Showing total 34 results

1. Almost Optimal Construction of Functional Batch Codes Using Extended Simplex Codes.

Author

Yohananov, Lev and Yaakobi, Eitan

Subjects

LINEAR codes, INFORMATION retrieval, LOGICAL prediction

Abstract

A functional $k$ -batch code of dimension $s$ consists of $n$ servers storing linear combinations of $s$ linearly independent information bits. Any multiset request of size $k$ of linear combinations (or requests) of the information bits can be recovered by $k$ disjoint subsets of the servers. The goal under this paradigm is to find the minimum number of servers for given values of $s$ and $k$. A recent conjecture states that for any $k=2^{s-1}$ requests the optimal solution requires $2^{s}-1$ servers. This conjecture is verified for $s \leqslant 5$ but previous work could only show that codes with $n=2^{s}-1$ servers can support a solution for $k=2^{s-2} + 2^{s-4} + \left \lfloor{ \frac { 2^{s/2}}{\sqrt {24}} }\right \rfloor $ requests. This paper reduces this gap and shows the existence of codes for $k=\lfloor \frac {5}{6}2^{s-1} \rfloor - s$ requests with the same number of servers. Another construction in the paper provides a code with $n=2^{s+1}-2$ servers and $k=2^{s}$ requests, which is an optimal result. These constructions are mainly based on extended Simplex codes and equivalently provide constructions for parallel Random I/O (RIO) codes. [ABSTRACT FROM AUTHOR]

Published

2022

2. On Infinite Families of Narrow-Sense Antiprimitive BCH Codes Admitting 3-Transitive Automorphism Groups and Their Consequences.

Author

Liu, Qi, Ding, Cunsheng, Mesnager, Sihem, Tang, Chunming, and Tonchev, Vladimir D.

Subjects

AUTOMORPHISM groups, ALGEBRAIC coding theory, REPRESENTATIONS of groups (Algebra), DATA transmission systems, QUANTUM information science, GROUP theory, LINEAR codes, CYCLIC codes

Abstract

The Bose-Chaudhuri-Hocquenghem (BCH) codes are a well-studied subclass of cyclic codes that have found numerous applications in error correction and notably in quantum information processing. They are widely used in data storage and communication systems. A subclass of attractive BCH codes is the narrow-sense BCH codes over the Galois field ${\mathrm {GF}}(q)$ with length $q+1$ , which are closely related to the action of the projective general linear group of degree two on the projective line. Despite its interest, not much is known about this class of BCH codes. This paper aims to study some of the codes within this class and specifically narrow-sense antiprimitive BCH codes (these codes are also linear complementary duals (LCD) codes that have interesting practical recent applications in cryptography, among other benefits). We shall use tools and combine arguments from algebraic coding theory, combinatorial designs, and group theory (group actions, representation theory of finite groups, etc.) to investigate narrow-sense antiprimitive BCH Codes and extend results from the recent literature. Notably, the dimension, the minimum distance of some $q$ -ary BCH codes with length $q+1$ , and their duals are determined in this paper. The dual codes of the narrow-sense antiprimitive BCH codes derived in this paper include almost MDS codes. Furthermore, the classification of ${\mathrm {PGL}}(2, p^{m})$ -invariant codes over ${\mathrm {GF}}(p^{h})$ is completed. As an application of this result, the $p$ -ranks of all incidence structures invariant under the projective general linear group ${\mathrm {PGL}}(2, p^{m})$ are determined. Furthermore, infinite families of narrow-sense BCH codes admitting a 3-transitive automorphism group are obtained. Via these BCH codes, a coding-theory approach to constructing the Witt spherical geometry designs is presented. The BCH codes proposed in this paper are good candidates for permutation decoding, as they have a relatively large group of automorphisms. [ABSTRACT FROM AUTHOR]

Published

2022

3. Base Field Extension of AG Codes for Decoding.

Subjects

DECODING algorithms, ALGEBRAIC curves, LINEAR algebra, LINEAR codes, ALGEBRAIC codes, ALGEBRAIC geometry

Abstract

Previous algorithms for decoding AG codes up to the designed distance all assumed existence of an extra rational place on the base algebraic curve. The place is used to solve the decoding problem by linear algebra over the base field of the curve. The rationality of the place is essential, and therefore AG codes supported by all rational places on the curve are excluded from the domain of applicability of the decoding algorithms. This paper presents a decoding algorithm for those AG codes using an extra place of higher degree. Hence finally all AG codes, as Goppa defined 40 years ago, are equipped with a fast decoding algorithm. [ABSTRACT FROM AUTHOR]

Published

2022

4. Parameters of Several Classes of BCH Codes.

Author

Ding, Cunsheng

Subjects

BCH codes, TELECOMMUNICATION systems, COMPUTER storage devices, HOUSEHOLD electronics, INFORMATION theory

