JVASP-10493_Li3AsO4

Quick Links: Convergence
Structure
Electronic
Potential
Optics
Optics(MBJ)
SLME
Elastic
DFPT
Thermoelectric
Magnetic
See also

JARVIS-ID:JVASP-10493	Functional:optB88-vdW	Primitive cell	Primitive cell	Conventional cell	Conventional cell
Chemical formula:Li3AsO4	Formation energy/atom (eV):-2.068	a 4.979 Å	α:90.0 °	a 4.979 Å	α:90.0 °
Space-group :Pmn2_1, 31	Relaxed energy/atom (eV):-4.4032	b 5.396 Å	β:90.0 °	b 5.396 Å	β:90.0 °
Calculation type:Bulk	SCF bandgap (eV):4.384	c 6.279 Å	γ:90.0 °	c 6.279 Å	γ:90.0 °
Crystal system:orthorhombic	Point group:mm2	Density (gcm^-3):3.15	Volume (Å³):168.68	nAtoms_prim:16	nAtoms_conv:16

Download input files

Convergence [Reference]

Calculations are done using VASP software [Source-code]. Convergence on KPOINTS [Source-code] and ENCUT [Source-code] is done with respect to total energy of the system within 0.001 eV tolerance. Please note convergence on KPOINTS and ENCUT is generally done for target properties, but here we assume energy-convergence with 0.001 eV should be sufficient for other properties also. The points on the curves are obtained with single-point calculation (number of ionic steps, NSW=1 ). However, for very accurate calculations, NSW>1 might be needed.

Structural analysis [Reference]

The following shows the X-ray diffraction (XRD)[Source-code] pattern and the Radial distribution function (RDF) plots [Source-code]. XRD peaks should be comparable to experiments for bulk structures. Relative intensities may differ. For mono- and multi-layer structures , we take the z-dimension during DFT calculation for XRD calculations, which may differ from the experimental set-up.

Electronic structure [Reference]

The following shows the electronic density of states and bandstructure [Source-code]. DFT is generally predicted to underestimate bandgap of materials. Accurate band-gaps are obtained with higher level methods (with high computational requirement) such as HSE, GW , which are under progress. If available, MBJ data should be comparable to experiments also. Total DOS, Orbital DOS and Element dos [Source-code] buttons are provided for density of states options. Energy is rescaled to make Fermi-energy zero. In the bandstructure plot [Source-code], spin up is shown with blue lines while spin down are shown with red lines. Non-degenerate spin-up and spin-down states (if applicable) would imply a net orbital magnetic moment in the system. Fermi-occupation tolerance for bandgap calculation is chosen as 0.001.

High-symmetry kpoints based bandgap (eV): 4.369I

Electrostatic potential [Reference]

The following plot shows the plane averaged electrostatic potential (ionic+Hartree) along x, y and z-directions. The red line shows the Fermi-energy while the green line shows the maximum value of the electrostatic potential. For slab structures (with vacuum along z-direction), the difference in these two values can be used to calculate work-function of the material.

Optoelectronic properties Semi-local [Reference]

Incident photon energy dependence of optical is shown below [Source-code]. Only interband optical transitions are taken into account.Please note the underestimatation of band-gap problem with DFT will reflect in the spectra as well. For very accurate optical properties GW/BSE calculation would be needed, which is yet to be done because of their very high computational cost. Optical properties for mono-/multi-layer materials were rescaled with the actual thickness to simulation z-box ratio. Absorption coeffiecient is in cm-1 unit. Also, ionic contributions were neglected.

Dense k-mesh based bandgap is : 4.3839 eV

Static real-parts of dielectric function in x,y,z: 3.09,3.08,3.06

Optoelectronic properties METAGGA-MBJ [Reference]

Single point DFT calculation was carried out with meta-gga MBJ potential [Source-code]. This should give reasonable bandgap, and optical properties assuming the calculation was properly converged. Incident photon energy dependence of optical is shown below. Only interband optical transitions are taken into account. Also, ionic contributions were neglected.

MBJ bandgap is : 3.3862 eV

Static real-parts of dielectric function in x,y,z: 3.88,3.97,4.09

Solar-cell SLME [Reference]

Theoretical solar-cell efficiency (in %) was calculated using spectroscopy limited maximum efficiency (SLME) and TBmBJ for the material with 500 nm thickness and at 300 K. Note that generally there are many factors that contribute towards the efficiency, such as carrier effective mass etc.

SLME is: 1.61

DFPT: IR-intensity, Piezoelecric and Dielectric tensors [Reference]

Calculations are done using density functional perturbation theory (DFPT) method for non-metallic systems for conventional cell and at Gamma-point in phonon BZ.

Static dielecric-tensor

6.08	0.0	0.0
0.0	5.41	0.0
0.0	0.0	5.53

Piezoelectric-stress-tensor (C/m²)

-0.66	0.31	0.32	0.0	0.0
-0.0	0.0	0.0	0.21	0.0
-0.0	0.0	-0.0	0.0	0.21

Finite-difference: elastic tensor and derived phonon properties [Reference]

Elastic tensor calculated for the conventional cell of the system with finite-difference method [Source-code]. For bulk structures, elastic constants are given in GPa unit . For layered materials, the elastic constants are rescaled with respect to vacuum padding (see the input files) and the units for elastic coefficients are in N/m . Phonons obtained [Source-code] from this calculation are also shown.

WARNING: Please note we provide finite-size cell phonons only. At least 1.2 nm x1.2 nm x1.2 nm size cell or more is generally needed for obtaining reliable phonon spectrum, but we take conventional cell of the structure only. For systems having primitive-cell phonon representation tables, I denotes infrared activity and R denotes Raman active modes (where applicabale). Selection of particular q-point mesh can give rise to unphysical negative modes in phonon density of states and phonon bandstructre. The minimum thermal conductivity was calculated using elastic tensor information following Clarke and Cahill formalism.

