# ABINIT, lesson PAW1 :

## Projector augmented-wave technique : how to use it ?

This lesson aims at showing how to perform a calculation in the frame of the PAW method.

You will learn how to launch a PAW calculation and what are the main input variables that govern convergency and numerical efficiency.
It is supposed that you already know how to use ABINIT in the norm-conserving pseudopotential case.

This lesson should take about 1.5 hour.

### Contents of lesson PAW1 :

• 0. Summary of the PAW method
• 1. Using PAW with ABINIT
• 2. The convergence on plane-wave cut-off (ecut)
• 3. The convergence on double FFT grid cut-off (pawecutdg
• 4. Plotting PAW contributions to the DOS
• 5. Testing the completeness of the PAW partial wave basis
• 6. Checking the validity of PAW results
• 7. Additional comments about PAW in ABINIT

### 0. Summary of the PAW method

The PAW (Projector Augmented-Wave) method has been introduced by Peter Blöchl in 1994. As he says, "The projector augmented-wave method is an extension of augmented wave methods and the pseudopotential approach, which combines their traditions into a unified electronic structure method".
It is based on a linear and invertible transformation (the PAW transformation) that connects the "true" wavefunctions Ψn with "auxiliary" (or "pseudo") soft wavefunctions~Ψn :

|Ψn>  =~n>+  Σ (φ-~φi) <~p |~Ψn >

This relation is based on the definition of atomic spheres (augmentation regions) of radius  rc, around the atoms of the system in which the partial waves  | φi> form a basis of atomic wavefunctions; |~φi> are "pseudized" partial waves (obtained from | φi>), and ~pi are dual functions of the |~φi> called projectors.
It is therefore possible to write every quantity depending on Ψn (density, energy, Hamiltonian) as a function of~Ψn and to find~Ψn by solving self-consistent equations.

The PAW method has two main advantages:
- From~Ψn, it is always possible to obtain the true "all electron" wavefunction Ψn.
- The convergency is comparable to an ultrasoft pseudopotential one.

From a practical point of view (user's point of view), a PAW calculation is rather similar to a norm-conserving pseudopotential one. Most noticeably, one will have to use a special atomic data file (PAW dataset) that contains the  φi,~φi and ~pi and that plays the same role as a pseudopotential file.

It is highly recommended to read the following papers to understand correctly the basic concepts of the PAW method:

 "Projector augmented-wave method", P.E. Blochl, Physical Review B 50, 17953 (1994)
 "From ultrasoft pseudopotentials to the projector augmented-wave method", G. Kresse and D. Joubert, Physical Review B 59, 1758 (1999)

The implementation of the PAW method in ABINIT is detailed in the following paper, describing specific notations and formulations:

 "Implementation of the projector augmented-wave method in the ABINIT code: Application to the study of iron under pressure", M. Torrent, F. Jollet, F. Bottin, G. Zerah, and X. Gonze, Computational Materials Science 42, 337 (2008)

### 1.  Using PAW with ABINIT

Before continuing, you might consider to work in a different subdirectory as for the other lessons. Why not "Work_paw1" ? In what follows, the name of files are mentioned as if you were in this subdirectory.
All the input files can be found in the
~abinit/tests/tutorial/Input directory.

You can compare your results with reference output files located in ~abinit/tests/tutorial/Refs and ~abinit/tests/tutorial/Refs/tpaw1_addons directories (for the present tutorial they are named tpaw1_*.out).

The input file tpaw1_1.in is an example of a file that contains data for computing the total energy for diamond at the experimental volume (within the LDA exchange-correlation functional). You might use the file tpaw1_1.files (with a standard norm-conserving pseudopotential) as a "files" file, and get the corresponding output file (it is available as ../Refs/tpaw1_1.out).
Copy the files tpaw1_1.in and tpaw1_1.files in your work directory, and run ABINIT:

```abinit < tpaw1_1.files > tmp-log
```
In the meantime, you can read the input file and see that there is no PAW input variable.
ABINIT should run very quickly...

