Wigner’s semicircle law as the length of the codes goes to infinity. One such condition is that the dual distance of the codes is at least five. This is analogous to previous work on the empirical spectral distribution of similar matrices obtained in this fashion that converges to the Marchenko–Pastur law. [ABSTRACT FROM AUTHOR]

Published

2019

122. Codes With Hierarchical Locality From Covering Maps of Curves.

Author

Ballentine, Sean, Barg, Alexander, and Vladut, Serge

Subjects

AUTOMORPHISMS, AUTOMORPHISM groups, ALGEBRAIC curves, CIPHERS, REED-Solomon codes, CURVES

Abstract

Locally recoverable (LRC) codes provide ways of recovering erased coordinates of the codeword without having to access each of the remaining coordinates. A subfamily of LRC codes with hierarchical locality (H-LRC codes) provides added flexibility to the construction by introducing several tiers of recoverability for correcting different numbers of erasures. We present a general construction of codes with 2-level hierarchical locality from maps between algebraic curves and specialize it to several code families obtained from quotients of curves by a subgroup of the automorphism group, including rational, elliptic, Kummer, and Artin–Schreier curves. We further address the question of H-LRC codes with availability, and suggest a general construction of such codes from fiber products of curves. Detailed calculations of parameters for H-LRC codes with availability are performed for Reed–Solomon- and Hermitian-like code families. Finally, we construct asymptotically good families of H-LRC codes from curves related to the Garcia–Stichtenoth tower. [ABSTRACT FROM AUTHOR]

Published

2019

123. Alphabet-Dependent Bounds for Linear Locally Repairable Codes Based on Residual Codes.

Author

Grezet, Matthias, Freij-Hollanti, Ragnar, Westerback, Thomas, and Hollanti, Camilla

Subjects

CIPHERS, LINEAR codes, RELIABILITY in engineering

Abstract

Locally repairable codes (LRCs) have gained significant interest for the design of large distributed storage systems as they allow a small number of erased nodes to be recovered by accessing only a few others. Several works have thus been carried out to understand the optimal rate–distance tradeoff, but only recently the size of the alphabet has been taken into account. In this paper, a novel definition of locality is proposed to keep track of the precise number of nodes required for a local repair when the repair sets do not yield MDS codes. Then, a new alphabet-dependent bound is derived, which applies both to the new definition and the initial definition of locality. The new bound is based on consecutive residual codes and intrinsically uses the Griesmer bound. A special case of the bound yields both the extension of the Cadambe–Mazumdar bound and the Singleton-type bound for codes with locality $(r,\delta)$ , implying that the new bound is at least as good as these bounds. Furthermore, an upper bound on the asymptotic rate–distance tradeoff of LRCs is derived, and yields the tightest known upper bound for large relative minimum distances. Achievability results are also provided by deriving the locality of the family of Simplex codes together with a few examples of optimal codes. [ABSTRACT FROM AUTHOR]

Published

2019

124. 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

125. Centralized Multi-Node Repair Regenerating Codes.

Author

Zorgui, Marwen and Wang, Zhiying

Subjects

TWO-dimensional bar codes, LINEAR codes, RELIABILITY in engineering, DATA warehousing, CIPHERS

