Dielectric properties of SiC

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Description: the static and frequency dependent dielectric properties of SiC.


Static dielectric properties

Density functional perturbation theory

Let us start of with the calculation of the static dielectric properties. The most convenient way to determine the Born effective charges, dielectric-, piezoelectric tensors is by means of density functional perturbation theory (LEPSILON=.TRUE.).

  • INCAR
# Static dielectric properties by means of DFPT
EDIFF = 1E-6
LEPSILON = .TRUE.

ISMEAR =  0
SIGMA  =  0.01
GGA    = PE
  • KPOINTS
8x8x8
 0
G
 8 8 8
 0 0 0
  • POSCAR
system SiC
4.35
0.5 0.5 0.0
0.0 0.5 0.5
0.5 0.0 0.5
1 1
cart
0.00 0.00 0.00 
0.25 0.25 0.25

By default the dielectric tensor is calculation in the independent-particle (IP) approximation, see the lines following

HEAD OF MICROSCOPIC STATIC DIELECTRIC TENSOR (independent particle, excluding Hartree and local field effects)

in the OUTCAR, and including local field effects in DFT, see output after

MACROSCOPIC STATIC DIELECTRIC TENSOR (including local field effects in DFT)

If one adds

LRPA=.TRUE.

to the INCAR above, the second instance will include local field effect only with respect to the response in the Hartree part of the potential, i.e., in the random-phase-approximation (RPA). Search for

MACROSCOPIC STATIC DIELECTRIC TENSOR (including local field effects in RPA (Hartree))

in the OUTCAR.

  • The Born effective charge tensors ()

Roughly speaking, the Born effective tensors provide a measure of how much charge effectively moves with an atom when you displace it. For a definition see the article on Berry phases and finite electric fields. For LEPSILON=.TRUE., the Born effective charge tensors are written near the end of the OUTCAR file.

Look for

BORN EFFECTIVE CHARGES (in e, cummulative output)

Mind: you will find this entry only if LRPA=.FALSE. (default), since the Born-effective charges in the RPA tend to be nonsensical.

As an alternative to solving a linear Sternheimer equation (Eq. 32 of [1]), one may compute from finite differences by specifying

LPEAD=.TRUE.

in the INCAR file. The derivative of the cell-periodic part of the wave function w.r.t. the Bloch vector is then computed by means of a fourth-order finite difference stencil, in the spirit of Eqs. 96 and 97 of [2]. The results of the calculation of static dielectric properties by means of LEPSILON=.TRUE. tend to converge more rapidly w.r.t. k-point sampling with LPEAD=.TRUE.

Rerun the example with

# Static dielectric properties by means of DFPT
EDIFF = 1E-6
LEPSILON = .TRUE.
LPEAD = .TRUE.

ISMEAR =  0
SIGMA  =  0.01
GGA    = PE

This will allow for a clean comparison with the next topic.

Response to finite electric fields

The second way one may compute the static dielectric properties is from self-consistent response of the system to a finite electric field.[3]

  • INCAR
# Static dielectric properties by means of PEAD
EDIFF = 1E-8
LCALCEPS = .TRUE.
NELM = 100

ISMEAR =  0
SIGMA  =  0.01
GGA    = PE

Ionic contributions to the static dielectric properties

To obtain the ionic contributions to the static dielectric properties one needs to compute the force-constant matrices (Hessian of the total energy w.r.t. the ionic positions) and internal strain tensors (second derivative of the total energy w.r.t. strain fields and ionic postions). These properties may be obtained from finite differences (IBRION=5 or 6) or from perturbation theory (IBRION=7 or 8). Try the following

  • INCAR
# Static dielectric properties by means of DFPT
EDIFF = 1E-6
LEPSILON = .TRUE.
LPEAD = .TRUE.
IBRION = 8

ISMEAR =  0
SIGMA  =  0.01
GGA    = PE

and search for

MACROSCOPIC STATIC DIELECTRIC TENSOR IONIC CONTRIBUTION
ELASTIC MODULI IONIC CONTR (kBar)
PIEZOELECTRIC TENSOR IONIC CONTR  for field in x, y, z        (C/m^2)

in the OUTCAR file.