Abstract

Because of their efficient encoding and decoding algorithms, cyclic codes—an interesting class of linear codes—are widely used in communication systems, storage devices, and consumer electronics. BCH codes form a special class of cyclic codes, and are usually among the best cyclic codes. A subclass of good BCH codes is the narrow-sense primitive BCH codes. However, the dimension and minimum distance of these codes are not known in general. The main objective of this paper is to study the dimension and minimum distances of a subclass of the narrow-sense primitive BCH codes with design distance \delta =(q-\ell 0)q^{m-\ell 1-1}-1 for certain pairs (\ell 0, \ell 1) , where 0 \leq \ell 0 \leq q-2 and 0 \leq \ell 1 \leq m-1 . The parameters of other related classes of BCH codes are also investigated, and some open problems are proposed in this paper. [ABSTRACT FROM PUBLISHER]

Published

2015

5. Systematic Convolutional Low Density Generator Matrix Code.

Author

Cai, Suihua, Lin, Wenchao, Yao, Xinyuanmeng, Wei, Baodian, and Ma, Xiao

Subjects

DENSITY matrices, TWO-dimensional bar codes, CODE generators, ERROR rates, SIGNAL-to-noise ratio, BIT error rate, CHANNEL capacity (Telecommunications)

Abstract

In this paper, we propose a systematic low density generator matrix (LDGM) code ensemble, which is defined by the Bernoulli process. We prove that, under maximum likelihood (ML) decoding, the proposed ensemble can achieve the capacity of binary-input output symmetric (BIOS) memoryless channels in terms of bit error rate (BER). The proof technique reveals a new mechanism, different from lowering down frame error rate (FER), that the BER can be lowered down by assigning light codeword vectors to light information vectors. The finite length performance is analyzed by deriving an upper bound and a lower bound, both of which are shown to be tight in the high signal-to-noise ratio (SNR) region. To improve the waterfall performance, we construct the systematic convolutional LDGM (SysConv-LDGM) codes by a random splitting process. The SysConv-LDGM codes are easily configurable in the sense that any rational code rate can be realized without complex optimization. As a universal construction, the main advantage of the SysConv-LDGM codes is their near-capacity performance in the waterfall region and predictable performance in the error-floor region that can be lowered down to any target as required by increasing the density of the uncoupled LDGM codes. Numerical results are also provided to verify our analysis. [ABSTRACT FROM AUTHOR]

Published

2021

6. On the Maximum True Burst-Correcting Capability of Fire Codes.

Author

Zhou, Wei, Lin, Shu, and Abdel-Ghaffar, Khaled A. S.

Subjects

FIRE prevention laws, IRREDUCIBLE polynomials, RANDOM polynomials, LINEAR equations, HALL polynomials

Abstract

Fire codes are cyclic codes generated by the product of two polynomials: a binomial that characterizes the code’s guaranteed burst-correcting capability and an irreducible polynomial that characterizes the code length. However, the true burst-correcting capability of a Fire code may exceed its guaranteed burst-correcting capability, which can be thought of as the designed burst-correcting capability of the Fire code. The true burst-correcting capability of a Fire code depends on the irreducible polynomial used in code construction. In this paper, the maximum true burst-correcting capabilities of Fire codes are considered. Fire codes are classified based on three parameters: their designed burst-correcting capabilities, the least common multiple of the periods of the binomials, and the irreducible polynomials used in their constructions, and the ratios of the periods of primitive polynomials of the same degrees as the irreducible polynomials to the periods of the irreducible polynomials. It is shown that the maximum true burst-correcting capability of each class, which pertains to an infinite number of codes, can be determined by checking whether or not a finite number of incongruences have a solution. It is also shown that in each class, there is an infinite number of Fire codes, with increasing code lengths, that attain this maximum. The maximum true burst-correcting capabilities of several classes of Fire codes are determined. It is also shown that there are infinite sequences of irreducible polynomials that generate cyclic codes of rates approaching one and with burst-correcting capabilities that exceed any given number. [ABSTRACT FROM AUTHOR]

Published

2016

7. Construction of Partial-Unit-Memory MDS Convolutional Codes.

Author

Chan, Chin Hei and Xiong, Maosheng

Subjects

MATHEMATICAL convolutions, SIGNAL convolution, MNEMONICS, PARTIAL algebras, CONVOLUTION quadrature

Abstract

Maximum-distance separable (MDS) convolutional codes form an optimal family of convolutional codes, the study of which is of great importance. There are very few general algebraic constructions of MDS convolutional codes. In this paper, we construct a large family of partial-unit-memory MDS convolutional codes over \mathbb Fq with flexible parameters. Compared with the previous work, the field size $q$ required to define these codes is much smaller. The construction also leads to many new strongly MDS convolutional codes, an important subclass of MDS convolutional codes. Some examples are presented at the end of this paper. [ABSTRACT FROM AUTHOR]

