GW hBN Yambo Virtual 2021 version
This is a modified version of the tutorial prepared for the Yambo 2021 virtual school. In case you are interested you can find the extended version of the tutorial here: How to obtain the quasi-particle band structure of a bulk material: h-BN
In this tutorial you will learn how to:
- Calculate quasi-particle corrections in the Hartree-Fock approximation
- Calculate quasi-particle corrections in the GW approximation
- Choose the input parameters for a meaningful converged calculation
- Plot a band structure including quasi-particle corrections
We will use bulk hBN as an example system. Before starting, you need to obtain the appropriate tarball. See instructions on the main tutorials page.
We strongly recommend that you first complete the First steps: a walk through from DFT to optical properties tutorial.
The aim of the present tutorial is to obtain quasiparticle correction to energy levels using many-body perturbation theory (MBPT).
The general non-linear quasiparticle equation reads:
As a first step we want to evaluate the self energy Σ entering in the quasiparticle equation. In the GW approach the self-energy can be separated into two components: a static term called the exchange self-energy (Σx), and a dynamical term (energy dependent) called the correlation self-energy (Σc):
We will treat these two terms separately and demonstrate how to set the most important variables for calculating each term. In practice we will compute the quasi-particle corrections to the one particle Kohn-Sham eigenvalues obtained through a DFT calculation.
The steps are the following:
Step 1: The Exchange Self Energy or HF quasi-particle correction
We start by evaluating the exchange Self-Energy and the corresponding Quasiparticle energies (Hartree-Fock energies). Follow the module on Hartree Fock and then return to this tutorial How to obtain the quasiparticle band structure of a bulk material: h-BN.
One can also skip this step and go directly to the input file generation for GW (browse below), which already includes the calculation of the exchange self-energy (simply, this is not discussed in detail as done in the Hartree Fock module).
Step 2: The Correlation Self-Energy and Quasiparticle Energies
Once we have calculated the exchange part, we next turn our attention to the more demanding dynamical part. The correlation part of the self-energy in a plane wave representation reads:
In the expression for the correlation self energy, we have (1) a summation over bands, (2) an integral over the Brillouin Zone, and (3) a sum over the G vectors. In contrast with the case of Σx, the summation over bands extends over all bands (including the unoccupied ones), and so convergence tests are needed. Another important difference is that the Coulomb interaction is now screened so a fundamental ingredient is the evaluation of the dynamical dielectric matrix. The expression for the dielectric matrix, calculated at the RPA level and including local field effects, has been already treated in the Local fields tutorial.
In the following, we will take into account the dynamical effects by setting proper parameters to obtain a model dielectric function based on a widely used approximation, which models the energy dependence of each component of the dielectric matrix with a single pole function.
It is also possible to perform calculations by evaluating the dielectric matrix on a regular grid of frequencies: for this, you may have a look at the Real Axis and Lifetimes tutorial.
Once the correlation part of the self-energy is calculated, we will check the convergence of the different parameters with respect to some final quantity, such as the gap.
After computing the frequency dependent self-energy, we will discover that in order to solve the quasiparticle equation we will need to know its value at the value of the quasiparticle itself. In the following, unless explicitly stated, we will solve the non-linear quasi-particle equation at first order, by expanding the self-energy around the Kohn-Sham eigenvalue. In this way the quasiparticle equation reads:
where the normalization factor Z is defined as:
The Plasmon Pole approximation
As stated above, the basic idea of the plasmon-pole approximation is to approximate the frequency dependence of the dielectric matrix with a single pole function of the form:
The two parameters RGG' and ΩGG' are obtained by a fit (for each component), after having calculated the RPA dielectric matrix at two given frequencies. Yambo calculates the dielectric matrix in the static limit ( ω=0) and at a user defined frequency called the plasmon-pole frequency (ω=iωp). Such an approximation has the big computational advantage of calculating the dielectric matrix for only two frequencies and leads to an analytical expression for the frequency integral of the correlation self-energy.
Input file generation
Let's start by building up the input file for a GW/PPA calculation, including the calculation of the exchange self-energy. From yambo -h
you should understand that the correct option is yambo -x -p p -g n
:
$ cd YAMBO_TUTORIALS/hBN/YAMBO $ yambo -x -p p -g n -F gw_ppa.in
Here the input file is redirected by the -F
option to gw_ppa.in
(the default name is yambo.in
).