Now, open the tpaw1_1.files and modify the last line; replace the 6c.pspnc file by 6c.lda.atompaw.

Run ABINIT again:

`abinit < tpaw1_1.files > tmp-log`

Your run should stop before end !  The input file is missing a mandatory argument: pawecutdg !!

Add the line "pawecutdg 50." in the  tpaw1_1.in file and run ABINIT again.
Now ABINIT runs to the end.

Note that the time needed for the PAW run is greater than the time needed for the norm-conserving pseudopotential run; indeed, at constant value of plane wave cut-off energy ecut, PAW requires more computational resources:    - the "on-site" contributions have to be computed,
- the nonlocal contribution of the PAW dataset uses 2 projectors per angular momentum, while the nonlocal contribution of the present norm-conserving pseudopotential  uses only one.

However, as the plane wave cut-off energy required by PAW is much smaller than the cut-off needed for the norm-conserving pseudopotential (see next section), a PAW calculation will actually require less CPU time.

Let's open the output file and have a look inside (be careful, it is the last output file of the tpaw1_1 series).
Compared to an output file for a norm-conserving pseudopotential run, an output file for PAW contains the following specific topics:

At the beginning of the file:

- Some specific default PAW input variables (ngfftdg, pawecutdg, and useylm) are mentionned in the section:

-outvars: echo values of preprocessed input variables --------

- The use of two FFT grids, mentioned as:

Coarse grid specifications (used for wave-functions):

getcut: wavevector=  0.0000  0.0000  0.0000  ngfft=  18  18  18
ecut(hartree)=     15.000   => boxcut(ratio)=   2.17276

Fine grid specifications (used for densities):

getcut: wavevector=  0.0000  0.0000  0.0000  ngfft=  32  32  32
ecut(hartree)=     50.000   => boxcut(ratio)=   2.10918

- A specific description of the PAW dataset (you might follow the tutorial PAW2, devoted to the building of the PAW atomic data, for a complete understanding of the file):

Pseudopotential format is: paw4
basis_size (lnmax)=  4 (lmn_size=  8), orbitals=   0   0   1   1
Spheres core radius: rc_sph= 1.50000000
4 radial meshes are used:
- mesh 1: r(i)=AA*[exp(BB*(i-1))-1], size= 505 , AA= 0.21824E-02 BB= 0.13095E-01
- mesh 2: r(i)=AA*[exp(BB*(i-1))-1], size= 500 , AA= 0.21824E-02 BB= 0.13095E-01
- mesh 3: r(i)=AA*[exp(BB*(i-1))-1], size= 530 , AA= 0.21824E-02 BB= 0.13095E-01
- mesh 4: r(i)=AA*[exp(BB*(i-1))-1], size= 644 , AA= 0.21824E-02 BB= 0.13095E-01
Shapefunction is SIN type: shapef(r)=[sin(pi*r/rshp)/(pi*r/rshp)]**2
Radius for shape functions = sphere core radius
Radial grid used for partial waves is grid 1
Radial grid used for projectors is grid 2
Radial grid used for (t)core density is grid 3
Radial grid used for Vloc is grid 4
Radial grid used for pseudo valence density is grid 4

After the SCF cycle section:

- The value of the integrated compensation charge evaluated by two different numerical methodologies (remember: PAW atomic dataset are not norm-conserving pseudopotentials); it is given calculated in the augmentation regions (PAW spheres) on the "spherical" grid and also in the whole simulation cell on the "FFT" grid. A discussion on these two values will be done in a forthcoming section.
PAW TEST:
==== Compensation charge inside spheres ============
The following values must be close to each other ...
Compensation charge over spherical meshes =      0.413178580356274
Compensation charge over fine fft grid    =      0.413177280314290

-   Information concerning the non-local term (pseudopotential strength Dij ) and the spherical density matrix (augmentation wave occupancies Rhoij)

==== Results concerning PAW augmentation regions ====

Total pseudopotential strength Dij (hartree):
Atom #  1
...
Atom #  2
...

Augmentation waves occupancies Rhoij:
Atom #  1
...
Atom #  2
...