Published

2016

8. Algebraic Decoding of Cyclic Codes Using Partial Syndrome Matrices.

Author

Lee, Chong-Dao

Subjects

CYCLIC codes, TELECOMMUNICATION systems, INFORMATION storage & retrieval systems, FINITE fields, GAUSSIAN elimination

Abstract

Cyclic codes have been widely used in many applications of communication systems and data storage systems. This paper proposes a new procedure for decoding cyclic codes up to actual minimum distance. The decoding procedure consists of two steps: 1) computation of known syndromes and 2) computation of error positions and error values simultaneously. To do so, a matrix whose all entries are syndromes is called syndrome matrix. A matrix whose entries are either syndromes or the elements of a finite field is said to be partial syndrome matrix. In this paper, two novel methods are presented to determine error positions and error values simultaneously and directly. The first method uses a new partial syndrome matrix along with Gaussian elimination. The partial syndrome matrices for binary (respectively, ternary) cyclic codes of lengths from 69 to 99 (respectively, 16 to 37) are tabulated. For some cyclic codes, the partial syndrome matrices contain unknown syndromes; the second method constructs a matrix from a system of equations, which is generated by the determinants of different partial syndrome matrices and makes use of Gaussian elimination to determine its row rank. Many more cyclic codes beyond the Bose–Chaudhuri–Hocquenghem bound can be decoded with these methods. [ABSTRACT FROM AUTHOR]

Published

2018

9. Index Coding With Erroneous Side Information.

Author

Kim, Jae-Won and No, Jong-Seon

Subjects

ERROR-correcting codes, ERROR correction (Information theory), CODING theory, TELECOMMUNICATION satellites, INTERFERENCE (Telecommunication)

Abstract

In this paper, new index coding problems are studied, where each receiver has erroneous side information. Although side information is a crucial part of index coding, the existence of erroneous side information has not been considered yet. We study an index code with receivers that have erroneous side information symbols in the error-free broadcast channel, which is called an index code with side information errors (ICSIE). The encoding and decoding procedures of the ICSIE are proposed, based on the syndrome decoding. Then, we derive the bounds on the optimal codelength of the proposed index code with erroneous side information. Furthermore, we introduce a special graph for the proposed index coding problem, called a \delta s -cycle whose properties are similar to those of the cycle in the conventional index coding problem. Properties of the ICSIE are also discussed in the \delta s -cycle and clique. Finally, the proposed ICSIE is generalized to an index code for the scenario having both additive channel errors and side information errors, called a generalized error correcting index code. [ABSTRACT FROM AUTHOR]

Published

2017

10. On the Decoding of Lattices Constructed via a Single Parity Check.

Author

Corlay, Vincent, Boutros, Joseph J., Ciblat, Philippe, and Brunel, Loic

Subjects

ERROR probability, LEECHES, LATTICE theory, GAUSSIAN channels

Abstract

This paper investigates the decoding of a remarkable set of lattices: We treat in a unified framework the Leech lattice in dimension 24, the Nebe lattice in dimension 72, and the Barnes-Wall lattices. A new interesting lattice, named $L_{3\cdot 24}$ , is constructed as a simple application of the single parity check on the Leech lattice. The common aspect of these lattices is that they can be obtained via a single parity check or via the $k$ -ing construction. We exploit these constructions to introduce a new efficient paradigm for decoding. This leads to efficient list decoders and quasi-optimal decoders on the Gaussian channel. Both theoretical and practical performance (point error probability and complexity) of the new decoders are provided. [ABSTRACT FROM AUTHOR]

Published

2022

11. Twisted Reed–Solomon Codes.

Author

Beelen, Peter, Puchinger, Sven, and Rosenkilde, Johan

Subjects

REED-Solomon codes, HAMMING codes

Abstract

In this article, we present a new construction of evaluation codes in the Hamming metric, which we call twisted Reed–Solomon codes. Whereas Reed–Solomon (RS) codes are MDS codes, this need not be the case for twisted RS codes. Nonetheless, we show that our construction yields several families of MDS codes. Further, for a large subclass of (MDS) twisted RS codes, we show that the new codes are not generalized RS codes. To achieve this, we use properties of Schur squares of codes as well as an explicit description of the dual of a large subclass of our codes. We conclude the paper with a description of a decoder, that performs very well in practice as shown by extensive simulation results. [ABSTRACT FROM AUTHOR]

Published

2022

12. 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

13. An Explicit Rate-Optimal Streaming Code for Channels With Burst and Arbitrary Erasures.

Author

Domanovitz, Elad, Fong, Silas L., and Khisti, Ashish

Subjects

RIVER channels, CHANNEL coding, FORWARD error correction, ADMISSIBLE sets

Abstract

This paper considers the transmission of an infinite sequence of messages (a streaming source) over a packet erasure channel, where every source message must be recovered perfectly at the destination subject to a fixed decoding delay. While the capacity of a channel that introduces only bursts of erasures has been known for more than fifteen years, only recently, the capacity of a channel with either one burst of erasures or multiple arbitrary erasures in any fixed-sized sliding window has been established. However, explicit codes shown to achieve this capacity for any admissible set of parameters require a large field size that scales exponentially with the delay. Recently, it has been shown that there exist codes that achieve the capacity with field size which scales quadratically with the delay. However, explicit constructions were shown only to specific combinations of parameters. This work describes an explicit rate-optimal construction for all admissible channel and delay parameters over a field size that scales quadratically with the delay. [ABSTRACT FROM AUTHOR]

