On the solutions of the quaternion interval systems [x]=[A][x]+[b][x]=[A][x]+[b]

It is known that linear matrix equations have been one of the main topics in matrix theory and its applications. The primary work in the investigation of a matrix equation (system) is to give solvability conditions and general solutions to the equation(s). In the present paper, for the quaternion interval system of the equations defined by [x]=[A][x]+[b][x]=[A][x]+[b], where [A][A] is a quaternion interval matrix and [b][b] and [x][x] are quaternion interval vectors, we derive a necessary and sufficient criterion for the existence of solutions [x][x]. Thus, we reduce the existence of a solution of this system in quaternion interval arithmetic to the existence of a solution of a system in real interval arithmetic.