Depending on the version of yambo
, you may need to open the file for editing.
Let's modify the input file in the following way:
HF_and_locXC # [R XX] Hartree-Fock Self-energy and Vxc ppa # [R Xp] Plasmon Pole Approximation gw0 # [R GW] GoWo Quasiparticle energy levels em1d # [R Xd] Dynamical Inverse Dielectric Matrix EXXRLvcs = 40 Ry # [XX] Exchange RL components VXCRLvcs = 3187 RL # [XC] XCpotential RL components Chimod= "Hartree" # [X] IP/Hartree/ALDA/LRC/BSfxc % BndsRnXp 1 | 10 | # [Xp] Polarization function bands % NGsBlkXp= 1000 mRy # [Xp] Response block size % LongDrXp 1.000000 | 1.000000 | 1.000000 | # [Xp] [cc] Electric Field % PPAPntXp = 27.21138 eV # [Xp] PPA imaginary energy %GbndRnge 1 | 40 | # [GW] G[W] bands range % GDamping= 0.10000 eV # [GW] G[W] damping dScStep= 0.10000 eV # [GW] Energy step to evaluate Z factors DysSolver= "n" # [GW] Dyson Equation solver ("n","s","g") %QPkrange # [GW] QP generalized Kpoint/Band indices 7| 7| 8| 9| %
Brief explanation of some settings:
- Similar to the Hartree Fock study, we will focus on the convergence of the direct gap of the system. Hence we select the last occupied (8) and first unoccupied (9) bands for k-point number 7 in the
QPkrange
variable. - We also keep
EXXRLvcs
at its converged value of 40 Ry as obtained in the Hartree Fock tutorial. - For the moment we keep fixed the plasmon pole energy
PPAPntXp
at its default value (=1 Hartree). - We keep fixed the direction of the electric field for the evaluation of the dielectric matrix to a non-specific value:
LongDrXp
=(1,1,1). - Later we will study convergence with respect to
GbndRnge
,NGsBlkXp
, andBndsRnXp
; for now just set them to the values indicated.
Understanding the output
Let's look at the typical Yambo output. Run Yambo with an appropriate -J
flag:
$ yambo -F gw_ppa.in -J 10b_1Ry
In the standard output you can recognise the different steps of the calculations: calculation of the screening matrix (evaluation of the non interacting and interacting response), calculation of the exchange self-energy, and finally the calculation of the correlation self-energy and quasiparticle energies. Moreover information on memory usage and execution time are reported:
... <---> [05] Dynamic Dielectric Matrix (PPA) ... <08s> Xo@q[3] |########################################| [100%] 03s(E) 03s(X) <08s> X@q[3] |########################################| [100%] --(E) --(X) ... <43s> [06] Bare local and non-local Exchange-Correlation <43s> EXS |########################################| [100%] --(E) --(X) ... <43s> [07] Dyson equation: Newton solver <43s> [07.01] G0W0 (W PPA) ... <45s> G0W0 (W PPA) |########################################| [100%] --(E) --(X) ... <45s> [07.02] QP properties and I/O <45s> [08] Game Over & Game summary
Let's have a look at the report and output. The output file o-10b_1Ry.qp contains (for each band and k-point that we indicated in the input file) the values of the bare KS eigenvalue, its GW correction and the correlation part of the self energy:
# # K-point Band Eo [eV] E-Eo [eV] Sc|Eo [eV] # 7 8 -0.411876 -0.521152 2.375027 7 9 3.877976 2.351568 -2.284813
In the header you can see the details of the calculations, for instance it reports that NGsBlkXp
=1 Ry corresponds to 5 Gvectors:
# X G`s [used]: 5
Other information can be found in the report file r-10b_1Ry_em1d_ppa_HF_and_locXC_gw0, such as the renormalization factor defined above, the value of the exchange self-energy (non-local XC) and of the DFT exchange-correlation potential (local XC):
[07.02] QP properties and I/O ============================= Legend (energies in eV) - B : Band - Eo : bare energy - E : QP energy - Z : Renormalization factor - So : Sc(Eo) - S : Sc(E) - dSp: Sc derivative precision - lXC: Local XC (Slater exchange(X)+Perdew & Zunger(C)) -nlXC: non-Local XC (Hartree-Fock) QP [eV] @ K [7] (iku): 0.000000 -0.500000 0.000000 B=8 Eo= -0.41 E= -0.93 E-Eo= -0.52 Re(Z)=0.81 Im(Z)=-0.248518E-2 nlXC= -19.1293 lXC= -16.1072 So= 2.37503 B=9 Eo= 3.88 E= 6.23 E-Eo= 2.35 Re(Z)=0.83 Im(Z)=-0.215043E-2 nlXC= -5.53648 lXC= -10.6698 So= -2.28481
Extended information can be also found in the output activating in the input the ExtendOut
flag. This is an optional flag that can be activated by adding the -V qp
verbosity option when building the input file. The plasmon pole screening, exchange self-energy and the quasiparticle energies are also saved in databases so that they can be reused in further runs:
$ ls ./10b_1Ry ndb.pp ndb.pp_fragment_1 ... ndb.HF_and_locXC ndb.QP
Convergence tests for a quasi particle calculation
Now we can check the convergence of the different variables entering in the expression of the correlation part of the self energy.