Published

2022

14. Guruswami-Sudan Decoding of Elliptic Codes Through Module Basis Reduction.

Author

Wan, Yunqi, Chen, Li, and Zhang, Fangguo

Subjects

GROBNER bases, ELLIPTIC functions, MODULAR arithmetic, REED-Solomon codes, DECODING algorithms, INTERPOLATION

Abstract

This paper proposes the Guruswami-Sudan (GS) list decoding algorithm for one-point elliptic codes, in which the interpolation is realized by the module basis reduction (BR). Elliptic codes are a kind of algebraic-geometric (AG) codes with a genus of one. Over the same finite field, they have a greater codeword length than Reed-Solomon (RS) codes, capable of correcting more errors. The GS decoding consists of interpolation and root-finding, while the former that determines the interpolation polynomial $\mathcal {Q}(\text {x}, \text {y}, \text {z})$ dominates the decoding complexity. By defining the Lagrange interpolation function over an elliptic function field, a basis of the interpolation module can be constructed. The desired Gröbner basis that contains $\mathcal {Q}(\text {x}, \text {y}, \text {z})$ can be determined by reducing the constructed basis. This is namely the BR interpolation and it requires less finite field arithmetic operations than the conventional Kötter’s interpolation, facilitating the GS decoding. Re-encoding transform (ReT) is further introduced to facilitate the BR interpolation. This work also shows that both the BR interpolation and its ReT variant will have a lower complexity as the code rate ${k}/{n}$ increases, where n and ${k}$ are the length and dimension of the code, respectively. Our numerical results demonstrate the complexity advantage of the BR interpolation over Kötter’s interpolation, and the performance advantage of elliptic codes over RS codes. [ABSTRACT FROM AUTHOR]

Published

2021

15. 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

16. The Use of Multivariate Weak-Locator Polynomials to Decode Cyclic Codes up to Actual Minimum Distance.

Author

Lin, Tsung-Ching, Lee, Chong-Dao, Truong, Trieu-Kien, and Chang, Yaotsu

Subjects

CYCLIC codes, ERROR correction (Information theory), MULTIVARIATE analysis, GAUSSIAN elimination, POLYNOMIAL operators, BERLEKAMP-Massey algorithm

Abstract

A class of cyclic codes has recently been decoded by using the weak-locator polynomials instead of the conventional error-locator polynomials. In this paper, a generalization of weak-locator polynomials to the multivariate cases, called the multivariate weak-locator polynomials, is defined, and a new matrix whose determinant can be expressed as a multivariate weak-locator polynomial is developed for cyclic codes. Moreover, a modified matrix along with Gaussian elimination found herein enables one to determine error positions precisely. The presented matrices result in a reduction of the number of syndromes when compared with the previously known matrices. The simulation shows that, for example, with the capability of correcting more errors, a considerably sophistical scheme of decoding the (97, 49, 15) binary cyclic code based on the proposed matrices is around 115 times faster than other existing decoders. Therefore, in general, it is developed to facilitate faster decoding of a large class of cyclic codes and is naturally suitable for the software implementation. [ABSTRACT FROM AUTHOR]

Published

2018

17. Using the Difference of Syndromes to Decode Quadratic Residue Codes.

Author

Li, Yong, Duan, Yunde, Liu, Hongqing, Chang, Hsin-Chiu, and Truong, Trieu-Kien

Subjects

RESIDUE codes, DECODING algorithms, ERROR functions, NONLINEAR equations, MULTIVARIATE analysis

Abstract

In this paper, an efficient decoding algorithm is developed to facilitate faster decoding of the binary systematic quadratic residue (QR) codes. It is based on the difference of syndromes (DS), and hence, is called the DS algorithm hereinafter. This new method combines the advantages of the syndrome-weight algorithm and properties of the cyclic codes. Actually, it is a natural generalization of the cyclic weight (CW) algorithm for the (47, 24, 11) QR code developed by Lin et al., and its validity of decoding any binary systematic QR code is also proved. The complexity analysis and simulation results show that the DS algorithm dramatically reduces the decoding complexity without performance loss and considerably requires less memory when compared with previous ones. Utilizing the (47, 24, 11), the (71, 36, 11), the (73, 37, 13), and the (89, 45, 17) QR codes as examples, the DS algorithm not only significantly improves the decoding efficiency, but also saves the memory evidently. When the (23, 12, 7) QR code is considered, the DS algorithm performs almost as well as the currently known best algorithm in terms of decoding efficiency and memory requirements. Thus, all QR codes of lengths less than 100 can be decoded efficiently by using the proposed algorithm. Especially, when the proposed algorithm is applied to decode the (89, 45, 17) QR code, the best one among all the QR codes of lengths less than 100, the decoding speed is raised 26 times and the memory is saved up to 76.6% in comparison with the existing fastest decoding algorithm. [ABSTRACT FROM AUTHOR]

