Solution of relativistic partial equations for scattering $d$-states

Partial Green's functions for d-states are defined in the relativistic configurational representation and expressed in terms of elementary functions. For the Green's functions obtained the asymptotics are found for large values of the coordinate, and their nonrelativistic limit is determined. Four quasipotential partial equations in the relativistic configuration representation for scattering states are solved exactly in cases of “delta-sphere potential” and “superposition of two delta-sphere potentials”. The partial amplitudes and the scattering cross sections are determined.