Abstract

In a distributed storage system, recovering from multiple failures is a critical and frequent task that is crucial for maintaining the system’s reliability and fault-tolerance. In this paper, we focus on the problem of repairing multiple failures in a centralized way, which can be desirable in many data storage configurations; furthermore, we show that a significant repair traffic reduction is possible. First, the fundamental trade-off between the repair bandwidth and the storage size for functional repair is established. Using a graph-theoretic formulation, the optimal tradeoff is identified as the solution to an integer optimization problem, for which a closed-form expression is derived. Expressions of the extreme points, namely the minimum storage multi-node repair (MSMR) and minimum bandwidth multi-node repair (MBMR) points, are obtained. Second, we describe a general framework for converting single erasure minimum storage regenerating codes to MSMR codes. The repair strategy for $e$ failures is similar to that for a single failure; however, certain extra requirements need to be satisfied by the repairing functions for a single failure. For illustration, the framework is applied to product-matrix codes and interference alignment codes. Furthermore, we prove that the functional MBMR point is not achievable for linear exact-repair codes. We also show that the exact-repair minimum bandwidth cooperative repair codes achieve an interior point, that lies near the MBMR point, when $k \equiv 1 \mod e$ , $k$ being the minimum number of nodes needed to reconstruct the entire data. Finally, for $k> 2e, e\mid k$ , and $e \mid d$ , where $d$ is the number of helper nodes during repair, we show that the functional repair trade-off is not achievable under exact repair, except for maybe a small portion near the MSMR point, which parallels the results for single-erasure repair by Shah et al. [ABSTRACT FROM AUTHOR]

Published

2019

126. Grassmannian Codes With New Distance Measures for Network Coding.

Author

Etzion, Tuvi and Zhang, Hui

Subjects

LINEAR network coding, LINEAR codes, HAMMING codes, ERROR correction (Information theory), CIPHERS, DISTANCES

Abstract

Grassmannian codes are known to be useful in error correction for random network coding. Recently, they were used to prove that vector network codes outperform scalar linear network codes, on multicast networks, with respect to the alphabet size. The multicast networks which were used for this purpose are generalized combination networks. In both the scalar and the vector network coding solutions, the subspace distance is used as the distance measure for the codes which solve the network coding problem in the generalized combination networks. In this paper, we show that the subspace distance can be replaced with two other possible distance measures which generalize the subspace distance. These two distance measures are shown to be equivalent under an orthogonal transformation. It is proved that the Grassmannian codes with the new distance measures generalize the Grassmannian codes with the subspace distance and the subspace designs with the strength of the design. Furthermore, optimal Grassmannian codes with the new distance measures have minimal requirements for the network coding solutions of some generalized combination networks. The coding problems related to these two distance measures, especially with respect to network coding, are discussed. Finally, by using these new concepts, it is proved that the codes in the Hamming scheme form a subfamily of the Grassmannian codes. [ABSTRACT FROM AUTHOR]

Published

2019

127. Bounds for Binary Linear Locally Repairable Codes via a Sphere-Packing Approach.

Author

Wang, Anyu, Zhang, Zhifang, and Lin, Dongdai

Subjects

CIPHERS, LINEAR codes, BINARY codes, SPHERE packings

Abstract

For locally repairable codes (LRCs), Cadambe and Mazumdar derived the first field-dependent parameter bound, known as the C-M bound. However, the C-M bound depends on an undetermined parameter $ {k}^{({q})}_{{\textbf {opt}}}({n}, {d})$. In this paper, a sphere-packing approach is developed for upper bounding the parameter $ {k}$ for $[ {n}, {k}, {d}]$ linear LRCs with locality $ {r}$. When restricted to the binary field, three upper bounds (i.e., Bound A, Bound B, and Bound C) are derived in an explicit form. More specifically, Bound A holds under the hypothesis that the local repair groups are disjoint and of equal size. Comparing with previous bounds obtained under the same hypothesis, Bound A either covers them as special cases or has an advantage due to its explicit form. Then, the hypothesis is removed in Bound B and Bound C. As the price for explicit form, Bound B specially holds for $ {d}\geq \text {5}$ and Bound C for $ {r}=\textbf {2}$. Through specific comparisons, we show that Bound B and Bound C both tend to outperform the C-M bound, as $ {n}$ goes large. Moreover, a family of binary linear LRCs with $ {d}\geq \textbf {6}$ attaining Bound B are constructed and later extended to a wider range of parameters by a shortening technique. Lastly, most of the bounds and constructions are extended to $ {q}$ -ary LRCs. [ABSTRACT FROM AUTHOR]

