暂无分享,去创建一个
[1] Chong-Dao Lee,et al. Algebraic decoding of (103, 52, 19) and (113, 57, 15) quadratic residue codes , 2005, IEEE Transactions on Communications.
[2] Chong-Dao Lee,et al. Algebraic decoding of (71, 36, 11), (79, 40, 15), and (97, 49, 15) quadratic residue codes , 2003, IEEE Trans. Commun..
[3] Gui Liang Feng,et al. A new procedure for decoding cyclic and BCH codes up to actual minimum distance , 1994, IEEE Trans. Inf. Theory.
[4] Jean-Charles Faugère,et al. On the decoding of binary cyclic codes with the Newton identities , 2009, J. Symb. Comput..
[5] Emmanuela Orsini,et al. General Error Locator Polynomials for Binary Cyclic Codes With $t \le 2$ and $n < 63$ , 2007, IEEE Transactions on Information Theory.
[6] M. Sala,et al. Correcting errors and erasures via the syndrome variety , 2005 .
[7] Chong-Dao Lee,et al. Algebraic Decoding of the $(89, 45, 17)$ Quadratic Residue Code , 2008, IEEE Transactions on Information Theory.
[8] Xuemin Chen,et al. Decoding the (47, 24, 11) quadratic residue code , 2001, IEEE Trans. Inf. Theory.
[9] Chong-Dao Lee,et al. Algebraic Decoding of a Class of Binary Cyclic Codes Via Lagrange Interpolation Formula , 2010, IEEE Transactions on Information Theory.