First, we focus on the parameter governing the screening matrix you have already seen in the RPA/IP section. In contrast to the calculation of the RPA/IP dielectric function, where you considered either the optical limit or a finite q response (EELS), here the dielectric matrix will be calculated for all q-points determined by the choice of k-points sampling.
The parameters that need to be converged can be understood by looking at expression of the dielectric matrix:
where χGG' is given by
and χ0GG' is given by
NGsBlkXp
: The dimension of the microscopic inverse matrix, related to Local fieldsBndsRnXp
: The sum on bands (c,v) in the independent particle χ0GG'
Converging Screening Parameters
Here we will check the convergence of the gap starting from the variables controlling the screening reported above: the bands employed to build the RPA response function BndsRnXp
and the number of blocks (G,G') of the dielectric matrix ε-1G,G' NGsBlkXp
.
In the next section we will study convergence with respect to the sum over states summation (sum over m in the Σc expression); here let's fix GbndRnge
to a reasonable value (40 Ry).
Let's build a series of input files differing by the values of bands and block sizes in χ0GG' considering BndsRnXp
in the range 10-50 (upper limit) and NGsBlkXp
in the range 1 to 5 Ry. To do this by hand, file by file, open the gw_ppa.in file in an editor and change to:
NGsBlkXp = 2 Ry
while leaving the rest untouched. Repeat for 3 Ry, 4 Ry etc. Next, for each NGsBlkXp
change to:
% BndsRnXp 1 | 20 | # [Xp] Polarization function bands %
and repeat for 30, 40 and so on. Give a different name to each file: gw_ppa_Xb_YRy.in with X=10,20,30,40 and Y=1,2,3,4,5 Ry.
This is obviously quite tedious. However, you can automate both the input construction and code execution using bash or python scripts (if interested you can see and learn how to use python scripts using the yambo-python [1]tool for this task). For now, you can use the simple generate_inputs_1.sh bash script to generate the required input files (after copying the script you need to type $ chmod +x name_of_the_script.sh
).
Finally launch the calculations:
$ yambo -F gw_ppa_10b_1Ry.in -J 10b_1Ry $ yambo -F gw_ppa_10b_2Ry.in -J 10b_2Ry ... $ yambo -F gw_ppa_40b_5Ry.in -J 40b_5Ry
Once the jobs are terminated we can collect the quasiparticle energies for fixed BndsRnXp
in different files named e.g. 10b.dat, 20b.dat etc. for plotting, by putting in separate columns: the energy cutoff; the size of the G blocks; the quasiparticle energy of the valence band; and that of the conduction band.
To do this e.g. for the 10b.dat file you can type:
$ cat o-10b* | grep "^ *7 *8" | awk '{print $3+$4}'
to parse the valence band quasiparticle energies and
$ cat o-10b* | grep "^ *7 *9" | awk '{print $3+$4}'
for the conduction band; and put all the data in the 10b.dat files. As there are many files to process you can use the parse_qps.sh script to create the 10b.dat file and edit the script changing the number of BndsRnXp
for the other output files.