At the end of the file:

- The decomposition of the total energy both by direct calculation and double counting calculation:
--------------------------------------------------------------------------------
Components of total free energy (in Hartree) :

Kinetic energy  =  6.40164318808980E+00
Hartree energy  =  9.63456708252837E-01
XC energy       = -3.53223656186138E+00
Ewald energy    = -1.27864121210521E+01
PspCore energy  =  5.41017918797015E-01
Loc. psp. energy= -5.27003595856857E+00
Spherical terms =  2.15689044331394E+00
>>>>> Internal E= -1.15256763830284E+01

"Double-counting" decomposition of free energy:
Band energy     =  6.87331579398577E-01
Ewald energy    = -1.27864121210521E+01
PspCore energy  =  5.41017918797015E-01
Dble-C XC-energy=  1.22161340385476E-01
Spherical terms = -8.97688814082645E-02
>>>>> Internal E= -1.15256701638793E+01

>Total energy in eV           = -3.13629604304723E+02
>Total DC energy in eV        = -3.13629435073068E+02

Note that the total energy calculated in PAW is not the same as the one obtained in the norm-conserving pseudopotential case. This is normal: in the norm-conserving potential case, the energy reference has been arbitrarily modified by the pseudopotential construction procedure. Comparing total energies computed with different PAW potentials is more meaningful : most of the parts of the energy are calculated exactly, and in general you should be able to compare numbers for (valence) energies between different PAW potentials or different codes.

### 2.  The convergence on plane-wave cut-off (ecut)

As in the usual case, the critical convergence parameter is the cut-off defining the size of the plane-wave basis...

1.a Computing the convergence in ecut for diamond in the norm-conserving case

The input file tpaw1_2.in contains data for computing the convergence in ecut for diamond (at experimental volume). There are 9 datasets, for which ecut increases from 8 Ha to 24 Ha by step of 2 Ha.
You might use the tpaw1_2.files file (with a standard norm-conserving pseudopotential), and run ABINIT:
```abinit < tpaw1_2.files > tmp-log
```
You should obtain the values (output file tpaw1_2.out) :

etotal1  -1.1628880677E+01
etotal2  -1.1828052470E+01
etotal3  -1.1921833945E+01
etotal4  -1.1976374633E+01
etotal5  -1.2017601960E+01
etotal6  -1.2046855404E+01
etotal7  -1.2062173253E+01
etotal8  -1.2069642342E+01
etotal9  -1.2073328672E+01

You can check that the etotal convergence (at the 1 mHartree level) is not achieved for ecut=24 Hartree.

1.b Computing the convergence in ecut for diamond in the PAW case

Use the same input files as in section 1.a.
Again, modify the last line of tpaw1_2.files, replacing the 6c.pspnc file by 6c.lda.atompaw.
Run ABINIT again and open the output file (it should be tpaw1_2.outA)
You should obtain the values:

etotal1  -1.1474828697E+01
etotal2  -1.1518675625E+01
etotal3  -1.1524581240E+01
etotal4  -1.1525548758E+01
etotal5  -1.1525741818E+01
etotal6  -1.1525865084E+01
etotal7  -1.1525926864E+01
etotal8  -1.1525947400E+01
etotal9  -1.1525954817E+01

You can check that:
The etotal convergence (at 1 mHartree) is achieved for 12<=ecut<=14 Hartree (etotal4 is within 1 mHartree of the final value);
The etotal convergence (at 0.1 mHartree) is achieved for 16<=ecut<=18 Hartree (etotal6 is within 0.1 mHartree of the final value).

So with the same input, a PAW calculation for diamond needs a lower cutoff, compared to a norm-conserving pseudopotential calculation.