Voigt-bulk modulus (K_V): 69.7 GPa, Voigt-shear modulus (G_V): 39.6 GPa

Reuss-bulk modulus (K_R): 69.6 GPa, Reuss-shear modulus (G_R): 39.18 GPa

Poisson's ratio: 0.26, Elastic anisotropy parameter: 0.06

Clarke's lower limit of thermal conductivity (W/(m.K)): 1.4

Cahill's lower limit of thermal conductivity (W/(m.K)): 1.54

Elastic tensor

127.3	36.3	38.2	0.0	0.0	0.0
36.3	124.3	51.0	-0.0	0.0	0.0
38.2	51.0	124.7	-0.0	-0.0	-0.0
0.0	0.0	-0.0	34.8	-0.0	-0.0
0.0	0.0	0.0	-0.0	38.7	-0.0
0.0	-0.0	-0.0	-0.0	-0.0	40.9

Phonon mode (cm^-1)
-0.06
-0.03
-0.02
129.31
140.96
152.96
186.86
222.19
248.27
248.37
252.03
293.17
298.79
329.13
331.22
332.11
344.09
355.25
369.26
370.98
382.21
398.77
409.52
418.82
420.53
428.49
429.01
434.83
440.82
455.98
456.16
466.66
470.29
472.29
478.86
490.79
503.94
515.68
519.05
523.2
753.9
757.7
763.09
766.59
767.88
778.99
782.76
784.48

Point group

point_group_type: mm2

Visualize Phonons here

Phonon mode (cm^-1)	Representation
-0.06
-0.0596732368
-0.03
-0.0303417299
-0.02
-0.0228889295
129.31
129.314343432
140.96
140.96395143
152.96
152.9614824
186.86
186.859155029
222.19
222.19410002
248.27
248.274158123
248.37
248.370635558
252.03
252.032818082
293.17
293.171698507
298.79
298.79343524
329.13
329.133951904
331.22
331.223029512
332.11
332.108708077
344.09
344.089862895
355.25
355.251864935
369.26
369.258837636
370.98
370.979545282
382.21
382.213237763
398.77
398.771890359
409.52
409.520820239
418.82
418.816966943
420.53
420.532623921
428.49
428.494039231
429.01
429.010013568
434.83
434.830172076
440.82
440.82260023
455.98
455.980292931
456.16
456.163867996
466.66
466.655766764
470.29
470.288147471
472.29
472.29046812
478.86
478.855595492
490.79
490.794192246
503.94
503.943612833
515.68
515.684700117
519.05
519.050916871
523.2
523.198316787
753.9
753.895830425
757.7
757.700250262
763.09
763.090678314
766.59
766.590555073
767.88
767.878694423
778.99
778.992787564
782.76
782.764344527
784.48
784.477216638

Thermoelectric properties [Reference]

Thermoelectric properties are calculated using BoltzTrap code [Source-code]. Electron and hole mass tensors (useful for semiconductors and insulators mainly)are given at 300 K [Source-code]. Following plots show the Seebeck coefficient and ZT factor (eigenvalues of the tensor shown) at 300 K along three different crystallographic directions. Seebeck coefficient and ZT plots can be compared for three different temperatures available through the buttons given below. Generally very high Kpoints are needed for obtaining thermoelectric properties. We assume the Kpoints obtained from above convergence were sufficient [Source-code].

WARNING: Constant relaxation time approximation (10^-14 s) and only electronic contribution to thermal conductivity were utilized for calculating ZT.

Electron mass tensor (m_e unit)


0.7	-0.0	0.0
-0.0	0.79	0.0
0.0	0.0	0.9

Hole mass tensor (m_e unit)

6.36	0.0	0.0
0.0	5.31	0.0
0.0	0.0	3.71

n-& p-type Seebeck coeff. (µV/K), power-factor (µW/(mK²)), conductivity (1/(Ω*m)), zT (assuming lattice part of thermal conductivity as 1 W/(mK)) at 600K and 10²⁰ cm^-3 doping. For mono/multi-layer materials consider Seebeck-coeff only.)

Property	xx	yy	zz
n-Seebeck	-172.12	-161.09	-160.29
n-PowerFactor	921.07	1009.88	1081.36
n-Conductivity	35496.38	36502.57	39307.62
n-ZT	0.39	0.42	0.45
p-Seebeck	413.41	421.25	442.92
p-PowerFactor	312.15	361.04	541.13
p-Conductivity	1826.42	1840.37	3049.42
p-ZT	0.18	0.21	0.32

Magnetic moment [Reference]

The orbital magnetic moment was obtained after SCF run. This is not a DFT+U calculation, hence the data could be used to predict zero or non-zero magnetic moment nature of the material only.

Total magnetic moment: -0.0 μ_B

Magnetic moment per atom: -0.0 μ_B

Magnetization

Elements	s	p	d	tot
Li	-0.0	0.0	0.0	0.0
Li	0.0	0.0	0.0	0.0
Li	-0.0	0.0	0.0	0.0
Li	-0.0	0.0	0.0	0.0
Li	-0.0	0.0	0.0	0.0
Li	-0.0	0.0	0.0	0.0
As	0.0	0.0	0.0	0.0
As	0.0	0.0	0.0	0.0
O	0.0	-0.0	0.0	-0.0
O	-0.0	-0.0	0.0	-0.0
O	-0.0	-0.0	0.0	-0.0
O	-0.0	-0.0	0.0	-0.0
O	-0.0	-0.0	0.0	-0.0
O	-0.0	-0.0	0.0	-0.0
O	-0.0	-0.0	0.0	-0.0
O	-0.0	-0.0	0.0	-0.0