Your search keyword '"Sole, Patrick"' showing total 390 results

1. Some $3$-designs invariant under $2.P{\Sigma}L(2,49).$

Author

Shi, Minjia, Liu, Ruowen, and Solé, Patrick

Subjects

Computer Science - Information Theory, Mathematics - Combinatorics, 94 B15, 05 B05

Abstract

We construct a ternary [49,25,7] code from the row span of a Jacobsthal matrix. It is equivalent to a Generalized Quadratic Residue (GQR) code in the sense of van Lint and MacWilliams (1978). These codes are the abelian generalizations of the quadratic residue (QR) codes which are cyclic. The union of the [50,25,8] extension of the said code and its dual supports a 3-(50,14,1248) design. The automorphism group of the latter design is a double cover of the permutation part of the automorphism group of the [50,25,8] code, which is isomorphic to $P{\Sigma}L(2,49).$ Other weights in this code, other GQR codes, and other QR codes yield other 3-designs by the same process. A simple group action argument is provided to explain this behaviour of isodual codes., Comment: 9 pages

Published

2024

2. Some bounds on the cardinality of the $b$-symbol weight spectrum of codes

Author

Zhu, Hongwei, Li, Shitao, Shi, Minjia, Xia, Shu-Tao, and Sole, Patrick

Subjects

Computer Science - Information Theory

Abstract

The size of the Hamming distance spectrum of a code has received great attention in recent research. The main objective of this paper is to extend these significant theories to the $b$-symbol distance spectrum. We examine this question for various types of codes, including unrestricted codes, additive codes, linear codes, and cyclic codes, successively. For the first three cases, we determine the maximum size of the $b$-symbol distance spectra of these codes smoothly. For the case of cyclic codes, we introduce three approaches to characterize the upper bound for the cardinality of the $b$-symbol weight spectrum of cyclic codes, namely the period distribution approach, the primitive idempotent approach, and the $b$-symbol weight formula approach. As two by-products of this paper, the maximum number of symplectic weights of linear codes is determined, and a basic inequality among the parameters $[n,k,d_H(\C)]_q$ of cyclic codes is provided.

Published

2024

3. Butson Hadamard matrices, bent sequences, and spherical codes

Author

Shi, Minjia, Lu, Danni, Armario, Andrés, Egan, Ronan, Ozbudak, Ferruh, and Solé, Patrick

Subjects

Computer Science - Cryptography and Security

Abstract

We explore a notion of bent sequence attached to the data consisting of an Hadamard matrix of order $n$ defined over the complex $q^{th}$ roots of unity, an eigenvalue of that matrix, and a Galois automorphism from the cyclotomic field of order $q.$ In particular we construct self-dual bent sequences for various $q\le 60$ and lengths $n\le 21.$ Computational construction methods comprise the resolution of polynomial systems by Groebner bases and eigenspace computations. Infinite families can be constructed from regular Hadamard matrices, Bush-type Hadamard matrices, and generalized Boolean bent functions.As an application, we estimate the covering radius of the code attached to that matrix over $\Z_q.$ We derive a lower bound on that quantity for the Chinese Euclidean metric when bent sequences exist. We give the Euclidean distance spectrum, and bound above the covering radius of an attached spherical code, depending on its strength as a spherical design.

Published

2023

4. A quaternary analogue of Tang-Ding codes

Author

Shi, Minjia, Tao, Sihui, Kim, Jon-Lark, and Sole, Patrick

Subjects

Computer Science - Information Theory, Computer Science - Cryptography and Security

Abstract

In a recent paper, Tang and Ding introduced a class of binary cyclic codes of rate close to one half with a designed lower bound on their minimum distance. The definition involves the base $2$ expansion of the integers in their defining set. In this paper we propose an analogue for quaternary codes. In addition, the performances of the subfield subcode and of the trace code (two binary cyclic codes) are investigated.

Published

2023

5. Generator polynomial matrices of the Galois hulls of multi-twisted codes

Author

Eldin, Ramy Taki and Sole, Patrick

Subjects

Computer Science - Information Theory

Abstract

In this study, we consider the Euclidean and Galois hulls of multi-twisted (MT) codes over a finite field $\mathbb{F}_{p^e}$ of characteristic $p$. Let $\mathbf{G}$ be a generator polynomial matrix (GPM) of a MT code $\mathcal{C}$. For any $0\le \kappa

Published

2023

6. The weight spectrum of two families of Reed-Muller codes

Author

Carlet, Claude and Solé, Patrick

Subjects

Computer Science - Information Theory, 94B27, 94D10

Abstract

We determine the weight spectra of the Reed-Muller codes $RM(m-3,m)$ for $m\ge 6$ and $RM(m-4,m)$ for $m\ge 8$. The technique used is induction on $m$, using that the sum of two weights in $RM(r-1,m-1)$ is a weight in $RM(r,m)$, and using the characterization by Kasami and Tokura of the weights in $RM(r,m)$ that lie between its minimum distance $2^{m-r}$ and the double of this minimum distance. We also derive the weights of $RM(3,8),\,RM(4,9),$ by the same technique. We conclude with a conjecture on the weights of $RM(m-c,m)$, where $c$ is fixed and $m$ is large enough., Comment: 11 pages