### 3. The convergence on the double grid FFT cut-off (pawecutdg)

In a norm-conserving pseudopotential calculation, the (plane wave) density grid is (at least) twice bigger than the wavefunctions grid, in each direction. In a PAW calculation, the (plane wave) density grid is tunable thanks to the input variable pawecutdg (PAW: ECUT for Double Grid). This is needed because of the mapping of  objects (densities, potentials) located in the augmentation regions (PAW spheres) onto the global FFT grid.
The number of points of the Fourier grid located in the spheres must be high enough to preserve the accuracy. It is determined from the cut-off energy  pawecutdg. An alternative is to use directly the input variable ngfftdg. One of the most sensitive objects affected by this "grid transfer" is the compensation charge density; its integral over the augmentation regions (on spherical grids) must cancel with its integral over the whole simulation cell (on the FFT grid).

Use now the input file tpaw1_3.in and the associated tpaw1_3.files file.
The only difference with the tpaw1_2.in file is that ecut is fixed to 12 Ha, while pawecutdg runs from 12 to 39 Ha.

Launch ABINIT with these files; you should obtain the values (file tpaw1_3.out):

etotal1  -1.1524629595E+01
etotal2  -1.1524595840E+01
etotal3  -1.1524585370E+01
etotal4  -1.1524580630E+01
etotal5  -1.1524584720E+01
etotal6  -1.1524583573E+01
etotal7  -1.1524582786E+01
etotal8  -1.1524582633E+01
etotal9  -1.1524582213E+01
etotal10 -1.1524582316E+01

We see that the variation of the energy wit respect to this parameter is well below the 1 mHa level. For pawecutdg=24 Ha (5th dataset), the the energy change is lower than 0.001 mHa. Note the steps in the convergency. They are due to the sudden (integer) changes in the grid size (see the output values for  ngfftdg) which do not occur for each increase of pawecutdg.

The convergence of the compensation charge has a similar behaviour; it is possible to check it in the output file, just after the SCF cycle by looking at:

PAW TEST:
==== Compensation charge inside spheres ============

The following values must be close...

Compensation charge over spherical meshes =      0.409392121335747
Compensation charge over fine fft grid    =      0.409392418241149

The two values of the integrated compensation charge density must be close to each other.
Note that, for numerical reasons, they cannot be exactly the same (integration over a radial grid does not use the same scheme as integration over a FFT grid).

Additional test:
We want now to check the convergence in ecut with a fixed value of 24 Ha for pawecutdg. Modify the file tpaw1_2.in, setting pawecutdg to 24 Ha, and launch ABINIT again...
You should obtain the values :
etotal1  -1.1474831477E+01
etotal2  -1.1518678975E+01
etotal3  -1.1524584720E+01
etotal4  -1.1525552267E+01
etotal5  -1.1525745330E+01
etotal6  -1.1525868591E+01
etotal7  -1.1525930368E+01
etotal8  -1.1525950904E+01
etotal9  -1.1525958319E+01

You can check again that:
The etotal convergence (at the 1 mHartree level) is achieved for 12<=ecut<=14 Hartree ;
The etotal convergence (at the 0.1 mHartree level) is achieved for 16<=ecut<=18 Hartree.

Note 1:

Associated with the input variable pawecutdg is the input variable ngfftdg: it gives the size of the FFT grid associated with pawecutdg. Note that pawecutdg is only useful to define the FFT grid for the density in a convenient way. You can therefore tune directly ngfftdg to define the size of the FFT grid for the density.

Note 2:
Although pawecutdg should always be checked, in practice, a common use it to put it at least twice bigger than ecut and keep it constant during all calculations. Increasing pawecutdg slightly changes the CPU execution time, but above all it is memory-consuming.
Note that, if ecut is already high, there is no need for a high pawecutdg.
Last warning: when testing ecut convergency, pawecutdg has to remain constant to obtain consistent results.

### 4. Plotting PAW contributions to the Density of States (DOS)

We use now the input file tpaw1_4.in and the associated tpaw1_4.files file.
ABINIT is now asked to compute the Density Of State (DOS) (see the  prtdos keyword in the input file). Also note that more k-points are used in order to increase the accuracy of the DOS. ecut is set to 12 Ha, while pawecutdg is 24 Ha.

