Exact discrete nonstanionary radiation conditions for spherical system of coordinates in absence of azimuthal symmetry

Exact discrete partial nonstationary conditions are derived for Maxwell's equations in the absence of azimuthal symmetry. Form of the conditions is sensitive to the type of finitedifference scheme being in usage for solving Maxwel's system. These conditions can be used in the case of inhomogeneous and anisotropic medium in outer domain and are effective in applications. The theorem of converging the numerical solution to the analitical one is proved.