mirror of https://github.com/triqs/dft_tools
193 lines
8.6 KiB
ReStructuredText
193 lines
8.6 KiB
ReStructuredText
.. _convWien2k:
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Interface with Wien2k
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=====================
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We assume that the user has obtained a self-consistent solution of the
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Kohn-Sham equations. We further have to require that the user is
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familiar with the main in/output files of Wien2k, and how to run
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the DFT code.
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Conversion for the DMFT self-consistency cycle
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----------------------------------------------
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First, we have to write the necessary
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quantities into a file that can be processed further by invoking in a
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shell the command
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`x lapw2 -almd`
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We note that any other flag for lapw2, such as -c or -so (for
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spin-orbit coupling) has to be added also to this line. This creates
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some files that we need for the Wannier orbital construction.
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The orbital construction itself is done by the Fortran program
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:program:`dmftproj`. For an extensive manual to this program see
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:download:`TutorialDmftproj.pdf <images_scripts/TutorialDmftproj.pdf>`.
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Here we will only describe the basic steps.
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In the following, we use SrVO3 as an example to explain the
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input file :file:`case.indmftpr` for :program:`dmftproj`.
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A full tutorial on SrVO3 is available in the :ref:`SrVO3 tutorial <SrVO3>`.
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.. literalinclude:: ../tutorials/images_scripts/SrVO3.indmftpr
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The first three lines give the number of inequivalent sites, their
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multiplicity (to be in accordance with the Wien2k *struct* file) and
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the maximum orbital quantum number :math:`l_{max}`. In our case our
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struct file contains the atoms in the order Sr, V, O.
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Next we have to specify for each of the inequivalent sites, whether
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we want to treat their orbitals as correlated or not. This information
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is given by the following 3 to 5 lines:
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#. We specify which basis set is used (complex or cubic
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harmonics).
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#. The four numbers refer to *s*, *p*, *d*, and *f* electrons,
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resp. Putting 0 means doing nothing, putting 1 will calculate
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**unnormalized** projectors in compliance with the Wien2k
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definition. The important flag is 2, this means to include these
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electrons as correlated electrons, and calculate normalized Wannier
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functions for them. In the example above, you see that only for the
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vanadium *d* we set the flag to 2. If you want to do simply a DMFT
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calculation, then set everything to 0, except one flag 2 for the
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correlated electrons.
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#. In case you have a irrep splitting of the correlated shell, you can
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specify here how many irreps you have. You see that we put 2, since
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eg and t2g symmetries are irreps in this cubic case. If you don't
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want to use this splitting, just put 0.
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#. (optional) If you specifies a number different from 0 in above line, you have
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to tell now, which of the irreps you want to be treated
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correlated. We want to t2g, and not the eg, so we set 0 for eg and
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1 for t2g. Note that the example above is what you need in 99% of
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the cases when you want to treat only t2g electrons. For eg's only
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(e.g. nickelates), you set 10 and 01 in this line.
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#. (optional) If you have specified a correlated shell for this atom,
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you have to tell if spin-orbit coupling should be taken into
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account. 0 means no, 1 is yes.
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These lines have to be repeated for each inequivalent atom.
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The last line gives the lower and upper limit of the energy window,
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relative to the Fermi energy, which is used for the projective Wannier functions.
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Note that, in accordance with Wien2k, we give energies in Rydberg units!
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The third number is an optional flag to switch between different modes:
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#. 0: The projectors are constructed for the given energy window. The number
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of bands within the window is usually different at each k-point which
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will be reflected by the projectors, too. This is the default mode
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which is also used if no mode flag is provided.
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#. 1: The lowest and highest band indices within the given energy window
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are calculated. The resulting indices are used at all k-points.
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Bands which fall within the window only in some parts of the Brillouin zone
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are fully taken into account. Keep in mind that a different set of k-points
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or the -band option can change the lower or upper index. This can be avoided
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by using mode 2.
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#. 2: In this mode the first two values of the line are interpreted as lower
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and upper band indices to be included in the projective subspace. For example,
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if the line reads `21 23 2`, bands number 21, 22 and 23 are included at all
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k-points. For SrVO3 this corresponds to the t2g bands around the Fermi energy.