Launch ABINIT with these files; you should obtain the tpaw1_4.out and the DOS file (tpaw1_4o_DOS):

```abinit < tpaw1_4.files > tmp-log
```

You can plot the DOS file if you want; for this purpose, use a graphical tool and plot column 3 with respect to column 2. If you use the "xmgrace" tool, launch:

`xmgrace -block tpaw1_4o_DOS -bxy 1:2`

At this stage, you have the usual plot for a DOS; nothing specific to PAW.

Now, edit the tpaw1_4.in file, comment the "prtdos 1", and uncomment (or add):

prtdos 3  pawprtdos 1 natsph 1 iatsph 1 ratsph 1.5

The " prtdos 3" statement now requires the output of the projected DOS; "natsphiatsphratsph 1.5" selects the first carbon atom as the center of projection, and sets the radius of the projection area to 1.5 atomic units (this is exactly the radius of the PAW augmentation regions: generally the best choice).
The "pawprtdos 1" is specific to PAW. With this option, ABINIT is asked to compute all the contributions to the projected DOS.
Let's remember that:

|Ψn>  =~n>+  Σ (φ-~φi) <~p |~Ψn >

Within PAW, the total projected DOS has 3 contributions:
1- the smooth plane-waves contribution (from~n>)
2- the all-electron on-site contribution (from
φi  <~p |~Ψn >)
3- the pseudo on-site contribution (from~φi <~p |~Ψn >).

Launch ABINIT again (with the modified input file). You get a new DOS file, named tpaw1_4o_DOS_AT0001.
You can edit it and look inside; it contains the 3 PAW contributions (mentioned above) for each angular momentum. In the diamond case, only l=0 and l=1 momenta are treated.
Now, plot the file, using the 3rd, 8th and 13th columns with respect to the 2nd one; it plots the 3 PAW contributions for l=0 (the total DOS is the sum of the three contributions).
If you use the "xmgrace" tool, launch:
`xmgrace -block tpaw1_4o_DOS_AT0001 -bxy 1:2 -bxy 1:7 -bxy 1:12`
You should get this: As you can see, the smooth PW contribution and the PS on-site contribution are close.
So, in a first approach, they cancel; we could approximate the DOS by the AE on-site part taken alone.
That is exactly what is done when pawprtdos=2; in that case, only the AE on-site contribution is computed and given as a good approximation of the total projected DOS. The main advantage of this option is the decrease of the CPU time needed to compute the DOS (it is instantaneously computed).

But, as you will see in the next section, this approximation is only valid when:
(1) the~φi basis is complete enough
(2) the electronic density is mainly contained in the sphere defined by ratsph.

### 5. Testing the completeness of the PAW partial wave basis

Note that, in the previous section, we used a "standard" PAW dataset, with 2 partial waves per angular momentum. It is generally the best compromise beween the completeness of the partial wave basis and the efficiency of the PAW dataset (the more partial waves you have, the longer the CPU time used by ABINIT is).
Let's have a look at the ~abinit/tests/Psps_for_tests/6c.lda.atompaw file. The sixth line indicates the number of partial waves and their l angular momentum. In the present file, "0 0 1 1" means "two l=0 partial waves, two l=1 partial waves".
Now, let's open the ~abinit/tests/Psps_for_tests/6c.lda.test-2proj.atompaw and ~abinit/tests/Psps_for_tests/6c.lda.test-6proj.atompaw files. In the first file, only one partial wave per l is present; in the second one, 3 partial waves per l are present. In other words, the completeness of the partial wave basis increases when you use 6c.lda.test-2proj.atompaw, 6c.lda.atompaw and 6c.lda.test-6proj.atompaw.

Now, let's plot the DOS for the two new PAW datasets.
- First, save the existing tpaw1_4o_DOS_AT0001 file, naming it, for instance, tpaw1_4o_4proj_DOS_AT0001.
- Open the tpaw1_4.files file and modify it in order to use the 6c.lda.test-2proj.atompaw PAW dataset.
- Launch ABINIT again.
- Save the new tpaw1_4o_DOS_AT0001 file, naming it, for instance, tpaw1_4o_2proj_DOS_AT0001.
- Open the tpaw1_4.files file and modify it in order to use the 6c.lda.test-6proj.atompaw PAW dataset.
- Launch ABINIT again.
- Save the new tpaw1_4o_DOS_AT0001 file, naming it, for instance, tpaw1_4o_6proj_DOS_AT0001.

