Title :
A Result on Zetterberg Codes
Author :
Jing, Ming-Haw ; Chang, Yaotsu ; Lee, Chong-Dao ; Chen, Jian-Hong ; Chen, Zih-Heng
Author_Institution :
Dept. of Inf. Eng., I-Shou Univ., Kaohsiung, Taiwan
fDate :
7/1/2010 12:00:00 AM
Abstract :
The family of Zetterberg codes with parameters (2u+1, 2u+1-2u) for even u is one of the best known double error correcting codes because of their large code rate and high decoding speed. In this letter, we prove that when u is odd, Zetterberg codes can correct all errors of weight at most two with only 2u+1 exceptions. Moreover, by multiplying (x-1) to the generator polynomials of Zetterberg codes with u odd, the cyclic codes generated are two-error correctable. A decoding algorithm is developed for the new family of Zetterberg codes.
Keywords :
error correction codes; polynomials; Zetterberg codes; decoding algorithm; error correcting codes; generator polynomials; Algorithm design and analysis; Councils; Data communication; Decoding; Error correction; Error correction codes; Galois fields; Generators; Mathematical model; Mathematics; Polynomials; Protection; Cyclic codes; Zetterberg codes; error correcting coding;
Journal_Title :
Communications Letters, IEEE
DOI :
10.1109/LCOMM.2010.07.100784
