@article{SaZi11,
author = {Mehwish Saleemi and Karl-Heinz Zimmermann},
title = {Groebner bases for linear codes over GF(4).},
journal = {International Journal of Pure and Applied Mathematics (IJPAM).},
year = {2011},
volume = {73.},
number = {(4),},
pages = {435-442},
month = {December},
note = {khzimmermann, AEG},
publisher = {AP:},
series = {20111201-saleemi-ijpam.pdf},
howpublished = {11-20 SaZi11 IJPAM},
abstract = {A linear code over a prime field can be described by a binomial ideal in a polynomial ring given as the sum of a toric ideal and a nonprime ideal. A Groebner basis for such an ideal can be read off from a systematic generator matrix of the corresponding code. In this paper, a similar result will be presented for linear codes over GF(4). To this end, the extented alphabet GF(4) is dealt with by enlarging the polynomial ring.}
}

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