for lithium version of Exciting
Purpose: In this tutorial you will learn how to set up and execute a series of calculations for strained structures. Additionally, it will be explained how to obtain the derivatives of the energyvsstrain curves at zero strain and how these quantities are related to elastic constants.
Table of Contents

0. Define relevant shell variables and download scripts
Read the following paragraphs before starting with the rest of this tutorial!
Before starting, be sure that relevant shell variables are already defined and that the excitingscripts directory has already been downloaded, as specified in Tutorial scripts and environment variables. Here is a list of the scripts which are relevant for this tutorial with a short description.
 SETUPelasticstrain.py: Python script for generating strained structures.
 EXECUTEelasticstrain.sh: (Bash) shell script for running a series of exciting calculations.
 CHECKFITenergyvsstrain.py: Python script for extracting derivatives at zero strain of energyvsstrain curves.
 PLOTenergy.py: Python visualization tool for energyvsstrain curves.
 PLOTstatus.py: Python visualization tool for RMS deviations of the SCF potential as a function of the iteration number during the SCF loop.
 PLOTmaxforces.py: Python visualization tool for the maximum amplitude of the force on the atoms during relaxation.
 PLOTcheckderiv.py: Python visualization tool for the calculation of derivatives at zero strain using the fit of energyvsstrain curves.
 PLOToptimizedgeometry.py: Python visualization tool for relaxed coordinates of atoms in the unit cell (implemented only for cells containing 2 atoms).
From now on the symbol $ will indicate the shell prompt.
Requirements: Bash shell. Python numpy, lxml, matplotlib.pyplot, and sys libraries.
1. Set up the calculations
i) Preparation of the input file
The first step is to create a directory for each system that you want to investigate. Here, we consider the calculation of the energyvsstrain curves for carbon in the diamond structure. However, the procedure we show you is valid for any system. Thus, we will create a directory diamondelasticstrain and we move inside it.
$ mkdir diamondelasticstrain
$ cd diamondelasticstrain
Inside this directory, we create (or copy from a previous calculation) the file input.xml corresponding to a calculation for the equilibrium structure of diamond. This file could look like the following.
<input> <title>Diamond: Equilibrium structure</title> <structure speciespath="$EXCITINGROOT/species"> <crystal scale="6.7145"> <basevect> 0.5 0.5 0.0 </basevect> <basevect> 0.5 0.0 0.5 </basevect> <basevect> 0.0 0.5 0.5 </basevect> </crystal> <species speciesfile="C.xml" rmt="1.25"> <atom coord="0.00 0.00 0.00" /> <atom coord="0.25 0.25 0.25" /> </species> </structure> <groundstate ngridk="8 8 8" swidth="0.0001" gmaxvr="14" maxscl="20"> </groundstate> <structureoptimization></structureoptimization> </input>
Please, remember that the input file for an exciting calculation must always be called input.xml.
Be sure to set the correct path for the exciting root directory (indicated in this example by $EXCITINGROOT) to the one pointing to the place where the exciting directory is placed. In order to do this, use the command
$ SETUPexcitingroot.sh
Be sure to have in your file the appropriate command for performing the structure optimization: Deforming your system may change the relative positions of the atoms in the unit cell.
<structureoptimization></structureoptimization>
ii) Generation of input files for distorted structures
All strains considered in this tutorial are Lagrangian strains.
In order to generate input files for a series of distorted structure, you have to run the script SETUPelasticstrain.py. Notice that the script SETUPelasticstrain.py always generates a working directory containing input files for different strains. Results of the current calculations will be also stored in the working directory. The directory name can be specified by adding the name in the command line.
$ SETUPelasticstrain.py DIRECTORYNAME
If no name is given, the script use the default name workdir. Very important: The working directory is overwritten each time you execute the script SETUPelasticstrain.py. Therefore, choose different names for different calculations.
The script SETUPelasticstrain.py produces the following output on the screen (using deformation0 as working directory).
