Journal of Advances in Mathematics and Computer Science

We show that the matrix exponential Diophantine equation (Xⁿ - I_qxn)(Yⁿ - I_qxn) = Z²; admits at least 4 x n² different construction structures of matrix solutions. We also prove that the matrix exponential Diophantine equation (Xⁿ - I_nxm)(Y^m - I_nxm) = Z²; admits at least 4 x n x m different construction structures of matrix solutions in M_nxm(\(\mathbb{N}\)) for every pair (n,m) of positive integers such that n \(\neq\) m. We show the connection between the construction structures of matrix solutions of an exponential Diophantine equation and Integer factorization. We show that the matrix Diophantine equation Xⁿ +Y^m = Z^q , n, m, q \(\varepsilon\) \(\mathbb{N}\); admits at least 8 x n x m x q different construction structures of matrix solutions in M_nxmxq(\(\mathbb{N}\)).