Published

2023

7. Additive complementary dual codes over $\F_4$

Author

Shi, Minjia, Liu, Na, Kim, Jon-Lark, and Solé, Patrick

Subjects

Computer Science - Information Theory, Computer Science - Cryptography and Security, Computer Science - Computers and Society, 94B05

Abstract

A linear code is linear complementary dual (LCD) if it meets its dual trivially. LCD codes have been a hot topic recently due to Boolean masking application in the security of embarked electronics (Carlet and Guilley, 2014). Additive codes over $\F_4$ are $\F_4$-codes that are stable by codeword addition but not necessarily by scalar multiplication. An additive code over $\F_4$ is additive complementary dual (ACD) if it meets its dual trivially. The aim of this research is to study such codes which meet their dual trivially. All the techniques and problems used to study LCD codes are potentially relevant to ACD codes. Interesting constructions of ACD codes from binary codes are given with respect to the trace Hermitian and trace Euclidean inner product. The former product is relevant to quantum codes.

Published

2022

8. On the coset graph construction of distance-regular graphs

Author

Shi, Minjia, Krotov, Denis S., and Solé, Patrick

Subjects

Mathematics - Combinatorics, Computer Science - Discrete Mathematics, 05E30, 94B25

Abstract

We show that no more new distance-regular graphs in the tables of the book of (Brouwer, Cohen, Neumaier, 1989) can be produced by using the coset graph of additive completely regular codes over finite fields.

Published

2022

9. Self-dual Hadamard bent sequences

Author

Shi, Minjia, Li, Yaya, Cheng, Wei, Crnković, Dean, Krotov, Denis, and Solé, Patrick

Subjects

Mathematics - Combinatorics, Computer Science - Information Theory, Primary 94D10, Secondary 15B34

Abstract

A new notion of bent sequence related to Hadamard matrices was introduced recently, motivated by a security application ( Sol\'e et al, 2021). We study the self dual class in length at most $196.$ We use three competing methods of generation: Exhaustion, Linear Algebra and Groebner bases. Regular Hadamard matrices and Bush-type Hadamard matrices provide many examples. We conjecture that if $v$ is an even perfect square, a self-dual bent sequence of length $v$ always exist. We introduce the strong automorphism group of Hadamard matrices, which acts on their associated self-dual bent sequences. We give an efficient algorithm to compute that group.

Published

2022

10. On the structure of $1$-generator quasi-polycyclic codes over finite chain rings

Author

Wu, Rongsheng, Shi, Minjia, and Solé, Patrick

Subjects

Computer Science - Information Theory

Abstract

Quasi-polycyclic (QP for short) codes over a finite chain ring $R$ are a generalization of quasi-cyclic codes, and these codes can be viewed as an $R[x]$-submodule of $\mathcal{R}_m^{\ell}$, where $\mathcal{R}_m:= R[x]/\langle f\rangle$, and $f$ is a monic polynomial of degree $m$ over $R$. If $f$ factors uniquely into monic and coprime basic irreducibles, then their algebraic structure allow us to characterize the generator polynomials and the minimal generating sets of 1-generator QP codes as $R$-modules. In addition, we also determine the parity check polynomials for these codes by using the strong Gr\"{o}bner bases. In particular, via Magma system, some quaternary codes with new parameters are derived from these 1-generator QP codes.

Published

2021

11. The covering radius of permutation designs

Author

Solé, Patrick

Subjects

Mathematics - Combinatorics, Computer Science - Information Theory, 05E30 (Primary), 94B60 (Secondary)

Abstract

A notion of $t$-designs in the symmetric group on $n$ letters was introduced by Godsil in 1988. In particular $t$-transitive sets of permutations form a $t$-design. We derive upper bounds on the covering radius of these designs, as a function of $n$ and $t$ and in terms of the largest zeros of Charlier polynomials., Comment: 8 pages. arXiv admin note: text overlap with arXiv:2105.07979

Published

2021

12. Self-orthogonal codes over a non-unital ring and combinatorial matrices

Author

Shi, Minjia, Wang, Shukai, Kim, Jon-Lark, and Solé, Patrick

Subjects

Computer Science - Information Theory, 94B05, F.2.2

Abstract

There is a local ring $E$ of order $4,$ without identity for the multiplication, defined by generators and relations as $E=\langle a,b \mid 2a=2b=0,\, a^2=a,\, b^2=b,\,ab=a,\, ba=b\rangle.$ We study a special construction of self-orthogonal codes over $E,$ based on combinatorial matrices related to two-class association schemes, Strongly Regular Graphs (SRG), and Doubly Regular Tournaments (DRT). We construct quasi self-dual codes over $E,$ and Type IV codes, that is, quasi self-dual codes whose all codewords have even Hamming weight. All these codes can be represented as formally self-dual additive codes over $\F_4.$ The classical invariant theory bound for the weight enumerators of this class of codesimproves the known bound on the minimum distance of Type IV codes over $E.$, Comment: 18 pages

Published

2021

13. Designs, permutations, and transitive groups

Author

Shi, Minjia, Li, XiaoXiao, and Solé, Patrick

Subjects

Mathematics - Combinatorics, Computer Science - Discrete Mathematics, Primary 05E35, Secondary O5E20, 05E24