$ SETUPelasticstrain.py deformation0
Enter maximum Lagrangian strain [smax] >>>> 0.10
Enter the number of strain values in [smax,smax] >>>> 11

List of deformation codes for strains in Voigt notation

0 => ( eta, eta, eta, 0, 0, 0)  volume strain
1 => ( eta, 0, 0, 0, 0, 0)  linear strain along x
2 => ( 0, eta, 0, 0, 0, 0)  linear strain along y
3 => ( 0, 0, eta, 0, 0, 0)  linear strain along z
4 => ( 0, 0, 0, eta, 0, 0)  yz shear strain
5 => ( 0, 0, 0, 0, eta, 0)  xz shear strain
6 => ( 0, 0, 0, 0, 0, eta)  xy shear strain
7 => ( 0, 0, 0, eta, eta, eta)  shear strain along (111)
8 => ( eta, eta, 0, 0, 0, 0)  xy inplane strain
9 => ( eta, eta, 0, 0, 0, 0)  xy inplane shear strain
10 => ( eta, eta, eta, eta, eta, eta)  global strain

Enter deformation code >>>> 0
$
In this example, (on screen) input entries are preceded by the symbol ">>>>". Entry values must be typed on the screen when requested. The first entry (in our example 0.10) represents the absolute value of the maximum strain for which we want to perform the calculation. The second entry (11) is the number of deformed structures equally spaced in strain, which are generated between the maximum negative strain and the maximum positive one. The third (last) entry (0) is a self explained label indicating the type of deformation. The latter is always referred to 2dimensional strain tensors in the Voigt notation (so that, e.g., a strain value of 0.10 corresponds, for the choice 1 of the deformation code, to a linear deformation of 10% along the x direction).
After running the script, a directory called deformation0 is created, which contains input files for different strain values.
2. Execute the calculations
To execute the series of calculation with input files created by SETUPelasticstrain.py you have to run the script EXECUTEelasticstrain.sh. If a name for the working directory has been specified, then you must give it here, too.
$ EXECUTEelasticstrain.sh deformation0
Running exciting for file input01.xml 
...
Run completed for file input11.xml 
$
After the complete run, results of the calculation for the input file inputi.xml are contained in the subdirectory (of the working directory) rundiri where i is running from 01 to the total number of strain values. The data for energyvsstrain curves are contained in the file energyvsstrain.
3. Postprocessing: Extract energy derivatives
In order to analyse the result of calculations, you first have to move to the working directory.
$ cd deformation0
At this point, you can use the python script CHECKFITenergyvsstrain.py for extracting derivatives at zero strain of energyvsstrain curves.
$ CHECKFITenergyvsstrain.py
Enter maximum strain for the interpolation >>>> 0.10
Enter the order of derivative >>>> 2
###########################################
Fit data
Deformation code ==> 0
Deformation label ==> EEE000
Maximum value of the strain ==> 0.10000000
Number of strain values used ==> 11
Fit results for the derivative of order 2
Polynomial of order 2 ==> 4444.92 [GPa]
Polynomial of order 3 ==> 4444.92 [GPa]
Polynomial of order 4 ==> 4030.23 [GPa]
Polynomial of order 5 ==> 4030.23 [GPa]
Polynomial of order 6 ==> 4041.32 [GPa]
Polynomial of order 7 ==> 4041.32 [GPa]
$
In this example, input entries are preceded by the symbol ">>>>". Entry values must be typed on the screen when requested. The first entry (in our example 0.10) represents the absolute value of the maximum strain for which we want to perform the calculation. The second entry (2) is the order of the derivative that we want to obtain.
The script generates the output files checkenergyderivatives and orderofderivative, which can be used in the postprocessing analysis. Results of this script can be analyzed using the visualization tool PLOTcheckderiv.py.
4. Postprocessing: Visualization tools
All the scripts mentioned here must be executed in the directory where the energyvsstrain, checkenergyderivatives, and orderofderivative files are located. The scripts produce as output a PostScript file named PLOT.ps .
i) PLOTenergy.py
This script allows for the visualization of the energyvsstrain curve. It is executed as follows.