Published

2018

18. 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

19. Homologous Codes for Multiple Access Channels.

Author

Sen, Pinar and Kim, Young-Han

Subjects

CODE generators, INFORMATION theory, LINEAR network coding, CIPHERS, INFORMATION networks, RANDOM matrices

Abstract

Building on recent development by Padakandla and Pradhan, and by Lim, Feng, Pastore, Nazer, and Gastpar, this paper studies the potential of structured coset coding as a complete replacement for random coding in network information theory. The roles of two techniques used in coset coding to generate nonuniform codewords, namely, shaping and channel transformation, are clarified and illustrated via the simple example of the two-sender multiple access channel. While individually deficient, the optimal combination of shaping via nested coset codes of the same generator matrix (which we refer to as homologous codes) and channel transformation is shown to achieve the same performance as traditional random codes for the general two-sender multiple access channel. The achievability proof of the capacity region is extended to multiple access channels with more than two senders, and with one or more receivers. A quantization argument adapted to the proposed combination of two techniques is presented to establish the achievability proof for their Gaussian counterparts. It is illustrated by an example that combining shaping and channel transformation is useful even when the goal of transmission for a subset of the receivers is to recover a linear combination of messages. These results open up new possibilities of utilizing homologous codes for a broader class of applications. [ABSTRACT FROM AUTHOR]

Published

2020

20. Spectral Analysis of Quasi-Cyclic Product Codes.

Author

Zeh, Alexander and Ling, San

Subjects

SPECTRAL analysis (Phonetics), FINITE fields, HAMMING distance, INFORMATION theory, DECODING algorithms, MATHEMATICAL models

Abstract

This paper considers a linear quasi-cyclic product code of two given quasi-cyclic codes of relatively prime lengths over finite fields. We give the spectral analysis of a quasi-cyclic product code in terms of the spectral analysis of the row and column codes. Moreover, we provide a new lower bound on the minimum Hamming distance of a given quasi-cyclic code and present a new algebraic decoding algorithm. More specifically, we prove an explicit (unreduced) basis of an \ell A {\ell B} -quasi-cyclic product code in terms of the generator matrix in reduced Gröbner basis with respect to the position-over-term (RGB/POT) order form of the \ell A -quasi-cyclic row code and the \ell B -quasi-cyclic column code, respectively. This generalizes the work of Burton and Weldon for the generator polynomial of a cyclic product code (where \ell A= {\ell B}=1 ). Furthermore, we derive the generator matrix in Pre-RGB/POT form of an \ell A {\ell B} -quasi-cyclic product code for two special cases: i) for \ell A=2 and \ell B=1 and ii) if the row code is a one-level \ell A -quasi-cyclic code (for arbitrary \ell A ) and \ell B=1 . For arbitrary \ell A and \ell B , the Pre-RGB/POT form of the generator matrix of an \ell A {\ell B} -quasi-cyclic product code is conjectured. The spectral analysis is applied to the generator matrix of the product of an \ell -quasi-cyclic and a cyclic code, and we propose a new lower bound on the minimum Hamming distance of a given \ell -quasi-cyclic code. In addition, we develop an efficient syndrome-based decoding algorithm for \ell -phased burst errors with guaranteed decoding radius. [ABSTRACT FROM AUTHOR]

Published

2016

21. Further Exploration of Convolutional Encoders for Unequal Error Protection and New UEP Convolutional Codes.

Author

Tang, Hung-Hua, Wang, Chung-Hsuan, and Lin, Mao-Chao

Subjects

SIGNAL convolution, ENCODING, VECTORS (Calculus), CODING theory, INFORMATION theory

Abstract

In this paper, the unequal error protection (UEP) capability of convolutional encoders, in terms of the separation vector, is studied from an algebraic viewpoint. A simple procedure is presented for constructing a generator matrix, which is basic and has the largest separation vector for every convolutional code. Such a generator matrix would be desirable, since the corresponding encoder not only achieves UEP optimality, but also avoids undesired catastrophic error propagation. In addition, canonical generator matrices, which are both basic and reduced, are even more preferable for encoding, since they attain the lowest complexity for Viterbi decoding. However, the direct transformation from a UEP-optimal generator matrix to a canonical generator matrix may come with an unexpected loss of the separation vector. We also propose a specific type of transformation matrix that reduces the external degrees of the generator matrices, from which canonical generator matrices can be constructed that include the mitigated degradation of the separation vector. Finally, beneficial UEP convolutional codes that achieve the maximum free distances for the given code parameters are provided. [ABSTRACT FROM PUBLISHER]

