On optimal linear codes over .
Kanazawa, Rie, Maruta, Tatsuya (2011)
The Electronic Journal of Combinatorics [electronic only]
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Displaying similar documents to “Optimal four-dimensional codes over .”
On optimal linear codes over .
Necessary and Sufficient Conditions for the Extendability of Ternary Linear Codes
Okamoto, Kei (2008)
Serdica Journal of Computing
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We give the necessary and sufficient conditions for the extendability of ternary linear codes of dimension k ≥ 5 with minimum distance d ≡ 1 or 2 (mod 3) from a geometrical point of view.
The Nonexistence of [132, 6, 86]3 Codes and [135, 6, 88]3 Codes
Oya, Yusuke (2011)
Serdica Journal of Computing
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We prove the nonexistence of [g3(6, d), 6, d]3 codes for d = 86, 87, 88, where g3(k, d) = ∑⌈d/3i⌉ and i=0 ... k−1. This determines n3(6, d) for d = 86, 87, 88, where nq(k, d) is the minimum length n for which an [n, k, d]q code exists.
An Improvement to the Achievement of the Griesmer Bound
Hamada, Noboru, Maruta, Tatsuya (2010)
Serdica Journal of Computing
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We denoted by nq(k, d), the smallest value of n for which an [n, k, d]q code exists for given q, k, d. Since nq(k, d) = gq(k, d) for all d ≥ dk + 1 for q ≥ k ≥ 3, it is a natural question whether the Griesmer bound is attained or not for d = dk , where gq(k, d) = ∑[d/q^i], i=0,...,k-1, dk = (k − 2)q^(k−1) − (k − 1)q^(k−2). It was shown by Dodunekov [2] and Maruta [9], [10] that there is no [gq(k, dk ), k, dk ]q code for q ≥ k, k = 3, 4, 5 and for q ≥ 2k − 3, k ≥ 6. The purpose...
Construction of Optimal Linear Codes by Geometric Puncturing
Maruta, Tatsuya (2013)
Serdica Journal of Computing
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Dedicated to the memory of S.M. Dodunekov (1945–2012)Abstract. Geometric puncturing is a method to construct new codes. ACM Computing Classification System (1998): E.4. ∗This research was partially supported by Grant-in-Aid for Scientific Research of Japan Society for the Promotion of Science under Contract Number 24540138.
Ternary constant weight codes.
Östergård, Patric R.J., Svanström, Mattias (2002)
The Electronic Journal of Combinatorics [electronic only]
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Divisible Codes - A Survey
Ward, Harold (2001)
Serdica Mathematical Journal
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This paper surveys parts of the study of divisibility properties of codes. The survey begins with the motivating background involving polynomials over finite fields. Then it presents recent results on bounds and applications to optimal codes.
Codes from cubic curves and their extensions.
Alderson, T.L., Bruen, A.A. (2008)
The Electronic Journal of Combinatorics [electronic only]
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On Multiple Deletion Codes
Landjev, Ivan, Haralambiev, Kristiyan (2007)
Serdica Journal of Computing
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In 1965 Levenshtein introduced the deletion correcting codes and found an asymptotically optimal family of 1-deletion correcting codes. During the years there has been a little or no research on t-deletion correcting codes for larger values of t. In this paper, we consider the problem of finding the maximal cardinality L2(n;t) of a binary t-deletion correcting code of length n. We construct an infinite family of binary t-deletion correcting codes. By computer search, we construct t-deletion...
Improvements on the Juxtaposing Theorem
Gashkov, Igor, Larsson, Henrik (2007)
Serdica Journal of Computing
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A new class of binary constant weight codes is presented. We establish new lower bound and exact values on A(n1 +n2; 2(a1 +a2); n2) ≥ min {M1;M2}+1, if A(n1; 2a1; a1 +b1) = M1 and A(n2; 2b2; a2 +b2) = M2, in particular, A(30; 16; 15) = 16 and A(33; 18; 15) = 11.
New optimal constant weight codes.
Gashkov, I., Taub, D. (2007)
The Electronic Journal of Combinatorics [electronic only]
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