最大距离可分离(MDS)矩阵的大小为m × m / Zq

Septa Windy Nitalessy, M. Mananohas, R. Tumilaar, Angelina Patricia Amanda, Tesalonika Angela Tumey
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摘要

最大距离可分离码(MDS)是纠错码的一种,其产生矩阵[I|A]由单位矩阵和最大距离可分离矩阵组成。在编码过程中,MDS矩阵可以最优地检测和纠正错误。一个矩阵在Zq上被称为MDS矩阵当且仅当它的平方子矩阵的所有行列式都是非零的。一个矩阵在Zq上被称为MDS矩阵当且仅当它的平方子矩阵的所有行列式都是非零的。在Zq上的m × m矩阵中,对子矩阵的可能元素和行列式的分析可以声明存在一个大小为m × m / Zq的MDS矩阵。结果是不存在大小为m x m且m大于或等于[(q-1)^2 + 1] - [q-2]的MDS矩阵。对于具有q '的Zq,不存在大小为m x m且m大于或等于[(q-1)^2 + 1] - [q-2] - [1/2 x (q-1)]的MDS矩阵。
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Maximum Distance Separable (MDS) Matrix of size m x m over Zq
The Maximum Distance Separable (MDS) code is one of the codes that known as error-correcting code where the generator matrix [I|A] is arranged by the identity matrix and the MDS matrix. In coding, MDS matrix can detect and correct errors optimally. A matrix over the Zq is called an MDS matrix if and only if all the determinants of its square submatrix are non-zero. A matrix over the Zq is called an MDS matrix if and only if all the determinants of its square submatrix are non-zero. In m x m matrix over Zq, the analyzed of possible entries and determinants of submatrix can be declare the existence of an MDS matrix of size m x m over Zq. The result is there will be no MDS matrix of size m x m where m greater than or equal to [(q-1)^2 + 1] - [q-2] for Zq with any of q. For Zq  with q prime, there will be no MDS matrix of size m x m where m greater than or equal to [(q-1)^2 + 1] - [q-2] - [1/2 x (q-1)].
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审稿时长
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