ENCUTGW: Difference between revisions

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{{TAGDEF|ENCUTGW|[real] energy cutoff for response function| 2/3 {{TAG|ENCUT}}}}
{{TAGDEF|ENCUTGW|[real]| 2/3 {{TAG|ENCUT}}}}




Description: The parameter {{TAG|ENCUTGW}} controls the basis set for the response functions
Description: The tag {{TAG|ENCUTGW}} sets the energy cutoff for the response function. It controls the basis set for the response functions
in exactly the same manner as {{TAG|ENCUT}} does for the orbitals.
in exactly the same manner as {{TAG|ENCUT}} does for the orbitals.


Line 9: Line 9:


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In GW and RPA calculations,  storing and manipulating the response function dominates the computational work load:
In GW and random-phase-approximation (RPA) calculations,  storing and manipulating the response function dominates the computational work load:


<math>\chi_{{\mathbf{q}}}^0 ({\mathbf{G}}, {\mathbf{G}}', \omega)=\frac{1}{\Omega} \sum_{n,n',{\mathbf{k}}}2 w_{{\mathbf{k}}}
<math>\chi_{{\mathbf{q}}}^0 ({\mathbf{G}}, {\mathbf{G}}', \omega)=\frac{1}{\Omega} \sum_{n,n',{\mathbf{k}}}2 w_{{\mathbf{k}}}
Line 20: Line 20:
the response function <math>\chi_{{\mathbf{q}}}^0 ({\mathbf{G}}, {\mathbf{G}}', \omega)</math>.
the response function <math>\chi_{{\mathbf{q}}}^0 ({\mathbf{G}}, {\mathbf{G}}', \omega)</math>.


Our experience suggests that choosing {{TAG|ENCUTGW}}= 2/3 {{TAG|ENCUT}} yields
Our experience suggests that choosing {{TAG|ENCUTGW}}= 2/3 {{TAG|ENCUT}} yields reasonable results at fairly modest computational cost, although, the response function contains contributions up to twice the plane wave cutoff <math>G_{\rm cut}</math>, see {{TAG|ALGO}} tag. Furthermore, RPA correlation energies are reported using an internal extrapolation of the correlation energy by varying the value of {{TAG|ENCUTGW}} inside VASP between the largest value given in the {{TAG|INCAR}} file and smaller values {{cite|harl:prb:08}}. Mind: The extrapolated value is only reliable, if {{TAG|ENCUTGW}} is smaller then {{TAG|ENCUT}}. The cutoff extrapolation with respect to {{TAG|ENCUTGW}} would be precise if the plane wave basis for the orbitals were infinite. Again, the VASP defaults yield very reasonable values for the extrapolated correlation energy. In fact, it is unwise to increase {{TAG|ENCUTGW}} only, without increasing {{TAG|ENCUT}}. To converge RPA correlation energies, simply increase {{TAG|ENCUT}} and the number of orbitals, and use the VASP default for {{TAG|ENCUTGW}}.
reasonable results at fairly modest computational cost, although, the response function
{{NB|mind|More details on how the infinite basis set limit is extrapolated in RPA/ACFDT can be found [[ACFDT/RPA_calculations#Basis_set_convergence|here]].}}
contains contributions up to twice the plane wave cutoff <math>G_{\rm cut}</math>
For quasiparticle (QP) bandgaps, it is sometimes possible to set {{TAG|ENCUTGW}} to values between 150 to 200 eV, and even 100 eV can yield
(see Sec. {{TAG|ALGO-WRAP}}).
gaps that are accurate to within a few tens of an eV for main group elements. Be aware, however, that the absolute values of the QP energies depend inverse proportionally on the number of plane waves. Thus, the convergence of absolute QP energies is very slow, although QP gaps might seem converged.
Furthermore, RPA correlation energies are reported using an internal extrapolation of the correlation
energy by varying {{TAG|ENCUTGW}} internally (inside VASP) between the largest value given in the INCAR
file and smaller values <ref name="harl:08"/>. The extrapolated value is only reliable, if
{{TAG|ENCUTGW}} is smaller then {{TAG|ENCUT}} (the cutoff extrapolation with respect to {{TAG|ENCUTGW}}  
would be very precise, if the plane wave basis for the orbitals were infinite).
Again the VASP defaults yield very reasonable values for the extrapolated correlation
energy. In fact, it is unwise to increase {{TAG|ENCUTGW}} only, without increasing {{TAG|ENCUT}} .
To converge RPA correlation energies, simply increase {{TAG|ENCUT}} and the number
of orbitals, and use the VASP default for {{TAG|ENCUTGW}}.