Published

2019

128. Minimal Linear Codes in Odd Characteristic.

Author

Bartoli, Daniele and Bonini, Matteo

Subjects

LINEAR codes, HAMMING weight

Abstract

In this paper, we generalize constructions in two recent works of Ding, Heng, and Zhou to any field $\mathbb {F}_{{q}}$ , ${q}$ odd, providing infinite families of minimal codes for which the Ashikhmin–Barg bound does not hold. [ABSTRACT FROM AUTHOR]

Published

2019

129. Self-Dual Near MDS Codes from Elliptic Curves.

Author

Jin, Lingfei and Kan, Haibin

Subjects

CODING theory, ERROR correction (Information theory), COMBINATORICS, REED-Solomon codes

Abstract

In recent years, self-dual MDS codes have attracted a lot of attention due to theoretical interest and practical importance. Similar to self-dual MDS codes, self-dual near MDS (NMDS for short) codes have nice structures as well. From both theoretical and practical points of view, it is natural to study self-dual NMDS codes. Although there has been lots of work on NMDS codes in literature, little is known for self-dual NMDS codes. It seems more challenging to construct self-dual NMDS codes than self-dual MDS codes. The only work on construction of self-dual NMDS codes shows existence of $q$ -ary self-dual NMDS codes of length $q-1$ for odd prime power $q$ or length up to 16 for some small primes $q$ with $q\le 197$. In this paper, we make use of properties of elliptic curves to construct self-dual NMDS codes. It turns out that, as long as $2|q$ and $n$ is even with $4\le n\le q+\lfloor 2\sqrt {q}\rfloor -2$ , one can construct a self-dual NMDS code of length $n$ over $ {\mathbb {F}}_{q}$. Furthermore, for odd prime power $q$ , there exists a self-dual NMDS code of length $n$ over $ {\mathbb {F}}_{q}$ if $q\ge 4^{n+3}\times (n+3)^{2}$. [ABSTRACT FROM AUTHOR]

Published

2019

130. A Key Recovery Reaction Attack on QC-MDPC.

Author

Guo, Qian, Johansson, Thomas, and Stankovski Wagner, Paul

Subjects

ALGORITHMS, ENCRYPTION protocols, DECODING algorithms, NUMERICAL analysis, SPECTRUM analysis

Abstract

Algorithms for secure encryption in a post-quantum world are currently receiving a lot of attention in the research community. One of the most promising such algorithms is the code-based scheme called QC-MDPC, which has excellent performance and a small public key size. In this paper, we present a very efficient key recovery attack on the QC-MDPC scheme using the fact that decryption uses an iterative decoding step, and this can fail with some small probability. We identify a dependence between the secret key and the failure in decoding. This can be used to build what we refer to as a distance spectrum for the secret key, which is the set of all distances between any two ones in the secret key. In a reconstruction step, we then determine the secret key from the distance spectrum. The attack has been implemented and tested on a proposed instance of QC-MDPC for 80-bit security. It successfully recovers the secret key in minutes. A slightly modified version of the attack can be applied on proposed versions of the QC-MDPC scheme that provides IND-CCA security. The attack is a bit more complex in this case, but still very much below the security level. The reason why we can break schemes with proved CCA security is that the model for these proofs typically does not include the decoding error possibility. At last, we present several algorithms for key reconstruction from an empirical distance spectrum. We first improve the naïve algorithm for key reconstruction by a factor of about 3 0000, when the parameters for 80-bit security are implemented. We further develop the algorithm to deal with errors in the distance spectrum. This ultimately reduces the requirement on the number of ciphertexts that need to be collected for a successful key recovery. [ABSTRACT FROM AUTHOR]

Published

2019

131. 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

132. New Characterization and Parametrization of LCD Codes.

Author

Carlet, Claude, Mesnager, Sihem, Tang, Chunming, and Qi, Yanfeng

Subjects

LINEAR codes, INJECTIONS, ORBITS (Astronomy), BINARY codes, RADIOACTIVE waste characterization

