Self-consistent GW on eigenvalues only

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Self-consistent GW

In this tutorial you will learn how to perform self-consistent GW on eigenvalues only for G or both G and W (evGW). For molecules systems and also for many solids, the G0W0 approach often gives poor results. The main reason of this failure is that the DFT starting point with local or semi-local exchange correlation functionals give a too small gap compared with the experimental one, and a single shot GW is not able to correct this error. In order to overcome this problem a possible solution is to use as starting point a hybrid functional like PBE0, B3LYP,HSE etc.. or to perform a self-consistent GW. In general in self-consistent GW also the wave-function should be updated, but for many systems DFT wave-functions are already quite good and a self-consistency on eigenvalues only can be sufficient, for a discussion see for example ref.[1]

In this tutorial we will show how to perform self-consistent GW on the eigenvalues only with the Yambo code.

  1. Generate an input file for a G0W0 calculation as explained in the GW basics tutorial doing:
    yambo -X p -g n -p p -V qp -F
    notice that in order to perform self-consistent GW, you have to include all k-points and a reasonable number of valence and conduction bands in the QPkrange.
  2. run your first GW calculation doing:
    yambo –F -J G0W0
  3. at the end of the run you will get a quasi-particle file o-G0W0.qp.
    Now you can read this new quasi-particle band structure and perform another GW.
  4. copy your gw input in a new file: cp
  5. modify the to force Yambo to read the previous quasi-particle corrections
    GfnQPdb= "E < ./G0W0/ndb.QP"
    XfnQPdb= "E < ./G0W0/ndb.QP"
  6. repeat point 1) and 2) for the G1W1, G2W2, etc… until the differences between o-GnWn.qp and o-Gn+1Wn+1.qp are small enough.

Usually self-consistent GW converges in about 3/4 iterations, see for instance the figure below. Notice that self-consistency on the eigenvalues can modify the energy level orders. Moreover evGW removes large part of dependency of the GW results from the DFT functional.

If you want to perform self-consistency only on G and not on W comment the line: #XfnQPdb= "E < ./G0W0/ndb.QP"

In general increasing the self-consistency level gives larger band gap: ΔDFT < ΔGoWo < ΔGWo< ΔGW.

Self-consistent GW on eigenvalues

In this figure we show the convergence of quasi-particle energy in self-consistent GW for both G and W for hexagonal Boron Nitride, see Ref. [2]

Convergence and other issues

Convergence : convergence parameters for the self-consistent GW are the same of the standard GoWo calculation plus the bands range QPkrange employed for the self-consistency. You should perform some tests increasing the bands range and see if you converge to the same result. Notice that at each iteration the GW correction is fitted and applied also to the bands not included in the bands range. Do not use non-continuous bands/k-points range this could give wired results and the code does not check against these errors.

Yambo version : the self-consistent GW works only in Yambo 5.x, please do not use it in Yambo 4.x