For QP gaps, it is sometimes possible to set {{TAG|ENCUTGW}}
The recommended procedure to obtain accurate QP energies is discussed in the reference below. Specifically, for reference type calculations we recommend the following procedure:
to values between 150 to 200 eV, and even 100 eV can yield
gaps that are accurate to within a few tens of an eV for main group elements.
Be aware, however, that the absolute values of the QP energies
depend inverse proportionally on the number of plane waves. Thus
convergence of absolute QP energies is always very slow, although QP gaps
might seem converged.


The recommended procedure to obtain accurate QP energies is discussed in the reference below.
* Use the default for {{TAG|ENCUTGW}}, or even decrease {{TAG|ENCUTGW}} to half the value of {{TAG|ENCUT}}.
Specifically,  for reference type calculations we recommend the following procedure:
* Calculate all orbitals that the plane-wave basis set allows to calculate. This number can be determined by searching for "maximum number of plane-waves" in the ground-state DFT {{TAG|OUTCAR}} file, and setting {{TAG|NBANDS}} to this value.
 
* Increase {{TAG|ENCUT}} systematically and plot the QP energies versus the number of plane-wave coefficients, which equals the number of orbitals. This means {{TAG|ENCUTGW}} and {{TAG|NBANDS}} increase as {{TAG|ENCUT}} increases.
* use the default for ENCUTGW, or even decrease ENCUTGW to half the value of ENCUT.
* Calculate all orbitals that the plane wave basis set allows to calculate.
* Increase ENCUT systematically and plot the QP energies versus the number of plane wave coefficients (which equals the number of orbitals). This means ENCUTGW increases as ENCUT increases.
 
This procedure can be carried out using few k-points. Other commonly applied methods can yield less accurate results and are not considered
to be reliable.


This procedure can be carried out using few k points. Other commonly applied methods can yield less accurate results and are not considered to be reliable.


== FFT grid and {{TAG|PRECFOCK}} ==
== FFT grid and {{TAG|PRECFOCK}} ==
The flag {{TAG|PRECFOCK}} determines the FFT grid in all GW (and Hartree-Fock) related routines.
The {{TAG|PRECFOCK}} tag determines the fast Fourier transformation (FFT) grid in all GW (and Hartree-Fock) related routines. For small systems, the computational time is often dominated by FFT operations. Therefore, the {{TAG|PRECFOCK}} tag can have a significant impact on the compute time for QP calculations. For large systems, the FFT's usually do not dominate the computational workload, and savings are expected to be small for {{TAG|PRECFOCK}} = ''fast''.  
For small systems (which are often dominated by FFT operations),  
QP shifts are usually not very sensitive to the setting of {{TAG|PRECFOCK}} and therefore there is no harm in setting {{TAG|PRECFOCK}} = ''fast''), whereas for RPA calculations we recommend to set {{TAG|PRECFOCK}} = ''normal'' to avoid numerical errors.
the flag can have a significant impact on the compute time for  
QP calculations. For large systems, the FFT's usually do not
dominating the computational work load and savings are expected to be small for {{TAG|PRECFOCK}} = ''fast''.  
QP shifts are usually not very sensitive to the setting of {{TAG|PRECFOCK}}
(and it therefore does not harm to set  {{TAG|PRECFOCK}} = ''fast''), whereas for
RPA calculations we recommend to set {{TAG|PRECFOCK}} = ''normal'' to avoid numerical errors.


== Related Tags and Sections ==
== Related tags and articles ==
{{TAG|PRECFOCK}},
{{TAG|PRECFOCK}},
{{TAG|ENCUT}},
{{TAG|ENCUT}},
{{TAG|ENCUTGWSOFT}},
{{TAG|ENCUTGWSOFT}},
{{TAG|GW calculations}},
{{TAG|GW calculations}},
{{TAG|ACFDT/RPA calculations}}
[[ACFDT/RPA_calculations#Basis_set_convergence|Basis set convergence]]


{{sc|ENCUTGW|Examples|Examples that use this tag}}
{{sc|ENCUTGW|Examples|Examples that use this tag}}


== Further reading ==
== Further reading ==
*A comprehensive study of the performance of the convergence of GW calculations can be found <ref name="klimes:prb:14"/>. Generally QP energies converge like one over the number of orbitals and one over the number of plane waves in the response function. For basis set converged calculations we recommend to use the strategies in Ref. <ref name="klimes:prb:14"/>
*Generally, QP energies converge like one over the number of orbitals and one over the number of plane waves in the response function. For basis set converged calculations, we recommend using the strategies outlined in Ref. {{cite|klimes:prb:14}}, which contains a comprehensive study of the performance of the convergence of GW calculations.