Abstract

Linear complementary dual (LCD) cyclic codes were referred historically to as reversible cyclic codes, which had applications in data storage. Due to a newly discovered application in cryptography, there has been renewed interest in LCD codes. In particular, it has been shown that binary LCD codes play an important role in implementations against side-channel attacks and fault injection attacks. In this paper, we first present a new characterization of binary LCD codes in terms of their orthogonal or symplectic basis. Using such a characterization, we solve a conjecture proposed by Galvez et al. on the minimum distance of binary LCD codes. Next, we consider the action of the orthogonal group on the set of all LCD codes, determine all possible orbits of this action, derive simple closed formulas of the size of the orbits, and present some asymptotic results on the size of the corresponding orbits. Our results show that almost all binary LCD codes are odd-like codes with odd-like duals, and about half of $q$ -ary LCD codes have orthonormal basis, where $q$ is a power of an odd prime. [ABSTRACT FROM AUTHOR]

Published

2019

133. Finding Good Linear Codes Using a Simple Extension Algorithm.

Author

Han, Sunghyu

Subjects

CODING theory, ALGORITHMS, LINEAR systems, ITERATIVE methods (Mathematics), ERROR-correcting codes, INFORMATION theory

Abstract

Recently, there were several papers on finding good linear codes. Various methods were introduced to make good linear codes. In this paper, we give a simple iterative algorithm to make good linear codes. Using our algorithm we construct 86 codes which improve the minimum distance of previously best known linear codes for fixed parameters n, k. [ABSTRACT FROM AUTHOR]

Published

2011

134. Bounds on Separating Redundancy of Linear Codes and Rates of X-Codes.

Author

Tsunoda, Yu, Fujiwara, Yuichiro, Ando, Hana, and Vandendriessche, Peter

Subjects

CODING theory, DATA compression, SIGNAL processing, INFORMATION measurement, SIGNAL theory, DATA transmission systems, ELECTRONIC systems

Abstract

An error-erasure channel is a simple noise model that introduces both errors and erasures. While the two types of errors can be corrected simultaneously with error-correcting codes, it is also known that any linear code allows for first correcting errors and then erasures in two-step decoding. In particular, a carefully designed parity-check matrix not only allows for separating erasures from errors but also makes it possible to efficiently correct erasures. The separating redundancy of a linear code is the number of parity-check equations in a smallest parity-check matrix that has the required property for this error-erasure separation. In a sense, it is a parameter of a linear code that represents the minimum overhead for efficiently separating erasures from errors. While several bounds on separating redundancy are known, there still remains a wide gap between upper and lower bounds except for a few limited cases. In this paper, using probabilistic combinatorics and design theory, we improve both upper and lower bounds on separating redundancy. We also show a relation between parity-check matrices for error-erasure separation and special matrices, called X-codes, for data compaction circuits in VLSI testing. This leads to an exponentially improved bound on the size of an optimal X-code. [ABSTRACT FROM AUTHOR]

Published

2018

135. Explicit MDS Codes With Complementary Duals.

Author

Beelen, Peter and Jin, Lingfei

Subjects

MASSEY products, LINEAR complementarity problem, FINITE fields, REED-Solomon codes, TELECOMMUNICATION systems

Abstract

In 1964, Massey introduced a class of codes with complementary duals which are called linear complimentary dual (LCD) codes. He showed that LCD codes have applications in communication system, side-channel attack and so on. LCD codes have been extensively studied in literature. On the other hand, MDS codes form an optimal family of classical codes which have wide applications in both theory and practice. The main purpose of this paper is to give an explicit construction of several classes of LCD MDS codes, using tools from algebraic function fields. We exemplify this construction and obtain several classes of explicit LCD MDS codes for the odd characteristic case. [ABSTRACT FROM AUTHOR]

Published

2018

136. Asymptotically Optimal Regenerating Codes Over Any Field.

Author

Raviv, Netanel

Subjects

CLOUD storage, PROGRAMMING languages, DISTRIBUTED computing, FINITE fields, MATRICES (Mathematics)