Frequency dependent dielectric response

Frequency dependent dielectric functions may be computed at various levels of approximation:

  1. in the independent-particle approximation
  2. including local field effects in the random-phase-approximation
  3. including local field effects in DFT

Whatever we may choose to do afterwards in terms of dielectric response calculations, we have to start with a standard DFT (or hybrid functional) calculation

  • INCAR
ISMEAR =  0
SIGMA  =  0.01
GGA    = PE
  • KPOINTS
6x6x6
 0
G
 6 6 6
 0 0 0

Mind: keep the WAVECAR file, you're going to need it in the following.

The independent-particle picture

To compute the frequency dependent dielectric function in the independent-particle (IP) picture we restart from the WAVECAR of the previous run, with the following INCAR

# Frequency dependent dielectric tensor without
# local field effects
ALGO = Exact
NBANDS  = 64
LOPTICS = .TRUE.
CSHIFT = 0.1    # this is the default
NEDOS = 2000

ISMEAR =  0
SIGMA  =  0.01
GGA    = PE

The frequency dependent dielectric functions is written to the OUTCAR file. Search for

 frequency dependent IMAGINARY DIELECTRIC FUNCTION (independent particle, no local field effects)

and

 frequency dependent      REAL DIELECTRIC FUNCTION (independent particle, no local field effects)

To visualize the real and imaginary parts of the frequency dependent dielectric function you may use p4vasp

p4v vasprun.xml

or run the following bash-script (plotoptics2)

awk 'BEGIN{i=1} /imag/,\
                /\/imag/ \
                 {a[i]=$2 ; b[i]=$3 ; i=i+1} \
     END{for (j=12;j<i-3;j++) print a[j],b[j]}' vasprun.xml > imag.dat

awk 'BEGIN{i=1} /real/,\
                /\/real/ \
                 {a[i]=$2 ; b[i]=$3 ; i=i+1} \
     END{for (j=12;j<i-3;j++) print a[j],b[j]}' vasprun.xml > real.dat

cat >plotfile<<!
# set term postscript enhanced eps colour lw 2 "Helvetica" 20
# set output "optics.eps"
plot [0:25] "imag.dat" using (\$1):(\$2) w lp, "real.dat" using (\$1):(\$2) w lp
!

gnuplot -persist plotfile

As an alternative to the perturbative expression (Eq. 31 of [1]), one may compute from finite differences by specifying

LPEAD=.TRUE.

in the INCAR file. The derivative of the cell-periodic part of the wave function w.r.t. the Bloch vector is then computed by means of a fourth-order finite difference stencil, in the spirit of Eqs. 96 and 97 of [2].

Mind: keep the WAVECAR and WAVEDER files, you're going to need them in the following. You might also want to keep a copy of the vasprun.xml.

cp vasprun.xml vasprun_loptics.xml

Including local field effects

To determine the frequency dependent dielectric function including local field effects one needs the WAVECAR and WAVEDER files from the previous calculation (ALGO=Exact and LOPTICS=.TRUE., and sufficient virtual orbitals), and

  • INCAR
# Frequency dependent dielectric tensor with and
# without local field effects in RPA and due to
# changes in the DFT xc-potential
# N.B.: beware one first has to have done a
# calculation with ALGO=Exact and LOPTICS=.TRUE.
ALGO = CHI ; LSPECTRAL = .FALSE.

# be sure to take the same number of bands as for
# the LOPTICS=.TRUE. calculation, otherwise the
# WAVEDER file is not read correctly
NBANDS = 64

ISMEAR =  0
SIGMA  =  0.01
GGA    = PE

Information concerning the dielectric function in the independent-particle picture is written after the line

HEAD OF MICROSCOPIC DIELECTRIC TENSOR (INDEPENDENT PARTICLE)

in the OUTCAR file.

Per default, for ALGO=CHI, local field effects are included at the level of the RPA (LRPA=.TRUE.), i.e., limited to Hartree contributions only.

See the information after

INVERSE MACROSCOPIC DIELECTRIC TENSOR (including local field effects in RPA (Hartree))

in the OUTCAR file.

To include local field effects beyond the RPA, i.e., contributions from DFT exchange and correlation, one has to specify

LRPA=.FALSE.

in the INCAR file.

In this case look at the output after

INVERSE MACROSCOPIC DIELECTRIC TENSOR (test charge-test charge, local field effects in DFT)

in the OUTCAR file.

