Atomic exchange energy as a density functional

Density functional theory can be generalized to mixtures of ground and excited states, for the purpose of determining energies of excitations using low-cost density functional approximations. Adapting approximations originally developed for ground states to work in the new setting would fast-forward progress enormously. But, previous attempts have stumbled on daunting fundamental issues. Here we show that these issues can be prevented from the outset, by using a fluctuation dissipation theorem (FDT) to dictate key functionals. We thereby show that existing exchange energy approximations are readily adapted to excited states, when combined with a rigorous exact Hartree term that is different in form from its ground state counterpart, and counterparts based on ensemble ansatze. Applying the FDT to correlation energies also provides insights into ground state-like and ensemble-only correlations. We thus provide a comprehensive and versatile framework for ensemble density functional approximations.<br><br>

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Ensemblization of density-functional theory: Insight from the fluctuation-dissipation theorem

10.26434/chemrxiv.12456146.v3 ◽

2020 ◽

Cited By ~ 1

Author(s):

Tim Gould ◽

Gianluca Stefanucci ◽

Stefano Pittalis

Keyword(s):

Density Functional Theory ◽

Excited States ◽

Ground State ◽

Density Functional ◽

Low Cost ◽

Ground States ◽

Exchange Energy ◽

Functional Theory ◽

Fluctuation Dissipation ◽

Fluctuation Dissipation Theorem

Density functional theory can be generalized to mixtures of ground and excited states, for the purpose of determining energies of excitations using low-cost density functional approximations. Adapting approximations originally developed for ground states to work in the new setting would fast-forward progress enormously. But, previous attempts have stumbled on daunting fundamental issues. Here we show that these issues can be prevented from the outset, by using a fluctuation dissipation theorem (FDT) to dictate key functionals. We thereby show that existing exchange energy approximations are readily adapted to excited states, when combined with a rigorous exact Hartree term that is different in form from its ground state counterpart, and counterparts based on ensemble ansatze. Applying the FDT to correlation energies also provides insights into ground state-like and ensemble-only correlations. We thus provide a comprehensive and versatile framework for ensemble density functional approximations.

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Exact-exchange energy density in the gauge of a semilocal density-functional approximation

Physical Review A ◽

10.1103/physreva.77.012509 ◽

2008 ◽

Vol 77 (1) ◽

Cited By ~ 75

Author(s):

Jianmin Tao ◽

Viktor N. Staroverov ◽

Gustavo E. Scuseria ◽

John P. Perdew

Keyword(s):

Energy Density ◽

Density Functional ◽

Exchange Energy ◽

Functional Approximation ◽

Exact Exchange

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Subsystem functionals in density-functional theory: Investigating the exchange energy per particle

Physical Review B ◽

10.1103/physrevb.66.165117 ◽

2002 ◽

Vol 66 (16) ◽

Cited By ~ 47

Author(s):

R. Armiento ◽

A. E. Mattsson

Keyword(s):

Density Functional Theory ◽

Density Functional ◽

Exchange Energy ◽

Functional Theory

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Accurate and simple density functional for the electronic exchange energy: Generalized gradient approximation

Physical Review B ◽

10.1103/physrevb.33.8800 ◽

1986 ◽

Vol 33 (12) ◽

pp. 8800-8802 ◽

Cited By ~ 2947

Author(s):

John P. Perdew ◽

Wang Yue

Keyword(s):

Density Functional ◽

Exchange Energy ◽

Generalized Gradient ◽

Generalized Gradient Approximation

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Density functional theory calculation of the Renner–Teller effect in NCO : Preliminary assessment of exact exchange energy on the accuracy of the Renner coefficient

International Journal of Quantum Chemistry ◽

10.1002/qua.26804 ◽

2021 ◽

Author(s):

David O. Kashinski ◽

Tyler J. Radziewicz ◽

Matthew G. Suarez ◽

Constantine C. Stephens ◽

Edward F. C. Byrd

Keyword(s):

Density Functional Theory ◽

Density Functional ◽

Density Functional Theory Calculation ◽

Exchange Energy ◽

Teller Effect ◽

Preliminary Assessment ◽

Functional Theory ◽

Exact Exchange ◽

Theory Calculation

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On the shape of spherically averaged Fermi-hole correlation functions in density functional theory. 1. Atomic systems

Canadian Journal of Chemistry ◽

10.1139/v89-073 ◽

1989 ◽

Vol 67 (3) ◽

pp. 460-472 ◽

Cited By ~ 31

Author(s):

Vincenzo Tschinke ◽

Tom Ziegler

Keyword(s):

Density Functional Theory ◽

Correlation Function ◽

Energy Density ◽

Density Functional ◽

Exchange Energy ◽

Energy Density Functional ◽

Functional Theory ◽

Atomic Systems ◽

Hartree Fock ◽

Fermi Hole

We have compared, for atomic systems, the spherically averaged Fermi-hole correlation function [Formula: see text] in the Hartree–Fock theory with the corresponding function [Formula: see text] employed in local density functional theory. It is shown that, in contrast to [Formula: see text], the function [Formula: see text] behaves qualitatively incorrectly at positions r1 of the reference electron far from the nucleus. Furthermore, we have shown that the qualitatively incorrect behaviour of [Formula: see text] can be remedied by an approximate expansion of [Formula: see text] in powers of s, where s is the inter-electronic distance. However, such an expansion must be conducted in two regions due to the discontinuity of [Formula: see text] as a function of s at the atomic nucleus. Based on the two-region expansion of [Formula: see text] we have developed an alternative approximate density functional expansion [Formula: see text] for the spherically averaged Fermi-hole correlation function. The corresponding exchange energy density functional yields values for the exchange energies of atoms in good agreement with Hartree–Fock results. Keywords: atomic exchange energy, density functional theory, Fermi hole.

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