Abstract

The study of regenerating codes has advanced tremendously in recent years. However, most known constructions require large field size and, hence, may be hard to implement in practice. By restructuring a code construction by Rashmi et al., we obtain two explicit families regenerating codes. These codes approach the cut-set bound as the reconstruction degree increases and may be realized over any given finite field if the file size is large enough. Essentially, these codes constitute a constructive proof that the cut-set bound does not imply a field size restriction, unlike some known bounds for ordinary linear codes. The first construction attains the cut-set bound at the MBR point asymptotically for all parameters, whereas the second one attains the cut-set bound at the MSR point asymptotically for low-rate parameters. Even though these codes require a large file size, this restriction is trivially satisfied in most conceivable distributed storage scenarios, that are the prominent motivation for regenerating codes. [ABSTRACT FROM AUTHOR]

Published

2018

137. Almost-Reed–Muller Codes Achieve Constant Rates for Random Errors.

Author

Abbe, Emmanuel, Hazla, Jan, and Nachum, Ido

Subjects

REED-Muller codes, LINEAR codes, ERROR rates, ERROR probability

Abstract

This paper considers “ $\delta $ -almost Reed–Muller codes”, i.e., linear codes spanned by evaluations of all but a $\delta $ fraction of monomials of degree at most $d$. It is shown that for any $\delta > 0$ and any $\varepsilon >0$ , there exists a family of $\delta $ -almost Reed–Muller codes of constant rate that correct $1/2- \varepsilon $ fraction of random errors with high probability. For exact Reed–Muller codes, the analogous result is not known and represents a weaker version of the longstanding conjecture that Reed–Muller codes achieve capacity for random errors (Abbe-Shpilka-Wigderson STOC ’15). Our proof is based on the recent polarization result for Reed–Muller codes, combined with a combinatorial approach to establishing inequalities between the Reed–Muller code entropies. [ABSTRACT FROM AUTHOR]

Published

2021

138. MDS Codes With Galois Hulls of Arbitrary Dimensions and the Related Entanglement-Assisted Quantum Error Correction.

Subjects

ERROR-correcting codes, QUANTUM entanglement, LINEAR codes, INTEGERS, CYCLIC groups

Abstract

Let $q=p^{e}$ be a prime power and $\ell $ be an integer with $0\leq \ell \leq e-1$. The $\ell $ -Galois hull of classical linear codes is a generalization of the Euclidean hull and Hermitian hull. We provide a necessary and sufficient condition under which a codeword of a GRS code or an extended GRS code belongs to its $\ell $ -Galois dual code, generalizing both the Euclidean case and Hermitian case in the literature. By using four different tools: 1) the norm mapping from $\mathbb {F}_{q}^{\ast }$ to $\mathbb {F}_{p^{\ell }}^{\ast }$ ; 2) the direct product of two cyclic subgroups; 3) the coset decomposition of a cyclic group; 4) an additive subgroup of $\mathbb {F}_{q}$ and its cosets, we construct eleven families of $q$ -ary MDS codes with $\ell $ -Galois hulls of arbitrary dimensions, and give the related eleven families of $[[n,k,d;c]]_{q}$ entanglement-assisted quantum error-correcting codes (EAQECCs) with relatively large minimum distance in the sense that $2d=n-k+2+c$. We show that developing the theory on $\ell $ -Galois hulls of $q$ -ary MDS codes in this paper enables us to obtain new $q$ -ary EAQECCs with different kinds of length sets via different $\ell $ , where $2\ell \mid e$. [ABSTRACT FROM AUTHOR]

Published

2021

139. Decoding Reed–Solomon Skew-Differential Codes.

Author

Gomez-Torrecillas, Jose, Navarro, Gabriel, and Sanchez-Hernandez, Jose Patricio

Subjects

REED-Solomon codes, LINEAR codes, NONCOMMUTATIVE rings, DECODING algorithms, PARITY-check matrix, LINEAR operators, POLYNOMIAL rings