Once we have collected all the quasiparticle values we can plot the gap, or the valence and conduction band energies separately, as a function of the block size or energy cutoff:
$ gnuplot gnuplot> p "10b.dat" u 2:3 w lp t "Valence BndsRnXp=10", "20b.dat" u 2:3 w lp t "Valence BndsRnXp=20",.. <place here all other datasets> gnuplot> p "10b.dat" u 2:4 w lp t "Conduction BndsRnXp=10", "20b.dat" u 2:4 w lp t "Conduction BndsRnXp=20",.. gnuplot> p "10b.dat" u 2:($4-$3) w lp t " Gap BndsRnXp=10", "20b.dat" u 2:($4-$3) w lp t "gap BndsRnXp=20",..
or both using e.g. the ppa_gap.gnu gnuplot script:
Looking at the plot we can see that:
- The two parameters are not totally independent (see e.g. the valence quasiparticle convergence) and this is the reason why we converged them simultaneously
- The gap (energy difference) converge faster than single quasiparticle state
- The convergence criteria depends on the degree of accuracy we look for, but considering the approximations behind the calculations (plasmon-pole etc.), it is not always a good idea to enforce too strict a criteria.
- Even if not totally converged we can consider that the upper limit of
BndsRnXp
=30, andNGsBlkXp
=3Ry are reasonable parameters.
Converging the sum over states in the correlation self-energy
From now on we will keep fixed these parameters and will perform a convergence study on the sum over state summation in the correlation self-energy (Σc) GbndRnge
.
In order to use the screening previously calculated we can copy the plasmon pole parameters saved in the 30b_3Ry
directory in the SAVE
directory. In this way the screening will be read by Yambo and not calculated again:
$ cp ./30b_3Ry/ndb.pp* ./SAVE/.
(Note: you may have to delete these files before running the BSE tutorials)
In order to use the databases we have to be sure to have the same plasmon-pole parameters in our input files.
Edit gw_ppa_30b_3Ry.in
and modify GbndRnge
to order to have a number of bands in the range from 10 to 80 inside different files named gw_ppa_Gbnd10.in
, gw_ppa_Gbnd20.in
, etc. You can also run the the generate_inputs_2.sh bash script to generate the required input files.
Next, launch yambo for each input:
$ yambo -F gw_ppa_Gbnd10.in -J Gbnd10 $ yambo -F gw_ppa_Gbnd20.in -J Gbnd20 ...
and as done before we can inspect the obtained quasiparticle energies:
$ grep "^ *7 *8" o-Gbnd* | awk '{print $4+$5}'
for the valence bands, and
$ grep "^ *7 *9" o-Gbnd* | awk '{print $4+$5}'
for the conduction band.
Collect the results in a text file Gbnd_conv.dat
containing: the number of Gbnd
, the valence energy, and the conduction energy.
Now, as done before we can plot the valence and conduction quasiparticle levels separately as well as the gap, as a function of the number of bands used in the summation:
$ gnuplot gnuplot> p "Gbnd_conv.dat" u 1:2 w lp lt 7 t "Valence" gnuplot> p "Gbnd_conv.dat" u 1:3 w lp lt 7 t "Conduction" gnuplot> p "Gbnd_conv.dat" u 1:($3-$2) w lp lt 7 t "Gap"
Inspecting the plot we can see that:
- The convergence with respect to
GbndRange
is rather slow and many bands are needed to get converged results. - As observed above the gap (energy difference) converges faster than the single quasiparticle state energies.
Step 3: Interpolating Band Structures
Up to now we have checked convergence for the gap. Now we want to calculate the quasiparticle corrections across the Brillouin zone in order to visualize the entire band structure along a path connecting high symmetry points.
