Effect of ensemble generalization on the highest-occupied Kohn-Sham eigenvalue

  • Eli Kraisler
    Weizmann Institute of Science 1 Department of Materials and Interfaces, , Rehovoth 76100, Israel
  • Tobias Schmidt
    University of Bayreuth 2 Theoretical Physics IV, , 95440 Bayreuth, Germany
  • Stephan Kümmel
    University of Bayreuth 2 Theoretical Physics IV, , 95440 Bayreuth, Germany
  • Leeor Kronik
    Weizmann Institute of Science 1 Department of Materials and Interfaces, , Rehovoth 76100, Israel

書誌事項

公開日
2015-09-10
DOI
  • 10.1063/1.4930119
公開者
AIP Publishing

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説明

<jats:p>There are several approximations to the exchange-correlation functional in density-functional theory, which accurately predict total energy-related properties of many-electron systems, such as binding energies, bond lengths, and crystal structures. Other approximations are designed to describe potential-related processes, such as charge transfer and photoemission. However, the development of a functional which can serve the two purposes simultaneously is a long-standing challenge. Trying to address it, we employ in the current work the ensemble generalization procedure proposed by Kraisler and Kronik [Phys. Rev. Lett. 110, 126403 (2013)]. Focusing on the prediction of the ionization potential via the highest occupied Kohn-Sham eigenvalue, we examine a variety of exchange-correlation approximations: the local spin-density approximation, semi-local generalized gradient approximations, and global and local hybrid functionals. Results for a test set of 26 diatomic molecules and single atoms are presented. We find that the aforementioned ensemble generalization systematically improves the prediction of the ionization potential, for various systems and exchange-correlation functionals, without compromising the accuracy of total energy-related properties. We specifically examine hybrid functionals. These depend on a parameter controlling the ratio of semi-local to non-local functional components. The ionization potential obtained with ensemble-generalized functionals is found to depend only weakly on the parameter value, contrary to common experience with non-generalized hybrids, thus eliminating one aspect of the so-called “parameter dilemma” of hybrid functionals.</jats:p>

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