Abstract

A large class of MDS linear codes is constructed. These codes are endowed with an efficient decoding algorithm. Both the definition of the codes and the design of their decoding algorithm only require from Linear Algebra methods, making them fully accessible for everyone. Thus, the first part of the paper develops a direct presentation of the codes by means of parity-check matrices, and the decoding algorithm rests upon matrix and linear maps manipulations. The somewhat more sophisticated mathematical context (non-commutative rings) needed for the proof of the correctness of the decoding algorithm is postponed to the second part. A final section locates the Reed-Solomon skew-differential codes introduced here within the general context of codes defined by means of skew polynomial rings. [ABSTRACT FROM AUTHOR]

Published

2021

140. On the Similarities Between Generalized Rank and Hamming Weights and Their Applications to Network Coding.

Author

Martinez-Penas, Umberto

Subjects

LINEAR network coding, LEAKS (Disclosure of information), WIRETAPPING, HAMMING weight, DATA packeting

Abstract

Rank weights and generalized rank weights have been proved to characterize error and erasure correction, and information leakage in linear network coding, in the same way as Hamming weights and generalized Hamming weights describe classical error and erasure correction, and information leakage in wire-tap channels of type II and code-based secret sharing. Although many similarities between both the cases have been established and proved in the literature, many other known results in the Hamming case, such as bounds or characterizations of weight-preserving maps, have not been translated to the rank case yet, or in some cases have been proved after developing a different machinery. The aim of this paper is to further relate both weights and generalized weights, show that the results and proofs in both cases are usually essentially the same, and see the significance of these similarities in network coding. Some of the new results in the rank case also have new consequences in the Hamming case. [ABSTRACT FROM PUBLISHER]

Published

2016

141. Linear Boolean Classification, Coding and the Critical Problem.

Author

Abbe, Emmanuel, Alon, Noga, Bandeira, Afonso S., and Sandon, Colin

Subjects

BOOLEAN functions, VECTORS (Calculus), MATRICES (Mathematics), CODING theory, PROBABILITY theory

Abstract

This paper considers the problem of linear Boolean classification, where the goal is to determine in which set, among two given sets of Boolean vectors, an unknown vector belongs to by making linear queries. Finding the least number of queries is equivalent to determining the minimal rank of a matrix over $GF(2)$ , whose kernel does not intersect a given set $S$ . In the case where $S$ is a Hamming ball, this reduces to finding linear codes of largest dimension. For a general set $S$ , this is an instance of the critical problem posed by Crapo and Rota in 1970, open in general. This paper focuses on the case where $S$ is an annulus. As opposed to balls, it is shown that an optimal kernel is composed not only of dense but also of sparse vectors, and the optimal mixture is identified in various cases. These findings corroborate a proposed conjecture that for an annulus of inner and outer radius $nq$ and $np$ respectively, the optimal relative rank is given by the normalized entropy $(1-q)H(p/(1-q))$ , an extension of the Gilbert–Varshamov bound. [ABSTRACT FROM AUTHOR]

Published

2016

142. On the List Decodability of Burst Errors.

Author

Ding, Yang

Subjects

CODING theory, SINGLETON bounds, DECODING algorithms, ERROR analysis in mathematics, BURST errors (Telecommunications), SIGNAL theory

Abstract

Burst errors are a type of distortion in many data communications and data storage channels. In this paper, we consider the list decodability of codes for single burst error case and phased-burst error case independently. Firstly, we analyze the list decodability of random codes, and we show that the burst list decoding radius and the rate of random codes achieve the Singleton bound and the Gilbert-Varshamov bound for single case and phased case, respectively. Second, we illustrate that cyclic codes and algebraic geometry codes are good burst list-decodable codes for single case and phased case, respectively. [ABSTRACT FROM AUTHOR]

Published

2016

143. The Random Coding Bound Is Tight for the Average Linear Code or Lattice.

Author

Domb, Yuval, Zamir, Ram, and Feder, Meir

Subjects

CODING theory, MATHEMATICAL bounds, LINEAR codes, RANDOM variables, MATHEMATICAL proofs, LATTICE theory