To do that we start by calculating the QP correction in the plasmon-pole approximation for all the k points of our sampling and for a number of bands around the gap. You can use a previous input file or generate a new one: yambo -F gw_ppa_all_Bz.in -x -p p -g n
and set the parameters found in the previous tests:
EXXRLvcs= 40 Ry % BndsRnXp 1 | 30 | # [Xp] Polarization function bands % NGsBlkXp= 3 Ry # [Xp] Response block size % LongDrXp 1.000000 | 1.000000 | 1.000000 | # [Xp] [cc] Electric Field % PPAPntXp= 27.21138 eV # [Xp] PPA imaginary energy % GbndRnge 1 | 40 | # [GW] G[W] bands range %
and we calculate it for all the available kpoints by setting:
%QPkrange # [GW] QP generalized Kpoint/Band indices 1| 14| 6|11| %
Note that as we have already calculated the screening with these parameters you can save time and use that database either by running in the previous directory by using -J 30b_3Ry
or if you prefer to put the new databases in the new all_Bz directory you can create a new directory and copy there the screening databases:
$ mkdir all_Bz $ cp ./30b_3Ry/ndb.pp* ./all_Bz/
and launch the calculation:
$ yambo -F gw_ppa_all_Bz.in -J all_Bz
Now we can inspect the output and see that it contains the correction for all the k points for the bands we asked:
# K-point Band Eo E-Eo Sc|Eo # 1.000000 6.000000 -1.299712 -0.219100 3.788044 1.000000 7.000000 -1.296430 -0.241496 3.788092 1.000000 8.000000 -1.296420 -0.243115 3.785947 1.000000 9.000000 4.832399 0.952386 -3.679259 1.00000 10.00000 10.76416 2.09915 -4.38743 1.00000 11.00000 11.36167 2.48053 -3.91021
.... By plotting some of the 'o-all_Bz.qp" columns it is possible to discuss some physical properties of the hBN QPs. Using columns 3 and (3+4), ie plotting the GW energies with respect to the LDA energies we can deduce the band gap renormalization and the stretching of the conduction/valence bands:
$ gnuplot gnuplot> p "o-all_Bz.qp" u 3:($3+$4) w p t "Eqp vs Elda"
Essentially we can see that the effect of the GW self-energy is the opening of the gap and a linear stretching of the conduction/valence bands that can be estimated by performing a linear fit of the positive and negative energies (the zero is set at top of the valence band).
In order to calculate the band structure, however, we need to interpolate the values we have calculated above on a given path. In Yambo the interpolation is done by the executable ypp
(Yambo Post Processing).
By typing:
$ ypp -h
you will recognize that in order to interpolate the bands we need to build a ypp input file using
$ ypp -s b
we can generate the input for the band interpolation:
$ypp -s b -F ypp_bands.in
and edit the ypp_bands.in file:
electrons # [R] Electrons (and holes) bnds # [R] Bands INTERP_mode= "none" # Interpolation mode (NN=nearest point, BOLTZ=boltztrap aproach) OutputAlat= 4.716000 # [a.u.] Lattice constant used for "alat" ouput format cooIn= "rlu" # Points coordinates (in) cc/rlu/iku/alat cooOut= "rlu" % BANDS_bands 1 | 100 | # Number of bands % % INTERP_Grid -1 |-1 |-1 | # Interpolation BZ Grid % INTERP_Shell_Fac= 20.00000 # The bigger it is a higher number of shells is used CIRCUIT_E_DB_path= "none" # SAVE obtained from the QE `bands` run (alternative to %BANDS_kpts) BANDS_path= "" # BANDS path points labels (G,M,K,L...) BANDS_steps= 10 #BANDS_built_in # Print the bands of the generating points of the circuit using the nearest internal point %BANDS_kpts %
We modify the following lines:
INTERP_mode= "BOLTZ" # Interpolation mode (NN=nearest point, BOLTZ=boltztrap aproach) BANDS_steps=30 % BANDS_bands 6 | 11 | # Number of bands % %BANDS_kpts # K points of the bands circuit 0.33300 |-.66667 |0.00000 | 0.00000 |0.00000 |0.00000 | 0.50000 |-.50000 |0.00000 | 0.33300 |-.66667 |0.00000 | 0.33300 |-.66667 |0.50000 | 0.00000 |0.00000 |0.50000 | 0.50000 |-.50000 |0.50000 | %
which means we use the best interpolation method for band structures, we assign 30 points in each segment, we ask to interpolate 3 occupied and 3 empty bands and we assign the following path passing from the high symmetry points: K Γ M K H A L. Launching:
$ ypp -F ypp_bands.in
will produce the output file o.bands_interpolated containing:
# # |k| b6 b7 b8 b9 b10 b11 kx ky kz # # 0.00000 -7.22092 -0.13402 -0.13395 4.67691 4.67694 10.08905 0.33300 -0.66667 0.00000 0.03725 -7.18857 -0.17190 -0.12684 4.66126 4.71050 10.12529 0.32190 -0.64445 0.00000
...
and we can plot the bands using gnuplot:
$ gnuplot gnuplot> p "o.bands_interpolated" u 0:2 w l, "o.bands_interpolated" u 0:3 w l, ...
and you can recognize the index of the high symmetry point by inspecting the last three columns.