Then, plot the contributions to the projected DOS for the two new DOS files. You should get:  Adding the DOS obtained in the previous section to the comparison, you immediately see that the superposition of the Smooth part DOS and the PS on-site DOS depends on the completeness of the partial wave basis !

Now, you can have a look at the 3 output files (one for each PAW dataset)... for instance in a comparison tool.
A way to estimate the completeness of the partial wave basis is to compare derivatives of total energy; if you look at the stress stensor:

For the 2 partial-wave bases:  -1.0866668849E-03 -1.0866668849E-03 -1.0866668849E-03  0.  0.  0.
For the 4 partial-wave basis:   4.1504385879E-04  4.1504385879E-04  4.1504385879E-04  0.  0.  0.
For the 6 partial-wave basis:   4.1469803037E-04  4.1469803037E-04  4.1469803037E-04  0.  0.  0.

The 2 partial-wave basis is clearly not complete; the 4 partial-wave basis results are correct...
Such a test is useful to estimate the precision we can expect on the stress tensor (at least due to the partial wave basis).

You can compare other results in the 3 output files: total energy,  eigenvalues, occupations...
Also notice that the dimensions of the PAW on-site quantities change: have a look at "Pseudopotential strengh Dij" or "Augmentation waves occupancies Rhoij" sections...

Note: if you want to learn how to generate PAW datasets with different partial wave bases, you might follow the tutorial PAW2.

### 6. Checking the validity of PAW results

As usual, the validity of a "pseudopotential" (PAW dataset) has to be checked by comparison, on known structures, with known results. In the case of diamond, lots of computations and experimental results exist.
Very important remark: the validity (completeness of plane wave basis and partial wave basis) of PAW calculations should always be checked by comparison with all-electrons computation results (or with other existing PAW results); it should not be done by comparison with experimental results.
As the PAW method has the same accuracy than all-electron methods, results should be very close.

Concerning diamond, all-electron results can be found (for instance) in PRB 55, 2005 (1997).
With the famous WIEN2K code (which uses the FP-LAPW method), all-electron equilibrium parameters for diamond (for LDA) are:

a0 = 3.54 angstrom B = 470 GPa

Experiments give:

a0 = 3.56 angstrom
B = 443 GPa

Let's test with ABINIT.
We use now the input file tpaw1_5.in and the associated tpaw1_5.files file.
ABINIT is now asked to compute values of etotal for several cell parameters around 3.54 angstrom, using the standard PAW dataset.
Launch ABINIT with these files; you should obtain the tpaw1_5.out.
```abinit < tpaw1_5.files > tmp-log
```
From the tpaw1_5.out file, you can extract the 7 values of acell and 7 values of etotal, then put them into a file and plot it with a graphical tool. You should get: From this curve, you can extract the cell values of a0 and B (with the method of your choice, for example by a Birch-Murnhagan spline fit).
You get:
a0 = 3.535 angstrom B = 465 GPa

These results are in excellent agreement with FP-LAPW ones !

### 7. Additional comments about PAW in ABINIT

7.a Mixing scheme for the Self-Consistent cycle; decomposition of the total energy.

The use of an efficient mixing scheme in the self-consistent loop is a crucial point to minimize the number of steps to achieve convergency. This mixing can be done on the potential or on the valence density. By default, in a norm-conserving pseudopotential calculation, the mixing is done on the potential; but, for technical reasons, this choice is not optimal for PAW calculations. Thus, by default, the mixing is done on the density when PAW is activated.
The mixing scheme can be controlled by the iscf variable (please, read again the different options of this input variable).
By default, iscf=7 for norm-conserving pseudopotentials, while iscf= 17 for PAW...
To compare both schemes, you can edit the tpaw1_1.in file and try iscf=7 or 17 and compare the behaviour of the SC cycle in both cases; as you can see, final total energy is the same but the way to reach it is completely different.

