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)].
Author Biographies
Septa Windy Nitalessy, Sam Ratulangi University
Department of Mathematics and Natural Sains
Mans Lumiu Mananohas, Universitas Sam Ratulangi
Department of Mathematics and Natural Sains
Rinancy Tumilaar, Universitas Sam Ratulangi
Department of Mathematics and Natural Sains
Angelina Patricia Amanda, Universitas Sam Ratulangi
Department of Mathematics and Natural Sains
Tesalonika Angela Tumey, Universitas Sam Ratulangi
