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Nonexistence of [n, 5, d] q Codes Attaining the Griesmer Bound for q4 −2q2 −2q+1 ≤ dq4−2q2q

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Abstract

We prove that there does not exist a [q4+q3q2−3q−1, 5, q4−2q2−2q+1] q code over the finite field \(\mathbb{F}_q\) for q≥ 5. Using this, we prove that there does not exist a [g q (5, d), 5, d] q code with q4 −2q2 −2q +1 ≤ dq4 −2q2q for q≥ 5, where g q (k,d) denotes the Griesmer bound.

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Authors and Affiliations

  1. Department of Mathematics and Research Institute of Natural Science, Gyeongsang National University, Jinju, 660-701, Korea

    E. J. Cheon & S. J. Kim

  2. Department of Mathematical Sciences, Yamaguchi University, Yamaguchi, 753-8512, Japan

    T. Kato

Authors
  1. E. J. Cheon
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  2. T. Kato
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  3. S. J. Kim
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Correspondence to E. J. Cheon.

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MSC 2000: 94B65, 94B05, 51E20, 05B25

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Cheon, E.J., Kato, T. & Kim, S.J. Nonexistence of [n, 5, d] q Codes Attaining the Griesmer Bound for q4 −2q2 −2q+1 ≤ dq4−2q2q. Des Codes Crypt 36, 289–299 (2005). https://doi.org/10.1007/s10623-004-1720-6

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  • DOI: https://doi.org/10.1007/s10623-004-1720-6

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