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The lowest possible index is 1. Note that the indices need to be provided as integer.
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In all modes the used energy range, i.e. band range, is printed to the
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:program:`dmftproj` output.
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After setting up the :file:`case.indmftpr` input file, you run:
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`dmftproj`
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Again, adding possible flags like -so for spin-orbit coupling. This
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program produces the following files (in the following, take *case* as
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the standard Wien2k place holder, to be replaced by the actual working
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directory name):
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* :file:`case.ctqmcout` and :file:`case.symqmc` containing projector
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operators and symmetry operations for orthonormalized Wannier
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orbitals, respectively.
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* :file:`case.parproj` and :file:`case.sympar` containing projector
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operators and symmetry operations for uncorrelated states,
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respectively. These files are needed for projected
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density-of-states or spectral-function calculations in
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post-processing only.
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* :file:`case.oubwin` needed for the charge density recalculation in
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the case of fully self-consistent DFT+DMFT run (see below).
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Now we convert these files into an hdf5 file that can be used for the
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DMFT calculations. For this purpose we
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use the python module :class:`Wien2kConverter <dft.converters.wien2k.Wien2kConverter>`. It is initialized as::
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from triqs_dft_tools.converters.wien2k import *
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Converter = Wien2kConverter(filename = case)
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The only necessary parameter to this construction is the parameter `filename`.
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It has to be the root of the files produces by dmftproj. For our
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example, the :program:`Wien2k` naming convention is that all files have the
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same name, but different extensions, :file:`case.*`. The constructor opens
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an hdf5 archive, named :file:`case.h5`, where all relevant data will be
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stored. For other parameters of the constructor please visit the
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:ref:`refconverters` section of the reference manual.
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After initializing the interface module, we can now convert the input
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text files to the hdf5 archive by::
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Converter.convert_dft_input()
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This reads all the data, and stores it in the file :file:`case.h5`.
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In this step, the files :file:`case.ctqmcout` and
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:file:`case.symqmc` have to be present in the working directory.
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After this step, all the necessary information for the DMFT loop is
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stored in the hdf5 archive, where the string variable
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`Converter.hdf_filename` gives the file name of the archive.
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At this point you should use the method :meth:`dos_wannier_basis <dft.sumk_dft_tools.SumkDFTTools.dos_wannier_basis>`
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contained in the module :class:`SumkDFTTools <dft.sumk_dft_tools.SumkDFTTools>` to check the density of
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states of the Wannier orbitals (see :ref:`analysis`).
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You have now everything for performing a DMFT calculation, and you can
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proceed with the section on :ref:`single-shot DFT+DMFT calculations <singleshot>`.
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Data for post-processing
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------------------------
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In case you want to do post-processing of your data using the module
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:class:`SumkDFTTools <dft.sumk_dft_tools.SumkDFTTools>`, some more files
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have to be converted to the hdf5 archive. For instance, for
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calculating the partial density of states or partial charges
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consistent with the definition of :program:`Wien2k`, you have to invoke::
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Converter.convert_parproj_input()
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This reads and converts the files :file:`case.parproj` and
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:file:`case.sympar`.
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If you want to plot band structures, one has to do the
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following. First, one has to do the Wien2k calculation on the given
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:math:`\mathbf{k}`-path, and run :program:`dmftproj` on that path:
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| `x lapw1 -band`
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| `x lapw2 -band -almd`
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| `dmftproj -band`
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Again, maybe with the optional additional extra flags according to
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Wien2k. Now we use a routine of the converter module allows to read
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and convert the input for :class:`SumkDFTTools <dft.sumk_dft_tools.SumkDFTTools>`::
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Converter.convert_bands_input()
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After having converted this input, you can further proceed with the
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:ref:`analysis`. For more options on the converter module, please have
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a look at the :ref:`refconverters` section of the reference manual.
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Data for transport calculations
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-------------------------------
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For the transport calculations, the situation is a bit more involved,
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since we need also the :program:`optics` package of Wien2k. Please
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look at the section on :ref:`Transport` to see how to do the necessary
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steps, including the conversion.
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