Abstract

A notion of $t$-designs in the symmetric group on $n$ letters was introduced by Godsil in 1988. In particular $t$-transitive sets of permutations form a $t$-design. We derive special lower bounds for $t=1$ and $t=2$ by a power moment method. For general $n,t$ we give a %linear programming lower bound . For $n\ge 4$ and $t=2,$ this bound is strong enough to show a lower bound on the size of such $t$-designs of $n(n-1)\dots (n-t+1),$ which is best possible when sharply $t$-transitive sets of permutations exist. This shows, in particular, that tight $2$-designs do not exist., Comment: 12 pages. arXiv admin note: text overlap with arXiv:2102.08276

Published

2021

14. A new method for constructing linear codes with small hulls

Author

Qian, Liqin, Cao, Xiwang, Lu, Wei, and Sole, Patrick

Subjects

Computer Science - Information Theory

Abstract

The hull of a linear code over finite fields is the intersection of the code and its dual, which was introduced by Assmus and Key. In this paper, we develop a method to construct linear codes with trivial hull ( LCD codes) and one-dimensional hull by employing the positive characteristic analogues of Gauss sums. These codes are quasi-abelian, and sometimes doubly circulant. Some sufficient conditions for a linear code to be an LCD code (resp. a linear code with one-dimensional hull) are presented. It is worth mentioning that we present a lower bound on the minimum distances of the constructed linear codes. As an application, using these conditions, we obtain some optimal or almost optimal LCD codes (resp. linear codes with one-dimensional hull) with respect to the online Database of Grassl.

Published

2021

15. LCD Codes from tridiagonal Toeplitz matrice

Author

Shi, Minjia, Özbudak, Ferruh, Xu, Li, and Solé, Patrick

Subjects

Computer Science - Information Theory, Mathematics - Number Theory, 94B05, 15B05, 12E10

Abstract

Double Toeplitz (DT) codes are codes with a generator matrix of the form $(I,T)$ with $T$ a Toeplitz matrix, that is to say constant on the diagonals parallel to the main. When $T$ is tridiagonal and symmetric we determine its spectrum explicitly by using Dickson polynomials, and deduce from there conditions for the code to be LCD. Using a special concatenation process, we construct optimal or quasi-optimal examples of binary and ternary LCD codes from DT codes over extension fields., Comment: 16 pages

Published

2021

16. On isodual double Toeplitz codes

Author

Shi, Minjia, Xu, Li, and Solé, Patrick

Subjects

Computer Science - Information Theory, Primary 94B05, Secondary 11C08

Abstract

Double Toeplitz (shortly DT) codes are introduced here as a generalization of double circulant codes. We show that such a code is isodual, hence formally self-dual. Self-dual DT codes are characterized as double circulant or double negacirculant. Likewise, even DT binary codes are characterized as double circulants. Numerical examples obtained by exhaustive search show that the codes constructed have best-known minimum distance, up to one unit, amongst formally self-dual codes, and sometimes improve on the known values. Over $\F_4$ an explicit construction of DT codes, based on quadratic residues in a prime field, performs equally well. We show that DT codes are asymptotically good over $\F_q$. Specifically, we construct DT codes arbitrarily close to the asymptotic varshamov-Gilbert bound for codes of rate one half., Comment: 15 pages

Published

2021

17. Designs in finite metric spaces: a probabilistic approach

Author

Shi, Minjia, Rioul, Olivier, and Solé, Patrick

Subjects

Mathematics - Combinatorics, Computer Science - Information Theory, Primary 05E35, Secondary O5E20, 05E24

Abstract

A finite metric space is called here distance degree regular if its distance degree sequence is the same for every vertex. A notion of designs in such spaces is introduced that generalizes that of designs in $Q$-polynomial distance-regular graphs. An approximation of their cumulative distribution function, based on the notion of Christoffel function in approximation theory is given. As an application we derive limit laws on the weight distributions of binary orthogonal arrays of strength going to infinity. An analogous result for combinatorial designs of strength going to infinity is given., Comment: 18 pages

Published

2021

18. Zero sum sets in abelian groups

Author

Shi, Minjia, Krotov, Denis S., Li, Xiaoxiao, and Solé, Patrick

Subjects

Mathematics - Combinatorics, 05A18, 05E40, 68P27

Abstract

The distribution of cardinalities of zero-sum sets in abelian groups is completely determined. A complex summation involving the M\"obius function is given for the general abelian group, while in many special cases, including the case of elementary abelian groups, solved earlier by Li and Wan, it has a compact form. The proof involves two different M\"obius transforms, on positive integers and on set partitions., Comment: The result is not new, see [J. Li and D. Wan, Counting subset sums of finite abelian groups, J. Combin. Theory, Ser. A, 119(1) (2012), 170-182]

Published

2021

19. The extended binary quadratic residue code of length 42 holds a 3-design

Author

Bonnecaze, Alexis and Solé, Patrick

Subjects

Computer Science - Information Theory, Mathematics - Combinatorics, 94 B15, 62K10

Abstract

The codewords of weight $10$ of the $[42,21,10]$ extended binary quadratic residue code are shown to hold a design of parameters $3-(42,10,18).$ Its automorphism group is isomorphic to $PSL(2,41)$. Its existence can be explained neither by a transitivity argument, nor by the Assmus-Mattson theorem., Comment: 6 pages. Second version

