Polyatomic molecular Dirac-Hartree-Fock calculations with Gaussian basis sets
Abstract
Numerical methods have been used successfully in atomic Dirac-Hartree-Fock (DHF) calculations for many years. Some DHF calculations using numerical methods have been done on diatomic molecules, but while these serve a useful purpose for calibration, the computational effort in extending this approach to polyatomic molecules is prohibitive. An alternative more in line with traditional quantum chemistry is to use an analytical basis set expansion of the wave function. This approach fell into disrepute in the early 1980's due to problems with variational collapse and intruder states, but has recently been put on firm theoretical foundations. In particular, the problems of variational collapse are well understood, and prescriptions for avoiding the most serious failures have been developed. Consequently, it is now possible to develop reliable molecular programs using basis set methods. This paper describes such a program and reports results of test calculations to demonstrate the convergence and stability of the method.
- Publication:
-
Unknown
- Pub Date:
- 1990
- Bibcode:
- 1990pmdh.book.....D
- Keywords:
-
- Applications Programs (Computers);
- Computational Chemistry;
- Dirac Equation;
- Gauss Equation;
- Hartree Approximation;
- Polyatomic Molecules;
- Quantum Chemistry;
- Relativistic Effects;
- Wave Functions;
- Atomic and Molecular Physics