SHI Minjia, “Optimal p-ary Codes from One-weight Linear Codes over Zpm,” Chinese Journal of Electronics, vol. 22, no. 4, pp. 799-802, 2013,
Citation: SHI Minjia, “Optimal p-ary Codes from One-weight Linear Codes over Zpm,” Chinese Journal of Electronics, vol. 22, no. 4, pp. 799-802, 2013,

Optimal p-ary Codes from One-weight Linear Codes over Zpm

Funds:  This work is supported by the National Natural Science Foundation of China (No.61202068, No.11126174), Talents youth Fund of Anhui Province Universities (No.2012SQRL020ZD), Youth Science Research Fund of Anhui University (No.2009QN026B).
  • Received Date: 2010-05-01
  • Rev Recd Date: 2012-11-01
  • Publish Date: 2013-09-25
  • We investigate the structures and properties of one-Homogeneous (Lee) weight linear codes over the ring of integers modulo M (M is a power of a prime integer p) with one unique nonzero weight. We fully describe one-Homogeneous (Lee) weight codes over rings of integers modulo 4, 8 and 9. By the generalized Gray map, we obtain a class of optimal binary linear codes which reaches the Griesmer bound as well as the plotkin bound and a class of optimal p-ary (p is odd and prime) nonlinear codes which attains the Plotkin bound.
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