Published

2021

20. On strongly walk regular graphs, triple sum sets and their codes

Author

Kiermaier, Michael, Kurz, Sascha, Solé, Patrick, Stoll, Michael, and Wassermann, Alfred

Subjects

Mathematics - Combinatorics, Primary 05E30, Secondary 11D41, 94B05

Abstract

Strongly walk regular graphs (SWRGs or $s$-SWRGs) form a natural generalization of strongly regular graphs (SRGs) where paths of length~2 are replaced by paths of length~$s$. They can be constructed as coset graphs of the duals of projective three-weight codes whose weights satisfy a certain equation. We provide classifications of the feasible parameters of these codes in the binary and ternary case for medium size code lengths. For the binary case, the divisibility of the weights of these codes is investigated and several general results are shown. It is known that an $s$-SWRG has at most 4 distinct eigenvalues $k > \theta_1 > \theta_2 > \theta_3$, and that the triple $(\theta_1, \theta_2, \theta_3)$ satisfies a certain homogeneous polynomial equation of degree $s - 2$ (Van Dam, Omidi, 2013). This equation defines a plane algebraic curve; we use methods from algorithmic arithmetic geometry to show that for $s = 5$ and $s = 7$, there are only the obvious solutions, and we conjecture this to remain true for all (odd) $s \ge 9$., Comment: 42 pages

Published

2020

21. The uncertainty principle over finite fields

Author

Borello, Martino and Solé, Patrick

Subjects

Mathematics - Combinatorics, Computer Science - Information Theory

Abstract

In this paper we study the uncertainty principle (UP) connecting a function over a finite field and its Mattson-Solomon polynomial, which is a kind of Fourier transform in positive characteristic. Three versions of the UP over finite fields are studied, in connection with the asymptotic theory of cyclic codes. We first show that no finite field satisfies the strong version of UP, introduced recently by Evra, Kowalsky, Lubotzky, 2017. A refinement of the weak version is given, by using the asymptotic Plotkin bound. A naive version, which is the direct analogue over finite fields of the Donoho-Stark bound over the complex numbers, is proved by using the BCH bound. It is strong enough to show that there exist sequences of cyclic codes of length $n$, arbitrary rate, and minimum distance $\Omega(n^\alpha)$ for all $0<\alpha<1/2$. Finally, a connection with Ramsey Theory is pointed out., Comment: 13 pages

Published

2020

22. Three-weight codes over rings and strongly walk regular graphs

Author

Kiermaier, Michael, Kurz, Sascha, Shi, Minjia, and Solé, Patrick

Subjects

Mathematics - Combinatorics, 05E30 (Primary), 94B05 (Secondary)

Abstract

We construct strongly walk-regular graphs as coset graphs of the duals of codes with three non-zero homogeneous weights over $\mathbb{Z}_{p^m},$ for $p$ a prime, and more generally over chain rings of depth $m$, and with a residue field of size $q$, a prime power. Infinite families of examples are built from Kerdock and generalized Teichm\"uller codes. As a byproduct, we give an alternative proof that the Kerdock code is nonlinear., Comment: 28 pages, 6 tables

Published

2019

23. Two-weight codes over the integers modulo a prime power

Author

Shi, Minjia, Helleseth, Tor, and Sole, Patrick

Subjects

Computer Science - Information Theory, Computer Science - Cryptography and Security

Abstract

Let $p$ be a prime number. Irreducible cyclic codes of length $p^2-1$ and dimension $2$ over the integers modulo $p^h$ are shown to have exactly two nonzero Hamming weights. The construction uses the Galois ring of characteristic $p^h$ and order $p^{2h}.$ When the check polynomial is primitive, the code meets the Griesmer bound of (Shiromoto, Storme) (2012). By puncturing some projective codes are constructed. Those in length $p+1$ meet a Singleton-like bound of (Shiromoto , 2000). An infinite family of strongly regular graphs is constructed as coset graphs of the duals of these projective codes. A common cover of all these graphs, for fixed $p$, is provided by considering the Hensel lifting of these cyclic codes over the $p$-adic numbers.

Published

2019

24. Asymptotic performance of metacyclic codes

Author

Borello, Martino, Moree, Pieter, and Solé, Patrick

Subjects

Computer Science - Information Theory, Mathematics - Combinatorics

Abstract

A finite group with a cyclic normal subgroup N such that G/N is cyclic is said to be metacyclic. A code over a finite field F is a metacyclic code if it is a left ideal in the group algebra FG for G a metacyclic group. Metacyclic codes are generalizations of dihedral codes, and can be constructed as quasi-cyclic codes with an extra automorphism. In this paper, we prove that metacyclic codes form an asymptotically good family of codes. Our proof relies on a version of Artin's conjecture for primitive roots in arithmetic progression being true under the Generalized Riemann Hypothesis (GRH)., Comment: 6 pages