Abstract

In 1973, Gallager proved that the random-coding bound is exponentially tight for the random code ensemble at all rates, even below expurgation. This result explained that the random-coding exponent does not achieve the expurgation exponent due to the properties of the random ensemble, irrespective of the utilized bounding technique. It has been conjectured that this same behavior holds true for a random ensemble of linear codes. This conjecture is proved in this paper. In addition, it is shown that this property extends to Poltyrev’s random-coding exponent for a random ensemble of lattices. [ABSTRACT FROM PUBLISHER]

Published

2016

144. Non-Random Coding Error Bounds for Lattices.

Author

Domb, Yuval and Feder, Meir

Subjects

CODING theory, MATHEMATICAL bounds, LATTICE theory, ERROR analysis in mathematics, MATHEMATICAL sequences

Abstract

An upper bound on the error probability of specific lattices, based on their distance spectrum, is constructed. The derivation is accomplished using a simple alternative to the Minkowski–Hlawka mean-value theorem of the geometry of numbers. In many ways, the new bound greatly resembles the Shulman–Feder bound for linear codes. Based on the new bound, error-exponent and channel-dispersion expressions are derived for specific lattice sequences (of increasing dimension) over the AWGN channel. Measuring a sequence’s gap to capacity, using the new asymptotics, is demonstrated. Additional finite dimension results, encountered along the way, are presented. [ABSTRACT FROM PUBLISHER]

Published

2016

145. On Determining Deep Holes of Generalized Reed–Solomon Codes.

Author

Zhuang, Jincheng, Cheng, Qi, and Li, Jiyou

Subjects

REED-Solomon codes, LINEAR codes, VECTORS (Calculus), MATHEMATICAL proofs, SEPARABLE algebras

Abstract

For a linear code, deep holes are defined to be vectors that are further away from codewords than all other vectors. The problem of deciding whether a received word is a deep hole for generalized Reed–Solomon (GRS) codes is proved to be co-NP-complete by Guruswami and Vardy. For the extended Reed–Solomon codes RSq( \mathbb {F}q,k) , a conjecture was made to classify deep holes by Cheng and Murray. Since then efforts have been made to prove the conjecture, or its various forms. In this paper, we classify deep holes completely for GRS codes RSp (D,k) , where $p$ is a prime, |D| > k \geqslant ({p-1})/{2} . Our techniques are built on the idea of deep hole trees, and several results concerning the Erdös–Heilbronn conjecture. [ABSTRACT FROM PUBLISHER]

Published

2016

146. Optimal Codebooks From Binary Codes Meeting the Levenshtein Bound.

Author

Xiang, Can, Ding, Cunsheng, and Mesnager, Sihem

Subjects

BINARY codes, MATHEMATICAL bounds, SET theory, HAMMING distance, MULTIPLE access protocols (Computer network protocols)

Abstract

In this paper, a generic construction of codebooks based on binary codes is introduced. With this generic construction, a few previous constructions of optimal codebooks are extended, and a new class of codebooks almost meeting the Levenshtein bound is presented. Exponentially many codebooks meeting or almost meeting the Levenshtein bound from binary codes are obtained in this paper. The codebooks constructed in this paper have alphabet size 4. As a byproduct, three bounds on the parameters of binary codes are derived. [ABSTRACT FROM PUBLISHER]

Published

2015

147. Hulls of Generalized Reed-Solomon Codes via Goppa Codes and Their Applications to Quantum Codes.

Author

Gao, Yanyan, Yue, Qin, Huang, Xinmei, and Zhang, Jun

Subjects

QUANTUM error correcting codes, REED-Solomon codes, ERROR-correcting codes, ALGEBRAIC codes, ARBITRARY constants, LINEAR codes