Note that up to now we have interpolated the LDA band structure. In order to plot the GW band structure, we need to tell ypp
in the input file where the ndb.QP database is found. This is achieved by adding in the ypp_bands.in file the line:
GfnQPdb= "E < ./all_Bz/ndb.QP"
and relaunch
$ ypp -F ypp_bands.in
Now the file o.bands_interpolated_01 contains the GW interpolated band structure. We can plot the LDA and GW band structure together by using the gnuplot script bands.gnu.
LDA and GW bands structure from Ref. [1]
- As expected the effect of the GW correction is to open the gap.
- Comparing the obtained band structure with the one found in the literature by Arnaud and coworkers [1] we found a very nice qualitative agreement.
- Quantitatively we found a smaller gap: about 5.2 eV (indirect gap), 5.7 eV (direct gap) while in Ref.[1] is found 5.95 eV for the indirect gap and a minimum direct band gap of 6.47 eV. Other values are also reported in the literature depending on the used pseudopotentials, starting functional and type of self-consistency (see below).
- The present tutorial has been done with a small k point grid which is an important parameter to be checked, so convergence with respect the k point sampling has to be validated.
Step 4: Summary of the convergence parameters
We have calculated the band structure of hBN starting from a DFT calculation, here we summarize the main variable we have checked to achieve convergence:
EXXRLvcs
# [XX] Exchange RL components
Number of G-vectors in the exchange. This number should be checked carefully. Generally a large number is needed as the QP energies show a slow convergence. The calcualtion of the exchange part is rather fast.
BndsRnXp
#[Xp] Polarization function bands
Number of bands in the independent response function form which the dielectric matrix is calculated. Also this paramater has to be checked carefully,together with NGsBlkXp as the two variables are interconnected
NGsBlkXp
# [Xp] Response block size
Number of G-vectors block in the dielectric constant. Also this paramater has to be checked carefully, to be checked together with BndsRnXp. A large number of bands and block can make the calculation very demanding.
LongDrXp
# [Xp] [cc] Electric Field
Direction of the electric field for the calculation of the q=0 component of the dielectric constant e(q,w). In a bulk can be set to (1,1,1), attention must be paid for non 3D systems.
PPAPntXp
# [Xp] Plasmon pole imaginary energy: this is the second frequency used to fit the Godby-Needs plasmon-pole model (PPM). If results depend consistently by changing this frequency, the PPM is not adequate for your calculation and it is need to gp beyond that, e.g. Real-axis.
GbndRnge
# [GW] G[W] bands range
Number of bands used to expand the Green's function. This number is usually larger than the number of bands used to calculated the dielectricconstant. Single quasiparticle energies converge slowly with respect GbndRnge, energy difference behave better. You can use terminator technique to mitigate the slow dependence.
GDamping
# [GW] G[W] damping
Small damping in the Green's function definition, the delta parameter. The final result shouuld not depend on that, usually set at 0.1 eV
dScStep
# [GW]
Energy step to evaluate Z factors
DysSolver
# [GW] Dyson Equation solver ("n","s","g")
Parameters related to the solution of the Dyson equation, "n" Newton linearization, 's' non linear secant method
GTermKind
[GW] GW terminator
Terminator for the self-energy[2] . We have seen how this spped up the convergence with respect empty bands.