Published

2019

25. Good Stabilizer Codes from Quasi-Cyclic Codes over $\mathbb{F}_4$ and $\mathbb{F}_9$

Author

Ezerman, Martianus Frederic, Ling, San, Özkaya, Buket, and Solé, Patrick

Subjects

Computer Science - Information Theory

Abstract

We apply quantum Construction X on quasi-cyclic codes with large Hermitian hulls over $\mathbb{F}_4$ and $\mathbb{F}_9$ to derive good qubit and qutrit stabilizer codes, respectively. In several occasions we obtain quantum codes with stricly improved parameters than the current record. In numerous other occasions we obtain quantum codes with best-known performance. For the qutrit ones we supply a systematic construction to fill some gaps in the literature., Comment: Accepted ISIT 2019

Published

2019

26. Construction of isodual codes from polycirculant matrices

Author

Shi, Minjia, Xu, Li, and Sole, Patrick

Subjects

Computer Science - Cryptography and Security

Abstract

Double polycirculant codes are introduced here as a generalization of double circulant codes. When the matrix of the polyshift is a companion matrix of a trinomial, we show that such a code is isodual, hence formally self-dual. Numerical examples show that the codes constructed have optimal or quasi-optimal parameters amongst formally self-dual codes. Self-duality, the trivial case of isoduality, can only occur over $ \F_2$ in the double circulant case. Building on an explicit infinite sequence of irreducible trinomials over $\F_2,$ we show that binary double polycirculant codes are asymptotically good.

Published

2018

27. A new approach to the Kasami codes of type 2

Author

Shi, Minjia, Krotov, Denis, and Solé, Patrick

Subjects

Computer Science - Information Theory, Mathematics - Combinatorics, 05E30, 94B05

Abstract

The dual of the Kasami code of length $q^2-1$, with $q$ a power of $2$, is constructed by concatenating a cyclic MDS code of length $q+1$ over $F_q$ with a Simplex code of length $q-1$. This yields a new derivation of the weight distribution of the Kasami code, a new description of its coset graph, and a new proof that the Kasami code is completely regular. The automorphism groups of the Kasami code and the related $q$-ary MDS code are determined. New cyclic completely regular codes over finite fields a power of $2$, generalized Kasami codes, are constructed; they have coset graphs isomorphic to that of the Kasami codes. Another wide class of completely regular codes, including additive codes, as well as unrestricted codes, is obtained by combining cosets of the Kasami or generalized Kasami code., Comment: Revised version. The automorphism-group part essentially updated (in the previous versions, it contained incorrect results)

Published

2018

28. How many weights can a cyclic code have ?

Author

Shi, Minjia, Li, Xiaoxiao, Neri, Alessandro, and Solé, Patrick

Subjects

Computer Science - Information Theory

Abstract

Upper and lower bounds on the largest number of weights in a cyclic code of given length, dimension and alphabet are given. An application to irreducible cyclic codes is considered. Sharper upper bounds are given for the special cyclic codes (called here strongly cyclic), {whose nonzero codewords have period equal to the length of the code}. Asymptotics are derived on the function $\Gamma(k,q),$ {that is defined as} the largest number of nonzero weights a cyclic code of dimension $k$ over $\F_q$ can have, and an algorithm to compute it is sketched. The nonzero weights in some infinite families of Reed-Muller codes, either binary or $q$-ary, as well as in the $q$-ary Hamming code are determined, two difficult results of independent interest., Comment: submitted on 21 June, 2018

Published

2018

29. The Concatenated Structure of Quasi-Abelian Codes

Author

Borello, Martino, Güneri, Cem, Saçıkara, Elif, and Solé, Patrick

Subjects

Computer Science - Information Theory

Abstract

The decomposition of a quasi-abelian code into shorter linear codes over larger alphabets was given in (Jitman, Ling, (2015)), extending the analogous Chinese remainder decomposition of quasi-cyclic codes (Ling, Sol\'e, (2001)). We give a concatenated decomposition of quasi-abelian codes and show, as in the quasi-cyclic case, that the two decompositions are equivalent. The concatenated decomposition allows us to give a general minimum distance bound for quasi-abelian codes and to construct some optimal codes. Moreover, we show by examples that the minimum distance bound is sharp in some cases. In addition, examples of large strictly quasi-abelian codes of about a half rate are given. The concatenated structure also enables us to conclude that strictly quasi-abelian linear complementary dual codes over any finite field are asymptotically good., Comment: 13 pages

Published

2018

30. A complete characterization of plateaued Boolean functions in terms of their Cayley graphs

Author

Riera, Constanza, Sole, Patrick, and Stanica, Pantelimon

Subjects

Mathematics - Combinatorics, Computer Science - Information Theory

Abstract

In this paper we find a complete characterization of plateaued Boolean functions in terms of the associated Cayley graphs. Precisely, we show that a Boolean function $f$ is $s$-plateaued (of weight $=2^{(n+s-2)/2}$) if and only if the associated Cayley graph is a complete bipartite graph between the support of $f$ and its complement (hence the graph is strongly regular of parameters $e=0,d=2^{(n+s-2)/2}$). Moreover, a Boolean function $f$ is $s$-plateaued (of weight $\neq 2^{(n+s-2)/2}$) if and only if the associated Cayley graph is strongly $3$-walk-regular (and also strongly $\ell$-walk-regular, for all odd $\ell\geq 3$) with some explicitly given parameters., Comment: 7 pages, 1 figure, Proceedings of Africacrypt 2018

