English

Z2Z4-linear codes: generator matrices and duality

Information Theory 2007-10-08 v1 Discrete Mathematics Combinatorics math.IT

Abstract

A code C{\cal C} is Z2Z4\Z_2\Z_4-additive if the set of coordinates can be partitioned into two subsets XX and YY such that the punctured code of C{\cal C} by deleting the coordinates outside XX (respectively, YY) is a binary linear code (respectively, a quaternary linear code). In this paper Z2Z4\Z_2\Z_4-additive codes are studied. Their corresponding binary images, via the Gray map, are Z2Z4\Z_2\Z_4-linear codes, which seem to be a very distinguished class of binary group codes. As for binary and quaternary linear codes, for these codes the fundamental parameters are found and standard forms for generator and parity check matrices are given. For this, the appropriate inner product is deduced and the concept of duality for Z2Z4\Z_2\Z_4-additive codes is defined. Moreover, the parameters of the dual codes are computed. Finally, some conditions for self-duality of Z2Z4\Z_2\Z_4-additive codes are given.

Keywords

Cite

@article{arxiv.0710.1149,
  title  = {Z2Z4-linear codes: generator matrices and duality},
  author = {J. Borges and C. Fernandez and J. Pujol and J. Rifa and M. Villanueva},
  journal= {arXiv preprint arXiv:0710.1149},
  year   = {2007}
}

Comments

This paper will be submitted to IEEE Trans. on Inform. Theory

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