Published

2016

22. A New Perspective of Cyclicity in Convolutional Codes.

Author

Gomez-Torrecillas, Jose, Lobillo, F. J., and Navarro, Gabriel

Subjects

CODING theory, MULTIPLEXING, BROADCAST channels, BROADCAST data systems, SIGNAL theory, INFORMATION theory, QUANTUM theory

Abstract

In this paper, we propose a new way of providing cyclic structures to convolutional codes. We define the skew cyclic convolutional codes as left ideals of a quotient ring of a suitable non-commutative polynomial ring. In contrast to the previous approaches to cyclicity for convolutional codes, we use Ore polynomials with coefficients in a field (the rational function field over a finite field), so their arithmetic is very well known and we may proceed similarly to cyclic block codes. In particular, we show how to obtain easily skew cyclic convolutional codes of a given dimension, and we compute an idempotent generator of the code and its dual. [ABSTRACT FROM AUTHOR]

Published

2016

23. Sparse and Balanced Reed–Solomon and Tamo–Barg Codes.

Author

Halbawi, Wael, Liu, Zihan, Duursma, Iwan M., Dau, Hoang, and Hassibi, Babak

Subjects

MATRICES (Mathematics), CIPHERS, STORAGE, WEIGHT (Physics), DISTANCES

Abstract

We study the problem of constructing balanced generator matrices for Reed–Solomon and Tamo–Barg codes. More specifically, we are interested in realizing generator matrices, for the full-length cyclic versions of these codes, where all rows have the same weight and the difference in weight between any columns is at most one. The results presented in this paper translate to computationally balanced encoding schemes, which can be appealing in distributed storage applications. Indeed, the balancedness of these generator matrices guarantees that the computation effort exerted by any storage node is essentially the same. In general, the framework presented can accommodate various values for the required row weight. We emphasize the possibility of constructing sparsest and balanced generator matrices for Reed–Solomon codes, i.e., each row is a minimum distance codeword. The number of storage nodes contacted once a message symbol is updated decreases with the row weight, so sparse constructions are appealing in that context. Results of similar flavor are presented for cyclic Tamo–Barg codes. In particular, we show that for a code with minimum distance $d$ and locality $r$ , a construction in which every row is of weight $d + r - 1$ is possible. The constructions presented are deterministic and operate over the codes’ original underlying finite field. As a result, efficient decoding from both errors and erasures is possible thanks to the plethora of efficient decoders available for the codes considered. [ABSTRACT FROM AUTHOR]

Published

2019

24. Fourth Power Residue Double Circulant Self-Dual Codes.

Author

Zhang, Tao and Ge, Gennian

Subjects

RESIDUE codes, CYCLIC codes, CYCLOTOMIC fields, FIELD extensions (Mathematics), CODING theory

Abstract

Quadratic residue codes are a well-known class of codes. In this paper, we consider the constructions of self-dual codes by higher power residues, especially fourth power residues. New infinite families of self-dual codes over GF(2), GF(3), GF(4), GF(8), and GF(9) are introduced. Some of them have better minimum weight than previously known codes. We also give general results related to the automorphism group of some of these codes. [ABSTRACT FROM PUBLISHER]

Published

2015

25. Convolutional Codes in Rank Metric With Application to Random Network Coding.

Author

Wachter-Zeh, Antonia, Stinner, Markus, and Sidorenko, Vladimir

Subjects

LINEAR network coding, DECODING algorithms, NETWORK performance, ERROR correction (Information theory), ERROR-correcting codes

Abstract

Random network coding recently attracts attention as a technique to disseminate information in a network. This paper considers a noncoherent multishot network, where the unknown and time-variant network is used several times. In order to create dependence between the different shots, particular convolutional codes in rank metric are used. These codes are so-called (partial) unit memory ((P)UM) codes, i.e., convolutional codes with memory one. First, distance measures for convolutional codes in rank metric are shown and two constructions of (P)UM codes in rank metric based on the generator matrices of maximum rank distance codes are presented. Second, an efficient error-erasure decoding algorithm for these codes is presented. Its guaranteed decoding radius is derived and its complexity is bounded. Finally, it is shown how to apply these codes for error correction in random linear and affine network coding. [ABSTRACT FROM AUTHOR]

Published

2015

26. A Coding-Theoretic Application of Baranyai’s Theorem.

Author

Zhang, Liang Feng

Subjects

HYPERGRAPHS, HADAMARD codes, CODING theory, EXPONENTS, COMBINATORICS

Abstract

Baranyai’s theorem is well known in the theory of hypergraphs. A corollary of this theorem says that one can partition the family of all \(u\) -subsets of an \(n\) -element set into \({n-1\choose u-1}\) subfamilies such that each subfamily forms a partition of the \(n\) -element set, where \(n\) is divisible by \(u\) . In this paper, we present a coding-theoretic application of Baranyai’s theorem. More precisely, we propose a combinatorial construction of locally decodable codes. Locally decodable codes are error-correcting codes that allow the recovery of any message symbol by looking at only a few symbols of the codeword. The number of looked codeword symbols is called query complexity. Such codes have attracted a lot of attention in recent years. The Walsh–Hadamard code is a well-known binary two-query locally decodable code of exponential length that can recover any message bit using 2 bits of the codeword. Our construction can give locally decodable codes over small finite fields for any constant query complexities. In particular, it gives a ternary two-query locally decodable code of length asymptotically shorter than the Walsh–Hadamard code. [ABSTRACT FROM PUBLISHER]