Published

2018

31. A new distance-regular graph of diameter 3 on 1024 vertices

Author

Shi, Minjia, Krotov, Denis, and Solé, Patrick

Subjects

Mathematics - Combinatorics, Computer Science - Information Theory, 05E30, 94B05

Abstract

The dodecacode is a nonlinear additive quaternary code of length $12$. By puncturing it at any of the twelve coordinates, we obtain a uniformly packed code of distance $5$. In particular, this latter code is completely regular but not completely transitive. Its coset graph is distance-regular of diameter three on $2^{10}$ vertices, with new intersection array $\{33,30,15;1,2,15\}$. The automorphism groups of the code, and of the graph, are determined. Connecting the vertices at distance two gives a strongly regular graph of (previously known) parameters $(2^{10},495,238,240)$. Another strongly regular graph with the same parameters is constructed on the codewords of the dual code. A non trivial completely regular binary code of length $33$ is constructed.

Published

2018

32. On self-dual and LCD double circulant and double negacirculant codes over $\mathbb{F}_q + u\mathbb{F}_q$

Author

Shi, Minjia, Zhu, Hongwei, Qian, Liqin, Sok, Lin, and Solé, Patrick

Subjects

Computer Science - Information Theory

Abstract

Double circulant codes of length $2n$ over the semilocal ring $R = \mathbb{F}_q + u\mathbb{F}_q,\, u^2=u,$ are studied when $q$ is an odd prime power, and $-1$ is a square in $\mathbb{F}_q.$ Double negacirculant codes of length $2n$ are studied over $R$ when $n$ is even and $q$ is an odd prime power. Exact enumeration of self-dual and LCD such codes for given length $2n$ is given. Employing a duality-preserving Gray map, self-dual and LCD codes of length $4n$ over $\mathbb{F}_q$ are constructed. Using random coding and the Artin conjecture, the relative distance of these codes is bounded below. The parameters of examples of the modest length are computed. Several such codes are optimal., Comment: 20 pages, submitted on 26 November, 2017

Published

2018

33. Linear codes with few weights over $\mathbb{F}_2+u\mathbb{F}_2$

Author

Shi, Minjia, Qian, Liqin, and Sole, Patrick

Subjects

Computer Science - Information Theory

Abstract

In this paper, we construct an infinite family of five-weight codes from trace codes over the ring $R=\mathbb{F}_2+u\mathbb{F}_2$, where $u^2=0.$ The trace codes have the algebraic structure of abelian codes. Their Lee weight is computed by using character sums. Combined with Pless power moments and Newton's Identities, the weight distribution of the Gray image of trace codes was present. Their support structure is determined. An application to secret sharing schemes is given., Comment: 14 pages, need help in page 12. arXiv admin note: text overlap with arXiv:1612.00966

Published

2018

34. How many weights can a linear code have ?

Author

Shi, Minjia, Zhu, Hongwei, Solé, Patrick, and Cohen, Gérard D.

Subjects

Computer Science - Information Theory

Abstract

We study the combinatorial function $L(k,q),$ the maximum number of nonzero weights a linear code of dimension $k$ over $\F_q$ can have. We determine it completely for $q=2,$ and for $k=2,$ and provide upper and lower bounds in the general case when both $k$ and $q$ are $\ge 3.$ A refinement $L(n,k,q),$ as well as nonlinear analogues $N(M,q)$ and $N(n,M,q),$ are also introduced and studied.

Published

2018

35. Double circulant self-dual and LCD codes over Galois rings

Author

Shi, Minjia, Huang, Daitao, Sok, Lin, and Solé, Patrick

Subjects

Computer Science - Information Theory

Abstract

This paper investigates the existence, enumeration and asymptotic performance of self-dual and LCD double circulant codes over Galois rings of characteristic $p^2$ and order $p^4$ with $p$ and odd prime. When $p \equiv 3 \pmod{4},$ we give an algorithm to construct a duality preserving bijective Gray map from such a Galois ring to $\mathbb{Z}_{p^2}^2.$ Using random coding, we obtain families of asymptotically good self-dual and LCD codes over $\mathbb{Z}_{p^2},$ for the metric induced by the standard $\mathbb{F}_p$-valued Gray maps., Comment: Sbumitted on 4, December, 20 pages

Published

2018

36. On the proximity of large primes

Author

Shi, Minjia, Luca, Florian, and Solé, Patrick

Subjects

Mathematics - Number Theory, Primary 11A25, Secondary 11B75

Abstract

By a sphere-packing argument, we show that there are infinitely many pairs of primes that are close to each other for some metrics on the integers. In particular, for any numeration basis $q$, we show that there are infinitely many pairs of primes the base $q$ expansion of which differ in at most two digits. Likewise, for any fixed integer $t,$ there are infinitely many pairs of primes, the first $t$ digits of which are the same. In another direction, we show that, there is a constant $c$ depending on $q$ such that for infinitely many integers $m$ there are at least $c\log \log m$ primes which differ from $m$ by at most one base $q$ digit.

