2023
DOI: 10.1021/acs.jpca.3c00072
|View full text |Cite
|
Sign up to set email alerts
|

F12+EOM Quartic Force Fields for Rovibrational Predictions of Electronically Excited States

Abstract: Quartic force fields (QFFs) constructed using a sum of ground-state CCSD(T)-F12b energies with EOM-CCSD excitation energies are proposed for computation of spectroscopic properties of electronically excited states. This is dubbed the F12+EOM approach and is shown to provide similar accuracy to previous methodologies at lower computational cost. Using explicitly correlated F12 approaches instead of canonical CCSD(T), as in the corresponding (T)+EOM approach, allows for 70-fold improvement in computational time.… Show more

Help me understand this report

Search citation statements

Order By: Relevance

Paper Sections

Select...
4
1

Citation Types

0
7
0

Year Published

2023
2023
2024
2024

Publication Types

Select...
5

Relationship

2
3

Authors

Journals

citations
Cited by 5 publications
(7 citation statements)
references
References 76 publications
(155 reference statements)
0
7
0
Order By: Relevance
“…DFT + F12 QFFs are utilized in this work to efficiently compute the anharmonic vibrational frequencies and rotational constants for both ground state and electronically excited states of a test set of molecules chosen for their available reference data utilized in previous work. , The F12 portion for ground electronic states is built upon the F12-TcCR approach based on CCSD­(T)-F12b at a triple-ζ basis level (“T”) along with the corresponding core correlation cc-pCVTZ-F12 basis set (“cC”). ,, For further accuracy improvements, the Douglas–Kroll formalism within canonical CCSD­(T) is implemented as a composite term within the single-point energy to account for scalar relativistic effects (“ R ”). Again, the F12-TcCR + EOM approach is a composite method that relies upon CCSD­(T)-F12b energies for the reference, ground-state energies, and EOM-CCSD for the excitation energies.…”
Section: Methodsmentioning
confidence: 99%
See 2 more Smart Citations
“…DFT + F12 QFFs are utilized in this work to efficiently compute the anharmonic vibrational frequencies and rotational constants for both ground state and electronically excited states of a test set of molecules chosen for their available reference data utilized in previous work. , The F12 portion for ground electronic states is built upon the F12-TcCR approach based on CCSD­(T)-F12b at a triple-ζ basis level (“T”) along with the corresponding core correlation cc-pCVTZ-F12 basis set (“cC”). ,, For further accuracy improvements, the Douglas–Kroll formalism within canonical CCSD­(T) is implemented as a composite term within the single-point energy to account for scalar relativistic effects (“ R ”). Again, the F12-TcCR + EOM approach is a composite method that relies upon CCSD­(T)-F12b energies for the reference, ground-state energies, and EOM-CCSD for the excitation energies.…”
Section: Methodsmentioning
confidence: 99%
“…Several composite methods have been proposed in our group of late to address this issue. These most often utilize EOM-CCSD for the excited-state computation but are conjoined to some CCSD­(T) definition of the ground electronic state. While full EOM-CCSDT methods with considerations for complete basis set (CBS) extrapolations (“C”) and core electron correlation (“cC”) provide accurate descriptions in the so-called EOM-CCSDT-CcC approach, they are prohibitively time-consuming for all but the smallest molecules.…”
Section: Introductionmentioning
confidence: 99%
See 1 more Smart Citation
“…Some have been based on EOM-CCSD with corrections for triples in EOM-CC3 corrections. , More recently, highly accurate, CCSD­(T) ground state energies corrected with EOM-CCSD excitation energies treated in various ways have produced mixed success for computing QFFs . Inclusion of explicit correlation from the F12 formalism , in the ground state term provides the same level of confidence in the fundamental vibrational frequency predictions but for less computational time. , The use of the ionization potential version of EOM in EOMIP-CCSDT is rigorously the best choice among those tested thus far for computing QFFs, but the scaling of the method and size of the basis sets make these computations impossibly time-consuming save for the smallest molecules or the most efficient supercomputers . Hence, new wave function-based, excited state methods need to be identified in order for application to QFFs if means beyond vibronic variational computations are to be identified.…”
Section: Introductionmentioning
confidence: 99%
“…EOM-CCSD­(T)­(a)* is then able to transform EOM-CCSD­(T)­(a) into an method through its unique treatment of the triples, which spans both the ground and excited state correlation energies . Hence, this method will certainly be less costly than EOM-CCSDT and will be utilized here in its electronically excited (EE) format: EOMEE-CCSD­(T)­(a)*. As such, its performance for use as a means of computing rovibrational spectra of electronically excited states (effectively rovibronic spectral data) for the simple QFF VPT2 approach will be tested in this work building off of a related, previous study .…”
Section: Introductionmentioning
confidence: 99%