Variational method for the solution of Dirac-type equations

The problem of solving the single-particle Dirac equation variationally in the geometry of a diatomic molecule is studied using a minimax formulation of the problem. The lowest two states in Hz are considered, as well as the problem of the motion of an electron in the field of two nuclei with Z= 90.

A variational procedure without the need of using L\* basis set expansion or trial wave functions is introduced for efficient and accurate treatment of relativistic quantum-mechanical eigenvalue problems. The method, ba>ed on the extension of the Fouriergrid Hamiltonian technique, is free from the p

A two-dimensional, fully numerical approach to the four-component Dirac equation using the finite-element-method (FEM) is employed for a diatomic system. For H: , an absolute accuracy of about 1 O-lo au for the la, orbital energy is obtained by using only 2601 grid points. Using a difference method,