Abstract

A Goppa code over $\Bbb F_{q^{m}}$ is a well-known subclass of algebraic error-correcting code. If $m=1$ , then it is a generalized Reed-Solomon(GRS) code and its dual code is called a GRS code via a Goppa code. In this paper, we give a necessary and sufficient condition that the dual codes of GRS codes via (expurgated) Goppa codes are also GRS codes via Goppa codes. Under the above condition, we show that the hulls of GRS codes via Goppa codes are still GRS codes via Goppa codes. As an application, we characterize LCD GRS codes and self-dual GRS codes under the above condition. Some numerical examples are also presented to illustrate our main results. Moreover, we also apply our result to entanglement-assisted quantum error correcting codes (EAQECCs) and obtain two new families of MDS EAQECCs with arbitrary parameters. [ABSTRACT FROM AUTHOR]

Published

2021

148. Locally Recoverable Codes on Surfaces.

Author

Salgado, Cecilia, Varilly-Alvarado, Anthony, and Voloch, Jose Felipe

Subjects

ALGEBRAIC surfaces, CLOUD storage, LINEAR codes, GEOMETRIC surfaces, SURFACE geometry, GEOMETRY, FINITE fields

Abstract

A linear error correcting code is a subspace of a finite-dimensional space over a finite field with a fixed coordinate system. Such a code is said to be locally recoverable with locality r if, for every coordinate, its value at a codeword can be deduced from the value of (certain) r other coordinates of the codeword. These codes have found many recent applications, e.g., to distributed cloud storage. We will discuss the problem of constructing good locally recoverable codes and present some constructions using algebraic surfaces that improve previous constructions and sometimes provide codes that are optimal in a precise sense. The main conceptual contribution of this paper is to consider surfaces fibered over a curve in such a way that each recovery set is constructed from points in a single fiber. This allows us to use the geometry of the fiber to guarantee the local recoverability and use the global geometry of the surface to get a hold on the standard parameters of our codes. We look in detail at situations where the fibers are rational or elliptic curves and provide many examples applying our methods. [ABSTRACT FROM AUTHOR]

Published

2021

149. Dihedral Group Codes Over Finite Fields.

Author

Fan, Yun and Lin, Liren

Subjects

FINITE fields, LIQUID crystal displays, BINARY codes

Abstract

Bazzi and Mitter showed that binary dihedral group codes are asymptotically good. In this paper we prove that the dihedral group codes over any finite field with strong duality property are asymptotically good. If the characteristic of the field is even, self-dual dihedral group codes are asymptotically good. If the characteristic of the field is odd, maximal self-orthogonal dihedral group codes and LCD dihedral group codes are asymptotically good. [ABSTRACT FROM AUTHOR]

Published

2021

150. Construction of MDS Euclidean Self-Dual Codes via Two Subsets.

Author

Fang, Weijun, Xia, Shu-Tao, and Fu, Fang-Wei

Subjects

RESEARCH & development, FINITE fields, REED-Solomon codes, BINARY codes, LINEAR codes, EUCLIDEAN algorithm

Abstract

The parameters of a q-ary MDS Euclidean self-dual codes are completely determined by its length and the construction of MDS Euclidean self-dual codes with new length has been widely investigated in recent years. In this paper, we give a further study on the construction of MDS Euclidean self-dual codes via generalized Reed-Solomon (GRS) codes and their extended codes. The main idea of our construction is to choose suitable evaluation points such that the corresponding (extended) GRS codes are Euclidean self-dual. Firstly, we consider the evaluation set consists of two disjoint subsets, one of which is based on the trace function, the other one is a union of a subspace and its cosets. Then four new families of MDS Euclidean self-dual codes are constructed. Secondly, we give a simple but useful lemma to ensure that the symmetric difference of two intersecting subsets of finite fields can be taken as the desired evaluation set. Based on this lemma, we generalize our first construction and provide two new families of MDS Euclidean self-dual codes. Finally, by using two multiplicative subgroups and their cosets which have nonempty intersection, we present three generic constructions of MDS Euclidean self-dual codes with flexible parameters. Several new families of MDS Euclidean self-dual codes are explicitly constructed. [ABSTRACT FROM AUTHOR]

Published

2021