Published

2017

37. Asymptotically Good Additive Cyclic Codes Exist

Author

Shi, Minjia, Wu, Rongsheng, and Sole, Patrick

Subjects

Computer Science - Information Theory

Abstract

Long quasi-cyclic codes of any fixed index $>1$ have been shown to be asymptotically good, depending on Artin primitive root conjecture in (A. Alahmadi, C. G\"uneri, H. Shoaib, P. Sol\'e, 2017). We use this recent result to construct good long additive cyclic codes on any extension of fixed degree of the base field. Similarly self-dual double circulant codes, and self-dual four circulant codes, have been shown to be good, also depending on Artin primitive root conjecture in (A. Alahmadi, F. \"Ozdemir, P. Sol\'e, 2017) and ( M. Shi, H. Zhu, P. Sol\'e, 2017) respectively. Building on these recent results, we can show that long cyclic codes are good over $\F_q,$ for many classes of $q$'s. This is a partial solution to a fifty year old open problem.

Published

2017

38. On self-dual four circulant codes

Author

Shi, Minjia, Zhu, Hongwei, and Sole, Patrick

Subjects

Computer Science - Information Theory

Abstract

Four circulant codes form a special class of $2$-generator, index $4$, quasi-cyclic codes. Under some conditions on their generator matrices they can be shown to be self-dual. Artin primitive root conjecture shows the existence of an infinite subclass of these codes satisfying a modified Gilbert-Varshamov bound., Comment: Submitted on 29 May

Published

2017

39. On self-dual negacirculant codes of index two and four

Author

Shi, Minjia, Liqin, Qian, and Sole, Patrick

Subjects

Computer Science - Information Theory

Abstract

In this paper, we study a special kind of factorization of $x^n+1$ over $\mathbb{F}_q, $ with $q$ a prime power $\equiv 3~({\rm mod}~4)$ when $n=2p,$ with $p\equiv 3~({\rm mod}~4)$ and $p$ is a prime. Given such a $q$ infinitely many such $p$'s exist that admit $q$ as a primitive root by the Artin conjecture in arithmetic progressions. This number theory conjecture is known to hold under GRH. We study the double (resp. four)-negacirculant codes over finite fields $\mathbb{F}_q, $ of co-index such $n$'s, including the exact enumeration of the self-dual subclass, and a modified Varshamov-Gilbert bound on the relative distance of the codes it contains., Comment: Design, Codes and Cryptography,2018

Published

2017

40. Pisano period codes

Author

Shi, Minjia, Zhang, Zhongyi, and Sole, Patrick

Subjects

Computer Science - Information Theory

Abstract

The cyclic codes with parity check polynomial the reciprocal of the characteristic polynomial of the Fibonacci recurrence over a prime finite field are shown to have either one weight or two weights. When these codes are irreducible cyclic we obtain many counterexamples to the conjectural classification of two-weight irreducible cyclic codes of Schmidt and White (2002). When they are reducible and projective their duals are uniformly packed., Comment: 10 pages, submitted on 9th, September

Published

2017

41. Two-weight codes and second order recurrences

Author

Shi, Minjia, Zhang, Zhongyi, and Sole, Patrick

Subjects

Computer Science - Information Theory

Abstract

Cyclic codes of dimension $2$ over a finite field are shown to have at most two nonzero weights. This extends a construction of Rao et al (2010) and disproves a conjecture of Schmidt-White (2002). We compute their weight distribution, and give a condition on the roots of their check polynomials for them to be MDS., Comment: 10 pages

Published

2017

42. Two weight $\mathbb{Z}_{p^k}$-codes, $p$ odd prime

Author

Shi, MinJia, Sepasdar, Zahra, Wu, Rongsheng, and Solé, Patrick

Subjects

Computer Science - Information Theory, 94B05

Abstract

We show that regular homogeneous two-weight $\mathbb{Z}_{p^k}$-codes where $p$ is odd and $k\geqslant 2$ with dual Hamming distance at least four do not exist. The proof relies on existence conditions for the strongly regular graph built on the cosets of the dual code., Comment: This paper has been submitted in early 2016

Published

2017

43. $\Theta_S-$cyclic codes over $A_k$

Author

Irwansyah, Barra, Aleams, Dougherty, Steven T., Muchlis, Ahmad, Muchtadi-Alamsyah, Intan, Solé, Patrick, Suprijanto, Djoko, and Yemen, Olfa

Subjects

Computer Science - Information Theory, Mathematics - Combinatorics, 94B15

Abstract

We study $\Theta_S-$cyclic codes over the family of rings $A_k.$ We characterize $\Theta_S-$cyclic codes in terms of their binary images. A family of Hermitian inner-products is defined and we prove that if a code is $\Theta_S-$cyclic then its Hermitian dual is also $\Theta_S-$cyclic. Finally, we give constructions of $\Theta_S-$cyclic codes., Comment: 23 pages

Published

2017

44. Trace codes over $\Z_4$ and Boolean function

Author

Shi, Minjia, Liu, Yan, Hugues, Randriam, Sok, Lin, and Sole, Patrick

Subjects

Computer Science - Information Theory

Abstract

We construct trace codes over $\Z_4$ by using Boolean functions and skew sets, respectively. Their Lee weight distribution is studied by using a Galois ring version of the Walsh-Hadamard transform and exponential sums. We obtain a new family of optimal two-weight codes over $\Z_4.$

