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MM: Fachverband Metall- und Materialphysik
MM 26: Poster Session
MM 26.9: Poster
Dienstag, 23. März 2010, 14:45–16:30, Poster C
Stable and unique solutions for the OEP equation in the LCAO formalism — •julio juan fernandez1, Christian Kollmar2, and Michael Filatov1 — 1Institute for Advanced Materials, Groningen 9747 AG The Netherlands — 2Institut fur Physicalische und Theoretische Chemie, Bonn D53115 Germany
The treatment of orbital dependent functionals in Density Functional Theory (DFT) requires the use of the Optimized Effective Potential (OEP) technique for obtaining the local multiplicative potential. Using the exchange only (xOEP) functional this formalism leads to an equation that, in real space, possesses a unique and well defined solution for atoms and molecules. In a basis set (LCAO) scheme the method leads to a non unique solution of the equation due to the singularity of the matrix representation of the linear response operator. In this work we demonstrate that a good solution to this problem is to use an incomplete Cholesky decomposition of the linear response matrix. With the use of this technique numerically stable and unique solutions of the xOEP equations in the LCAO representation are obtained provided that the orbital basis set satisfies the condition of linear dependence of the products of occupied and virtual Kohn_sham orbitals. It is demonstrated that the obtained LCAO-xOEP solutions are independent on the criterion used to discriminate linearly dependent from linearly independent (ia) products.
The LCAO-xOEP solutions for atoms and molecules are obtained with the use of standard basis sets. The LCAO-xOEP energies are in excellent agreement with the numeric real space xOEP energies.