Algebraic decoding of the ternary (37, 18, 11) quadratic residue code Online publication date: Wed, 29-Apr-2015
by J. Carmelo Interlando
International Journal of Information and Coding Theory (IJICOT), Vol. 2, No. 1, 2011
Abstract: The algebraic decoding of binary quadratic residue codes can be performed using the Peterson or the Berlekamp-Massey algorithm once certain unknown syndromes are determined. In this work, the technique of determining unknown syndromes is extended to the ternary case to decode the expurgated ternary quadratic residue code of length 37.
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