The relativistic calculations of the multi-electron atoms and molecules are so comlicated for me to understand well.
Only the Dirac equation of the hydrogen-like atoms can be precisely solved. (Also in the Schroedinger equation.)
But this solution contains "many accidental coincidences". (See
this thread)
There seems to be several methods using the approximations of the relativistic forms such as the Dirac-Hartree-Fock and the relativistic density-functional calculations.)
But these calculations are more difficult than non-relativistic, so a commonly used approach is to do an all-electron atomic Dirac-Fock calculation on each type of atom in the molecule and use the result to derive a relativistic effective core potential(RECP) for that atom.(Since the smallest parts of the relativistic effects are neglected in deriving RECPs.)
The valence electrons are treated nonrelativistically, and the core electrons are represented by adding the operator \Sigma U_{\alpha} to the Fock operator F, where U_{\alpha} is the relativistic ECP for atom \alpha. Sorry, I don't know more about these complicated things.
In the hydrogen atom, the energy levels of 2S1/2 and 2P1/2 states are
comletely the same due to the solution of the Dirac equation. And the very small energy difference is the Lamb shift which can be gotten only by QED.
But the Dirac equation of the hydrogen atom contains the Coulomb potential which is known well as the
nonrelativistic term. So, before considering the QED, if this small energy difference exists, is it inconsistent?
