• Title/Summary/Keyword: self-orthogonal codes

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THE CLASSIFICATION OF SELF-ORTHOGONAL CODES OVER ℤp2 OF LENGTHS ≤ 3

  • Choi, Whan-Hyuk;Kim, Kwang Ho;Park, Sook Young
    • Korean Journal of Mathematics
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    • v.22 no.4
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    • pp.725-742
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    • 2014
  • In this paper, we find all inequivalent classes of self-orthogonal codes over $Z_{p^2}$ of lengths $l{\leq}3$ for all primes p, using similar method as in [3]. We find that the classification of self-orthogonal codes over $Z_{p^2}$ includes the classification of all codes over $Z_p$. Consequently, we classify all the codes over $Z_p$ and self-orthogonal codes over $Z_{p^2}$ of lengths $l{\leq}3$ according to the automorphism group of each code.

CONSTRUCTION FOR SELF-ORTHOGONAL CODES OVER A CERTAIN NON-CHAIN FROBENIUS RING

  • Kim, Boran
    • Journal of the Korean Mathematical Society
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    • v.59 no.1
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    • pp.193-204
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    • 2022
  • We present construction methods for free self-orthogonal (self-dual or Type II) codes over ℤ4[v]/〈v2 + 2v〉 which is one of the finite commutative local non-chain Frobenius rings of order 16. By considering their Gray images on ℤ4, we give a construct method for a code over ℤ4. We have some new and optimal codes over ℤ4 with respect to the minimum Lee weight or minimum Euclidean weight.

An Efficient Algorithm for finding Optimal Spans to determine R=1/2 Rate Systematic Convolutional Self-Doubly Orthogonal Codes (R=1/2 Self-Doubly 조직 직교 길쌈부호를 찾는 효율적인 최적 스팬 알고리듬)

  • Doniyor, Atabaev;Suh, Hee-Jong
    • The Journal of the Korea institute of electronic communication sciences
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    • v.10 no.11
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    • pp.1239-1244
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    • 2015
  • In this paper, a new method for finding optimal and short span in Convolutional Self-Doubly Orthogonal(CDO) codes are proposed. This new algorithm based on Parallel Implicitly-Exhaustive search, where we applied dynamic search space reduction methods in order to reduce computational time for finding Optimal Span for R=1/2 rate CDO codes. The simulation results shows that speedup and error correction performance of the new algorithm is better.

SIMPLE-ROOT NEGACYCLIC CODES OF LENGTH 2pnm OVER A FINITE FIELD

  • SHARMA, ANURADHA
    • Journal of the Korean Mathematical Society
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    • v.52 no.5
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    • pp.965-989
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    • 2015
  • Let p, ${\ell}$ be distinct odd primes, q be an odd prime power with gcd(q, p) = gcd(q,${\ell}$) = 1, and m, n be positive integers. In this paper, we determine all self-dual, self-orthogonal and complementary-dual negacyclic codes of length $2p^{n{\ell}m}$ over the finite field ${\mathbb{F}}_q$ with q elements. We also illustrate our results with some examples.

MATHIEU GROUP COVERINGS AND GOLAY CODES

  • Yie, Ik-Kwon
    • Journal of the Korean Mathematical Society
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    • v.39 no.2
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    • pp.289-317
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    • 2002
  • We associate binary codes to polynomials over fields of characteristic two and show that the binary Golay codes are associated to the Mathieu group polynomials in characteristics two. We give two more polynomials whose Galois group in $M_{12}$ but different self-orthogonal binary codes are associated. Also, we find a family of $M_{24}$-coverings which includes previous ones.

REPEATED-ROOT CONSTACYCLIC CODES OF LENGTH 2ps OVER GALOIS RINGS

  • Klin-eam, Chakkrid;Sriwirach, Wateekorn
    • Bulletin of the Korean Mathematical Society
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    • v.56 no.1
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    • pp.131-150
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    • 2019
  • In this paper, we consider the structure of ${\gamma}$-constacyclic codes of length $2p^s$ over the Galois ring $GR(p^a,m)$ for any unit ${\gamma}$ of the form ${\xi}_0+p{\xi}_1+p^2z$, where $z{\in}GR(p^a,m)$ and ${\xi}_0$, ${\xi}_1$ are nonzero elements of the set ${\mathcal{T}}(p,m)$. Here ${\mathcal{T}}(p,m)$ denotes a complete set of representatives of the cosets ${\frac{GR(p^a,m)}{pGR(p^a,m)}}={\mathbb{F}}p^m$ in $GR(p^a,m)$. When ${\gamma}$ is not a square, the rings ${\mathcal{R}}_p(a,m,{\gamma})=\frac{GR(p^a,m)[x]}{{\langle}x^2p^s-{\gamma}{\rangle}}$ is a chain ring with maximal ideal ${\langle}x^2-{\delta}{\rangle}$, where ${\delta}p^s={\xi}_0$, and the number of codewords of ${\gamma}$-constacyclic code are provided. Furthermore, the self-orthogonal and self-dual ${\gamma}$-constacyclic codes of length $2p^s$ over $GR(p^a,m)$ are also established. Finally, we determine the Rosenbloom-Tsfasman (RT) distances and weight distributions of all such codes.