QPkrange
# [GW] QP generalized Kpoint/Band indices
K-points and band range where you want to calculate the GW correction. The syntax is first kpoint | last kpoint | first band | last band
Step 5: Eigenvalue only self-consistent evGW0 and evGW
For self-consistent GW please follow this tutorial: Self-consistent GW on eigenvalues only
Here we want to see how we can compute an eigenvalue only evGW0 or evGW correction in Yambo. In the new version of Yambo there are two flags for these kind of self-consistency:
GWoIter
number of GW0 iterations
GWIter
number of GW iterations
you can set one of them to 10 for example, the code will stop when convergence is reached, usually in less than 5 iterations. For example if you consider the input file below:
HF_and_locXC # [R XX] Hartree-Fock Self-energy and Vxc ppa # [R Xp] Plasmon Pole Approximation gw0 # [R GW] GoWo Quasiparticle energy levels em1d # [R Xd] Dynamical Inverse Dielectric Matrix EXXRLvcs = 40.000 mRy # [XX] Exchange RL components VXCRLvcs = 3187 RL # [XC] XCpotential RL components Chimod= "Hartree" # [X] IP/Hartree/ALDA/LRC/BSfxc % BndsRnXp 1 | 10 | # [Xp] Polarization function bands % NGsBlkXp= 1000 mRy # [Xp] Response block size % LongDrXp 1.000000 | 1.000000 | 1.000000 | # [Xp] [cc] Electric Field % PPAPntXp = 27.21138 eV # [Xp] PPA imaginary energy %GbndRnge 1 | 40 | # [GW] G[W] bands range % GDamping= 0.10000 eV # [GW] G[W] damping dScStep= 0.10000 eV # [GW] Energy step to evaluate Z factors DysSolver= "n" # [GW] Dyson Equation solver ("n","s","g") GWoIter=0 # [GW] GWo self-consistent (evGWo) iterations on eigenvalues GWIter =0 # [GW] GW self-consistent (evGW) iterations on eigenvalues %QPkrange # [GW] QP generalized Kpoint/Band indices 1| 14| 7| 10| %
if you set both GWIter and GWoIter to zero you get a gap correction of 4.15 eV. If you perform self-consistency on G (GWoIter/=) the gap will be 4.713 eV and finally if you perform self-consistency in both G and W (GWIter /=0) the gap will be 5.506 eV.
Notice that these values are absolutely not converged because we used very few bands and a small block size.
It's important to note that the final result of the self-consistent GW may depend from the number of bands you decide to correct, because they are used to reconstruct G and W. For the non-corrected bands Yambo applied a rigid shift of their energy based on the closed corrected band.
Step 6: A better integration of the q=0 point
The integration of the q=0 of the Coulomb potential is problematic because the 1/q diverges. Usually in Yambo this integration is performed analytically in a small sphere around q=0.
however in this way the code lost part of the integral out of the circle. This usually is not problematic because for a large number of q and k point the missing term goes to zero. However in system that requires few k-points or even only the gamma one, it is possible to perform a better integration of this term by adding the flag -r to generate the input
HF_and_locXC # [R XX] Hartree-Fock Self-energy and Vxc ppa # [R Xp] Plasmon Pole Approximation gw0 # [R GW] GoWo Quasiparticle energy levels rim_cut # [R] Coulomb potential em1d # [R Xd] Dynamical Inverse Dielectric Matrix RandQpts= 3000000 # [RIM] Number of random q-points in the BZ RandGvec= 1 RL # [RIM] Coulomb interaction RS components #QpgFull # [F RIM] Coulomb interaction: Full matrix EXXRLvcs = 40.000 mRy # [XX] Exchange RL components VXCRLvcs = 3187 RL # [XC] XCpotential RL components Chimod= "Hartree" # [X] IP/Hartree/ALDA/LRC/BSfxc % BndsRnXp 1 | 10 | # [Xp] Polarization function bands % NGsBlkXp= 1000 mRy # [Xp] Response block size % LongDrXp 1.000000 | 1.000000 | 1.000000 | # [Xp] [cc] Electric Field % PPAPntXp = 27.21138 eV # [Xp] PPA imaginary energy %GbndRnge 1 | 40 | # [GW] G[W] bands range % GDamping= 0.10000 eV # [GW] G[W] damping dScStep= 0.10000 eV # [GW] Energy step to evaluate Z factors DysSolver= "n" # [GW] Dyson Equation solver ("n","s","g") %QPkrange # [GW] QP generalized Kpoint/Band indices 7| 7| 8| 9| %
in this input RandGvec
is the component of the Coulomb potential we want integrate numerically,
in this case only the first one G=G'=0, and RandQpts
is the number of random points
used to perform the integral by Monte Carlo.
If you turn one this integration you will get a slightly different band gap, but in the limit of large k points the final results will be the same of the standard method.