$ PLOTenergy.py
In the following, we display the result for the example mentioned above (carbon in the diamond structure, volumestrain deformations up to 10%).
ii) PLOTcheckderiv.py
This is a very important tool that allows to represent the dependence of the calculated derivatives of the energyvsstrain curve on
 the range of points included in the fitting procedure,
 the maximum degree of the polynomial used in the fitting procedure.
The script PLOTcheckderiv.py is executed as follows.
$ PLOTcheckderiv.py YMIN YMAX
One or two optional entries can be specified on the calling line. Assigning numerical values to these two entries, you can set the minimum (YMIN) and the maximum (YMAX) value on the vertical axis, respectively. An example of the script output is the following.
The previous plots can be used to determine the best range of deformations and order of polynomial fit for each distortion. By analyzing the plot, we note that curves corresponding to the higher order of the polynomial used in the fit show a horizontal plateau at about 4040 GPa. This can be assumed to be the converged value for the second derivative, from the point of view of the fit (further information on this topic can be found here). For this distortion type, this value equals 9 times the bulk modulus. Thus, the extracted value of the bulk modulus is about 449 GPa.
iii) PLOTstatus.py
Python visualization tool for the RMS deviations of the effective SCF potential as a function of the iteration number during the SCF loop. It is executed as follows.
$ PLOTstatus.py LABEL
Here, the entry on the command line, (LABEL), must be specified and represents the label (i.e., the name of the working directory) for which you would like to follow the RMS deviation for each iteration. In particular, the choice r refers to the currently running calculation and, more generally, LABEL to the calculation already saved in the directory LABEL. An example of the PostScript output of the script is the following.
Different line segments correspond to SCF calculations for different geometries during the relaxation.
iv) PLOTmaxforce.py
Python visualization tool for the maximum amplitude of the force on atoms during relaxation. It should be only used for deformations which allow for internal relaxation of atomic positions, e.g., for the deformation with the code 7. It is executed as follows.
$ PLOTmaxforce.py LABEL
The input entry definition is the same as for the script PLOTstatus.py. An example of the script output is the following.
The red points show the calculated value at each optimization step, whereas the blue line indicates the target value of the maximum amplitude of the force for stopping the relaxation.
v) PLOToptimizedgeometry.py
Python visualization tool for showing the optimized geometry compared to the reference (unrelaxed) geometry for the relative atomic coordinates of the two atoms in the diamond unit cell as a function of Lagrangian strain. It should be only used for deformations which allow for internal relaxation of atomic positions, e.g., for the deformation with the code 7. It is executed as follows.
$ PLOToptimizedgeometry.py YMIN YMAX
One or two entries optional entries can be specified on the calling line. Assigning numerical values to these two entries, you can set the minimum (YMIN) and the maximum (YMAX) value on the vertical axis, respectively. An example of the PostScript output of the script for the deformation code 7 is the following.
Here, (Δ1, Δ2, Δ3) and (Δ1_{ref}, Δ2_{ref}, Δ3_{ref}) represent the vector joining the 2 atoms in the unit cell, expressed in crystal coordinates, for the optimized geometry and the unrelaxed (reference) case, respectively.
5. Postprocessing: How to derive elastic constants
Second derivatives calculated at zero strain of energyvsstrain curves are combinations of the elastic constants C_{ij} where the indexes i,j=1,2,…,6 are given in the Voigt notation. In the example that we are considering here, carbon in the cubic diamond structure, only 3 different elastic constants are non vanishing
 C_{11}
 C_{12}
 C_{44}
In order to extract these three elastic constants, three different deformation types must be used. For cubic systems the best choice is represented by the following deformation types
 Volume strain (in our script corresponding to the label 0)
 Uniaxial strain in the 100 direction (label 1)
 Shear strain along the 111 direction (label 7)
Which in turns correspond to the following combination of elastic constants:
 label 0: 3 C_{11}+ 6 C_{12} = 9 B_{0}
 label 1: C_{11}
 label 7: 3 C_{44}
where B_{0} is the bulk modulus.
Experimental reference values for diamond:
 C_{11} = 1076 GPa
 C_{12} = 125 GPa
 C_{44} = 577 GPa
 B_{0} = 452 GPa