Published

2017

45. Constructions of optimal LCD codes over large finite fields

Author

Sok, Lin, Shi, Minjia, and Solé, Patrick

Subjects

Computer Science - Information Theory

Abstract

In this paper, we prove existence of optimal complementary dual codes (LCD codes) over large finite fields. We also give methods to generate orthogonal matrices over finite fields and then apply them to construct LCD codes. Construction methods include random sampling in the orthogonal group, code extension, matrix product codes and projection over a self-dual basis., Comment: This paper was presented in part at the International Conference on Coding, Cryptography and Related Topics April 7-10, 2017, Shandong, China

Published

2017

46. On linear complementary-dual multinegacirculant codes

Author

Alahmadi, Adel, Güneri, Cem, Özkaya, Buket, Shoaib, Hatoon, and Solé, Patrick

Subjects

Computer Science - Information Theory

Abstract

Linear codes with complementary-duals (LCD) are linear codes that intersect with their dual trivially. Multinegacirculant codes of index $2$ that are LCD are characterized algebraically and some good codes are found in this family. Exact enumeration is performed for indices 2 and 3, and for all indices $t$ for a special case of the co-index by using their concatenated structure. Asymptotic existence results are derived for the special class of such codes that are one-generator and have co-index a power of two by means of Dickson polynomials. This shows that there are infinite families of LCD multinegacirculant codes with relative distance satisfying a modified Varshamov-Gilbert bound., Comment: arXiv admin note: text overlap with arXiv:1606.00815

Published

2017

47. Long quasi-polycyclic $t-$CIS codes

Author

Alahmadi, Adel, Güneri, Cem, Shoaib, Hatoon, and Solé, Patrick

Subjects

Computer Science - Information Theory

Abstract

We study complementary information set codes of length $tn$ and dimension $n$ of order $t$ called ($t-$CIS code for short). Quasi-cyclic and quasi-twisted $t$-CIS codes are enumerated by using their concatenated structure. Asymptotic existence results are derived for one-generator and have co-index $n$ by Artin's conjecture for quasi cyclic and special case for quasi twisted. This shows that there are infinite families of long QC and QT $t$-CIS codes with relative distance satisfying a modified Varshamov-Gilbert bound for rate $1/t$ codes. Similar results are defined for the new and more general class of quasi-polycyclic codes introduced recently by Berger and Amrani., Comment: 12 pages

Published

2017

48. Structure and Performance of Generalized Quasi-Cyclic Codes

Author

Güneri, Cem, Özbudak, Ferruh, Özkaya, Buket, Saçıkara, Elif, Sepasdar, Zahra, and Solé, Patrick

Subjects

Computer Science - Information Theory

Abstract

Generalized quasi-cyclic (GQC) codes form a natural generalization of quasi-cyclic (QC) codes. They are viewed here as mixed alphabet codes over a family of ring alphabets. Decomposing these rings into local rings by the Chinese Remainder Theorem yields a decomposition of GQC codes into a sum of concatenated codes. This decomposition leads to a trace formula, a minimum distance bound, and to a criteria for the GQC code to be self-dual or to be linear complementary dual (LCD). Explicit long GQC codes that are LCD, but not QC, are exhibited.

Published

2017

49. New Classes of $p$-ary Few Weights Codes

Author

Shi, Minjia, Wu, Rongsheng, Qian, Liqin, Sok, Lin, and Solé, Patrick

Subjects

Computer Science - Information Theory, 94B25

Abstract

In this paper, several classes of three-weight codes and two-weight codes for the homogeneous metric over the chain ring $R=\mathbb{F}_p+u\mathbb{F}_p+\cdots +u^{k-1}\mathbb{F}_{p},$ with $u^k=0,$ are constructed, which generalises \cite{SL}, the special case of $p=k=2.$ These codes are defined as trace codes. In some cases of their defining sets, they are abelian. Their homogeneous weight distributions are computed by using exponential sums. In particular, in the two-weight case, we give some conditions of optimality of their Gray images by using the Griesmer bound. Their dual homogeneous distance is also given. The codewords of these codes are shown to be minimal for inclusion of supports, a fact favorable to an application to secret sharing schemes., Comment: This manuscript in contained in arXiv:1612.00915, thus the authors expect to withdraw it

Published

2016

50. Two new families of two-weight codes

Author

Shi, Minjia, Guan, Yue, and Sole, Patrick

Subjects

Computer Science - Information Theory, 94B25

Abstract

We construct two new infinite families of trace codes of dimension $2m$, over the ring $\mathbb{F}_p+u\mathbb{F}_p,$ when $p$ is an odd prime. They have the algebraic structure of abelian codes. Their Lee weight distribution is computed by using Gauss sums. By Gray mapping, we obtain two infinite families of linear $p$-ary codes of respective lengths $(p^m-1)^2$ and $2(p^m-1)^2.$ When $m$ is singly-even, the first family gives five-weight codes. When $m$ is odd, and $p\equiv 3 \pmod{4},$ the first family yields $p$-ary two-weight codes, which are shown to be optimal by application of the Griesmer bound. The second family consists of two-weight codes that are shown to be optimal, by the Griesmer bound, whenever $p=3$ and $m \ge 3,$ or $p\ge 5$ and $m\ge 4.$ Applications to secret sharing schemes are given., Comment: 7 pages

Published

2016