Published

2014

27. Constacyclic Symbol-Pair Codes: Lower Bounds and Optimal Constructions.

Author

Chen, Bocong, Lin, Liren, and Liu, Hongwei

Subjects

CYCLIC codes, HAMMING distance, METRIC spaces, DISCRETE Fourier transforms, FINITE fields

Abstract

Symbol-pair codes introduced by Cassuto and Blaum (2010) are designed to protect against pair errors in symbol-pair read channels. The higher the minimum pair distance, the more pair errors the code can correct. Maximum distance separable (MDS) symbol-pair codes are optimal in the sense that pair distance cannot be improved for given length and code size. The contribution of this paper is twofold. First, we present three lower bounds for the minimum pair distance of constacyclic codes, the first two of which generalize the previously known results due to Cassuto and Blaum (2011) and Kai et al. (2015). The third one exhibits a lower bound for the minimum pair distance of repeated-root cyclic codes. Second, we obtain new MDS symbol-pair codes with minimum pair distance seven and eight through repeated-root cyclic codes. [ABSTRACT FROM AUTHOR]

Published

2017

28. Channel Code Using Constrained-Random-Number Generator Revisited.

Author

Muramatsu, Jun and Miyake, Shigeki

Subjects

CIPHERS, DECODING algorithms, ENCODING, INFORMATION & communication technologies, ARCHITECTURE

Abstract

A construction of a channel code by using a source code with decoder side information is introduced. The encoder and decoder pair of any source code can be used for the construction. Constrained-random-number generators, which generate random numbers satisfying a condition specified by a function and its value, are used to construct stochastic encoders and decoders. The result suggests that we can divide the channel coding problem into the problems of channel encoding and source decoding with side information. [ABSTRACT FROM AUTHOR]

Published

2019

29. On the Symbol-Pair Distance of Repeated-Root Constacyclic Codes of Prime Power Lengths.

Author

Dinh, Hai Q., Nguyen, Bac Trong, Singh, Abhay Kumar, and Sriboonchitta, Songsak

Subjects

CODING theory, FINITE fields, DIGITAL signal processing, ERROR correction (Information theory), MDS (Computer system)

Abstract

Let p be a prime, and \lambda be a nonzero element of the finite field \mathbb Fp^{m} . The \lambda -constacyclic codes of length p^s over \mathbb Fp^{m} are linearly ordered under set-theoretic inclusion, i.e., they are the ideals \langle (x-\lambda 0)^{i} \rangle , 0 \leq i \leq p^s of the chain ring [(\mathbb Fp^{m[x]})/({\langle x^{p^{s}}-\lambda \rangle })] . This structure is used to establish the symbol-pair distances of all such $\lambda$ -constacyclic codes. Among others, all maximum distance separable symbol-pair constacyclic codes of length p^s are obtained. [ABSTRACT FROM AUTHOR]

Published

2018

30. Capacity-Achieving Rate-Compatible Polar Codes.

Author

Hong, Song-Nam, Hui, Dennis, and Maric, Ivana

Subjects

CODING theory, DECODERS (Electronics), CHANNEL capacity (Telecommunications), AUTOMATIC Repeat reQuest (Data transmission system), ARBITRARY constants

Abstract

A method of constructing rate-compatible polar codes that are capacity achieving at multiple code rates with low-complexity sequential decoders is presented. The underlying idea of the construction exploits certain common characteristics of polar codes that are optimized for a sequence of successively degraded channels. The proposed code consists of parallel concatenation of multiple polar codes with information-bit divider at the input of each polar encoder. Thus, it is referred to as parallel concatenated polar (PCP) codes. A lower-rate PCP code is simply constructed by adding more constituent polar codes, which enables incremental retransmissions at different rates in order to adapt to channel conditions. Due to the length limitation of polar codes, the PCP code can only support a restricted set of rates that is characterized by the size of the kernel when conventional polar codes are used. To overcome this limitation, punctured polar codes, which provide more flexibility on blocklength by controlling a puncturing fraction, are considered as constituent codes. The existence of capacity-achieving punctured polar codes for any given puncturing fraction is proven. Using such punctured polar codes as constituent codes, it is shown that the proposed PCP code is capacity achieving for an arbitrary sequence of rates and for any class of degraded channels. [ABSTRACT FROM AUTHOR]