The following bash-script (plotchi) uses awk to extract the frequency dependent dielectric constant, both in the independent-particle picture as well as including local field effects (either in DFT or in the RPA) and plots the real and imaginary components using gnuplot.

awk 'BEGIN{i=1} /HEAD OF MICRO/,\
                /XI_LOCAL/ \
                 {if ($4=="dielectric") {a[i]=$1 ; b[i]=$2 ; c[i]=$3 ; i=i+1}} \
     END{for (j=1;j<i;j++) print a[j],b[j],c[j]}' OUTCAR > chi0.dat

awk 'BEGIN{i=1} /INVERSE MACRO/,\
                /XI_TO_W/ \
                 {if ($4=="dielectric") {a[i]=$1 ; b[i]=$2 ; c[i]=$3 ; i=i+1}} \
     END{for (j=1;j<i;j++) print a[j],b[j],c[j]}' OUTCAR > chi.dat

cat >plotfile<<!
# set term postscript enhanced eps colour lw 2 "Helvetica" 20
# set output "optics.eps"

plot "chi0.dat" using (\$1):(\$2)  w lp lt -1 lw 2 pt 4 title "chi0 real", \
     "chi0.dat" using (\$1):(-\$3) w lp lt  0 lw 2 pt 4 title "chi0 imag", \
     "chi.dat"  using (\$1):(\$2)  w lp lt  1 lw 2 pt 2 title "chi  real", \
     "chi.dat"  using (\$1):(-\$3) w lp lt  0 lw 2 pt 2 lc 1 title "chi  imag"
!

gnuplot -persist plotfile

If you have kept a copy of the vasprun.xml of the LOPTICS=.TRUE. run (e.g., vasprun_loptics.xml), you might execute plotall to compare the dielectric functions computed with LOPTICS=.TRUE. and ALGO=CHI.

vasprun_LOPTICS=vasprun_loptics.xml
OUTCAR_CHI=OUTCAR

awk 'BEGIN{i=1} /imag/,\
                /\/imag/ \
                 {a[i]=$2 ; b[i]=$3 ; i=i+1} \
     END{for (j=12;j<i-3;j++) print a[j],b[j]}' $vasprun_LOPTICS > imag.dat

awk 'BEGIN{i=1} /real/,\
                /\/real/ \
                 {a[i]=$2 ; b[i]=$3 ; i=i+1} \
     END{for (j=12;j<i-3;j++) print a[j],b[j]}' $vasprun_LOPTICS > real.dat

awk 'BEGIN{i=1} /HEAD OF MICRO/,\
                /XI_LOCAL/ \
                 {if ($4=="dielectric") {a[i]=$1 ; b[i]=$2 ; c[i]=$3 ; i=i+1}} \
     END{for (j=1;j<i;j++) print a[j],b[j],c[j]}' $OUTCAR_CHI > chi0.dat

awk 'BEGIN{i=1} /INVERSE MACRO/,\
                /XI_TO_W/ \
                 {if ($4=="dielectric") {a[i]=$1 ; b[i]=$2 ; c[i]=$3 ; i=i+1}} \
     END{for (j=1;j<i;j++) print a[j],b[j],c[j]}' $OUTCAR_CHI > chi.dat

cat >plotfile<<!
# set term postscript enhanced eps colour lw 2 "Helvetica" 20
# set output "optics.eps"

plot "chi0.dat" using (\$1):(\$2)  w lp lt -1 lw 2 pt 4 title "chi0 real", \
     "chi0.dat" using (\$1):(-\$3) w lp lt  0 lw 2 pt 4 title "chi0 imag", \
     "chi.dat"  using (\$1):(\$2)  w lp lt  1 lw 2 pt 2 title "chi  real", \
     "chi.dat"  using (\$1):(-\$3) w lp lt  0 lw 2 pt 2 lc 1 title "chi  imag", \
     "real.dat"  using (\$1):(\$2) w l lt -1  title "optics  real", \
     "imag.dat"  using (\$1):(-\$2) w l lt  0 lc -1 title "optics  imag"
!

gnuplot -persist plotfile

Why are the dielectric functions in independent-particle picture from the LOPTICS=.TRUE. and the ALGO=CHI calculations different? What CSHIFT is used in the latter? Try redoing the LOPTICS=.TRUE. calculation with the same CSHIFT as VASP chose for the ALGO=CHI calculation:

CSHIFT=0.464

and compare the dielectric functions again.

Download

SiC_dielectric.tgz

References


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