However this correction is important for systems that converge with few k-points or with gamma only.
Step 7: Taking into account the material anisotropy (only available in Yambo 4.6)
Hexagonal Boron Nitride is an anisotropic material so there is the question in which direction
one shold calculate the dielectric constant the enters in the GW.
If you run again this tutorial changing the direction of the q=0 point in GW calculation,
the variable LongDrXp
, you will realize that the there gap correction changes.
In Yambo there is a way to take into account this anisitropy of the dielectri tensor.
First of all you need to calculate the dielectric constant in the three cartesian directions with the command yambo -o c -k hartree
optics # [R] Linear Response optical properties kernel # [R] Kernel chi # [R][CHI] Dyson equation for Chi. dipoles # [R] Oscillator strenghts (or dipoles) Chimod= "HARTREE" # [X] IP/Hartree/ALDA/LRC/PF/BSfxc NGsBlkXd= 3000 mRy # [Xd] Response block size % QpntsRXd 1 | 1 | # [Xd] Transferred momenta % % BndsRnXd 1 | 100 | # [Xd] Polarization function bands % % EnRngeXd 0.00000 | 10.00000 | eV # [Xd] Energy range % % DmRngeXd 0.10000 | 0.10000 | eV # [Xd] Damping range % ETStpsXd= 1 # [Xd] Total Energy steps % LongDrXd 1.000000 | 0.000000 | 0.000000 | # [Xd] [cc] Electric Field %
From the result in the output file o.eps_q1_inv_rpa_dyson
you can calculate the zero component of inverse dielectric matrix, in this case 1.0/5.044076 = 0.198252.
Repeat this calculation with the field in the other two directions y and z. The y-direction is equal to x, while in z direction the zero component of the inverse dielectric matrix is 1.0/2.872451 = 0.348134.
Now generate a new input file for the GW, with the command yambo -g n -p p -r -V RL
HF_and_locXC # [R XX] Hartree-Fock Self-energy and Vxc ppa # [R Xp] Plasmon Pole Approximation gw0 # [R GW] GoWo Quasiparticle energy levels rim_cut # [R] Coulomb potential em1d # [R Xd] Dynamical Inverse Dielectric Matrix RandQpts=3000000 # [RIM] Number of random q-points in the BZ RandGvec= 1 RL # [RIM] Coulomb interaction RS components #QpgFull # [F RIM] Coulomb interaction: Full matrix % Em1Anys 0.198252 | 0.198252 | 0.348134 | # [RIM] X Y Z Static Inverse dielectric matrix % IDEm1Ref= 1 EXXRLvcs = 40.000 mRy # [XX] Exchange RL components VXCRLvcs = 3187 RL # [XC] XCpotential RL components Chimod= "Hartree" # [X] IP/Hartree/ALDA/LRC/BSfxc % BndsRnXp 1 | 10 | # [Xp] Polarization function bands % NGsBlkXp= 1000 mRy # [Xp] Response block size % LongDrXp 1.000000 | 0.000000 | 0.000000 | # [Xp] [cc] Electric Field % PPAPntXp = 27.21138 eV # [Xp] PPA imaginary energy %GbndRnge 1 | 40 | # [GW] G[W] bands range % GDamping= 0.10000 eV # [GW] G[W] damping dScStep= 0.10000 eV # [GW] Energy step to evaluate Z factors DysSolver= "n" # [GW] Dyson Equation solver ("n","s","g") %QPkrange # [GW] QP generalized Kpoint/Band indices 7| 7| 8| 9| %
run the calculations anbed you will find a correction of the gap intermediate between the one with the field in x and z directions.
Step 8: Exercise: Convergence with respect K points
As an exercise now you can check the convergence with respect the K point sampling:
- perform a new non-scf calculation with a bigger k point grid: 9x9x3 and 12x12x4 ...
- convert wave functions and electronic structure to Yambo databases in a different directory as explained in the DFT and p2y module,
- Initialize the Yambo databases,
- Redo the steps explained in this section (exchange self energy, plasmon pole GW, band structure interpolation)
- The PPA-GW calculation using 12x12x4 grid depending on your machine can take several minutes in serial mode. You can think to perform the exercise after having learned some basic on the parallelization strategy.
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