Now, have a look at the end of the file and focus on the "Components of total free energy"; the total energy is decomposed according to both schemes; at very high convergence of the SCF cycle (very small potential or density residual), these two values should be the same. But it has been observed that the converged value was reached more rapidly by the direct energy, when the mixing is on the potential, and by the double counting energy when the mixing is on the density. Thus, by default, in the output file is to print the direct energy when the mixing is on the potential, and the double counting energy when the mixing is on the density.

You can try (using the tpaw1_1.in file) to decrease the values of tolvrs and look at the difference between both values of energy.

Also note that PAW ρij quantities (occupancies of partial waves) also are mixed during the SC cycle; by default, the mixing is done in the same way as the density.

7.b Overlap of PAW spheres

In principle, the PAW formalism is only valid for non-overlapping augmentation regions (PAW spheres). But, in usual cases, a small overlap between spheres is acceptable.
By default, ABINIT checks that the distances between atoms are large enough to avoid overlap; a "small" voluminal overlap of 5% is accepted by default. This value can be tuned with the pawovlp input keyword. The overlap check can even be by-passed with pawovlp=-1.

Important warning: while a small overlap can be acceptable for the augmentation regions, an overlap of the compensation charge densities has to be avoided. The compensation charge density is defined by a radius (named rshape in the PAW dataset file) and an analytical shape function. The overlap related to the compensation charge radius is checked by ABINIT and a WARNING is eventually printed...

Also note that you can control the compensation charge radius and shape function while generating the PAW dataset (see tutorial PAW2).

7.c Printing volume for PAW

If you want to get more detailed output concerning the PAW computation, you can use the pawprtvol input keyword. See its description in the user's manual...
It is particullary useful to print details about pseudopotential strengh (Dij) or partial waves occupancies (ρij).

7.d Additional PAW input variables

Looking at the ~abinit/doc/input_variables/varbas.html file, you can find input ABINIT keywords specific to PAW. They are to be used when tuning the computation, in order to gain accuracy or save CPU time.
Warning : in a standard computation, these variables should not be modified !

Variables that can be used to gain accuracy (in ascending order of importance):
pawxcdev: control the accuracy of exchange-correlation on-site potentials (try pawxcdev=2 to increase accuracy).
mqgriddg: control the accuracy of spline fits to transfer densities/potentials from FFT grid to spherical grid.
pawnzlm: control the computation of moments of spherical densities that should be zero by symmetry.

Variables that can be used to save memory (in ascending order of importance):
pawstgylm: control the storage of spherical harmonics computed around atoms.
pawmixdg: control on which grid the potential/density is mixed during SCF cycles.
pawlcutd: control the number of angular momenta to take into account in on-site densities.
pawlmix: control the number of ρij to be mixed during SCF cycle.

Variables that can be used to save CPU time (in ascending order of importance):
pawnhatxc: control the numerical treatment of gradients of compensation charge density in case of GGA
pawstgylm: control the storage of spherical harmonics computed around atoms.
pawlcutd: control the number of angular momenta to take into account in on-site densities.
pawlmix: control the number of ρij to be mixed during SCF cycle.
bxctmindg: can be used to decrease the size of fine FFT grid for a given value of pawecutdg.

The above list is not exhaustive. several other keywords can be used to tune ABINIT PAW calculations.

7.e PAW+U

If the system under study contains strongly correlated electrons, the LDA+U method can be useful. It is controlled by the usepawulpawu, upawu and jpawu input keywords. Note that the formalism implemented in ABINIT is approximate, i.e. it is only valid if:
(1) the~φi basis is complete enough ;
(2) the electronic density is mainly contained in the PAW sphere.
The approximation done here is the same as the one explained in the 5th section of this tutorial: considering that smooth PW contributions and PS on-site contributions are closely related, only the AE on-site contribution is computed; it is indeed a very good approximation.

Converging a Self-Consistent Cycle, or ensuring the global minimum is reached, with PAW+U is sometimes difficult. Using usedmatpu and dmatpawu can help...