Title:
Long-range corrected hybrid functionals for pi-conjugated systems: Dependence of the range-separation parameter on conjugation length
Long-range corrected hybrid functionals for pi-conjugated systems: Dependence of the range-separation parameter on conjugation length
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Author(s)
Koerzdoerfer, Thomas
Sears, John S.
Sutton, Christopher
Brédas, Jean-Luc
Sears, John S.
Sutton, Christopher
Brédas, Jean-Luc
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Abstract
Long-range corrected hybrids represent an increasingly popular class of functionals for density functional
theory (DFT) that have proven to be very successful for a wide range of chemical applications.
In this Communication, we examine the performance of these functionals for time-dependent
(TD)DFT descriptions of triplet excited states. Our results reveal that the triplet energies are particularly
sensitive to the range-separation parameter; this sensitivity can be traced back to triplet
instabilities in the ground state coming from the large effective amounts of Hartree-Fock exchange
included in these functionals. As such, the use of standard long-range corrected functionals for the
description of triplet states at the TDDFT level is not recommended.
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2011-11
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Article