== References ==
== References ==
<references>
<ref name="harl:08"> [https://doi.org/10.1103/PhysRevB.77.045136
J. Harl, and G. Kresse, "Cohesive energy curves for noble gas solids calculated by adiabatic connection fluctuation-dissipation theory.", Phys. Rev. B 77.4 045136 (2008).]</ref>
<ref name="klimes:prb:14"> [http://dx.doi.org/10.1103/PhysRevB.90.075125 J. Klimes, M. Kaltak, and G. Kresse, Phys. Rev. B 90, 075125 (2014)]</ref>


</references>


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[[The_VASP_Manual|Contents]]


[[Category:INCAR]][[Category:GW]]
[[Category:INCAR tag]][[Category:Many-body perturbation theory]][[Category:GW]]

Latest revision as of 14:07, 24 April 2023

ENCUTGW = [real]
Default: ENCUTGW = 2/3 ENCUT 


Description: The tag ENCUTGW sets the energy cutoff for the response function. It controls the basis set for the response functions in exactly the same manner as ENCUT does for the orbitals.



In GW and random-phase-approximation (RPA) calculations, storing and manipulating the response function dominates the computational work load:

ENCUTGW controls how many vectors are included in the the response function .

Our experience suggests that choosing ENCUTGW= 2/3 ENCUT yields reasonable results at fairly modest computational cost, although, the response function contains contributions up to twice the plane wave cutoff , see ALGO tag. Furthermore, RPA correlation energies are reported using an internal extrapolation of the correlation energy by varying the value of ENCUTGW inside VASP between the largest value given in the INCAR file and smaller values [1]. Mind: The extrapolated value is only reliable, if ENCUTGW is smaller then ENCUT. The cutoff extrapolation with respect to ENCUTGW would be precise if the plane wave basis for the orbitals were infinite. Again, the VASP defaults yield very reasonable values for the extrapolated correlation energy. In fact, it is unwise to increase ENCUTGW only, without increasing ENCUT. To converge RPA correlation energies, simply increase ENCUT and the number of orbitals, and use the VASP default for ENCUTGW.

Mind: More details on how the infinite basis set limit is extrapolated in RPA/ACFDT can be found here.

For quasiparticle (QP) bandgaps, it is sometimes possible to set ENCUTGW to values between 150 to 200 eV, and even 100 eV can yield gaps that are accurate to within a few tens of an eV for main group elements. Be aware, however, that the absolute values of the QP energies depend inverse proportionally on the number of plane waves. Thus, the convergence of absolute QP energies is very slow, although QP gaps might seem converged.

The recommended procedure to obtain accurate QP energies is discussed in the reference below. Specifically, for reference type calculations we recommend the following procedure:

  • Use the default for ENCUTGW, or even decrease ENCUTGW to half the value of ENCUT.
  • Calculate all orbitals that the plane-wave basis set allows to calculate. This number can be determined by searching for "maximum number of plane-waves" in the ground-state DFT OUTCAR file, and setting NBANDS to this value.
  • Increase ENCUT systematically and plot the QP energies versus the number of plane-wave coefficients, which equals the number of orbitals. This means ENCUTGW and NBANDS increase as ENCUT increases.

This procedure can be carried out using few k points. Other commonly applied methods can yield less accurate results and are not considered to be reliable.

FFT grid and PRECFOCK

The PRECFOCK tag determines the fast Fourier transformation (FFT) grid in all GW (and Hartree-Fock) related routines. For small systems, the computational time is often dominated by FFT operations. Therefore, the PRECFOCK tag can have a significant impact on the compute time for QP calculations. For large systems, the FFT's usually do not dominate the computational workload, and savings are expected to be small for PRECFOCK = fast. QP shifts are usually not very sensitive to the setting of PRECFOCK and therefore there is no harm in setting PRECFOCK = fast), whereas for RPA calculations we recommend to set PRECFOCK = normal to avoid numerical errors.

Related tags and articles

PRECFOCK, ENCUT, ENCUTGWSOFT, GW calculations, Basis set convergence

Examples that use this tag

Further reading

  • Generally, QP energies converge like one over the number of orbitals and one over the number of plane waves in the response function. For basis set converged calculations, we recommend using the strategies outlined in Ref. [2], which contains a comprehensive study of the performance of the convergence of GW calculations.

References