Published

2017

31. Block Markov Superposition Transmission: Construction of Big Convolutional Codes From Short Codes.

Author

Ma, Xiao, Liang, Chulong, Huang, Kechao, and Zhuang, Qiutao

Subjects

SUPERPOSITION principle (Physics), SIGNAL convolution, MARKOV processes, MULTIUSER channels, BIT error rate

Abstract

A construction of big convolutional codes from short codes called block Markov superposition transmission (BMST) is proposed. The BMST is very similar to superposition block Markov encoding (SBME), which has been widely used to prove multiuser coding theorems. The BMST codes can also be viewed as a class of spatially coupled codes, where the generator matrices of the involved short codes (referred to as basic codes) are coupled. The encoding process of BMST can be as fast as that of the basic code, while the decoding process can be implemented as an iterative sliding-window decoding algorithm with a tunable delay. More importantly, the performance of BMST can be simply lower bounded in terms of the transmission memory given that the performance of the short code is available. Numerical results show that: 1) the lower bounds can be matched with a moderate decoding delay in the low bit-error-rate (BER) region, implying that the iterative sliding-window decoding algorithm is near optimal; 2) BMST with repetition codes and single parity-check codes can approach the Shannon limit within 0.5 dB at the BER of 10^-5 for a wide range of code rates; and 3) BMST can also be applied to nonlinear codes. [ABSTRACT FROM AUTHOR]

Published

2015

32. Efficient Approximate Minimum Entropy Coupling of Multiple Probability Distributions.

Subjects

DISTRIBUTION (Probability theory), ENTROPY (Information theory), RANDOM variables, RANDOM numbers, CAUSAL inference

Abstract

Given a collection of probability distributions p1, . . . , pm, the minimum entropy coupling is the coupling X1, . . . , Xm (Xi ∼ pi) with the smallest entropy H(X1, . . . , Xm). While this problem is known to be NP-hard, we present an efficient algorithm for computing a coupling with entropy within 2 bits from the optimal value. More precisely, we construct a coupling with entropy within 2 bits from the entropy of the greatest lower bound of p1, . . . , pm with respect to majorization. This construction is also valid when the collection of distributions is infinite, and when the supports of the distributions are infinite. Potential applications of our results include random number generation, entropic causal inference, and functional representation of random variables. [ABSTRACT FROM AUTHOR]

Published

2021

33. Fast Encoding of AG Codes Over Cab Curves.

Author

Beelen, Peter, Rosenkilde, Johan, and Solomatov, Grigory

Subjects

PLANE curves, ALGEBRAIC geometry, ENCODING, ALGEBRAIC codes

Abstract

We investigate algorithms for encoding of one-point algebraic geometry (AG) codes over certain plane curves called $C_{ab}$ curves, as well as algorithms for inverting the encoding map, which we call “unencoding”. Some $C_{ab}$ curves have many points or are even maximal, e.g. the Hermitian curve. Our encoding resp. unencoding algorithms have complexity $ \tilde { \mathcal {O}}(\text {n}^{3/2})$ resp. $ \tilde { \mathcal {O}}({\it\text { qn}})$ for AG codes over any $C_{ab}$ curve satisfying very mild assumptions, where n is the code length and q the base field size, and $ \tilde { \mathcal {O}}$ ignores constants and logarithmic factors in the estimate. For codes over curves whose evaluation points lie on a grid-like structure, for example the Hermitian curve and norm-trace curves, we show that our algorithms have quasi-linear time complexity $ \tilde { \mathcal {O}}(\text {n})$ for both operations. For infinite families of curves whose number of points is a constant factor away from the Hasse-Weil bound, our encoding and unencoding algorithms have complexities $ \tilde { \mathcal {O}}(\text {n}^{5/4})$ and $ \tilde { \mathcal {O}}(\text {n}^{3/2})$ respectively. [ABSTRACT FROM AUTHOR]

Published

2021

34. Distance Verification for Classical and Quantum LDPC Codes.

Author

Dumer, Ilya, Kovalev, Alexey A., and Pryadko, Leonid P.

Subjects

QUANTUM error correcting codes, LOW density parity check codes, DECODERS & decoding, PAULI spin operators, HAMMING distance

Abstract

The techniques of distance verification known for general linear codes are first applied to the quantum stabilizer codes. Then, these techniques are considered for classical and quantum (stabilizer) low-density-parity-check (LDPC) codes. New complexity bounds for distance verification with provable performance are derived using the average weight spectra of the ensembles of LDPC codes. These bounds are expressed in terms of the erasure-correcting capacity of the corresponding ensemble. We also present a new irreducible-cluster technique that can be applied to any LDPC code and takes advantage of parity-checks’ sparsity for both the classical and quantum LDPC codes. This technique reduces complexity exponents of all existing deterministic techniques designed for generic stabilizer codes with small relative distances, which also include all known families of the quantum stabilizer LDPC codes. [ABSTRACT FROM PUBLISHER]

Published

2017