Unveiling defect physics in gapped metals: a theoretical investigation into defect formation and electronic structure interplay

Harshan Reddy Gopidi; Lovelesh Vashist; Oleksandr I. Malyi

doi:10.20517/jmi.2024.41

Journal of Materials Informatics ›› 2025, Vol. 5 ›› Issue (2) :19 DOI: 10.20517/jmi.2024.41

Research Article

Unveiling defect physics in gapped metals: a theoretical investigation into defect formation and electronic structure interplay

Author information +

History +

PDF

Abstract

In materials science, point defects play a crucial role in materials properties. This is particularly well known for the wide band gap insulators where the defect formation/compensation determines the equilibrium Fermi level and generally the doping response of a given material. Similarly, the main defect trends are also widely understood for regular metals (e.g., Cu and Zn discussed herein). With the development of electronic structure theory, a unique class of quantum materials - gapped metals (e.g., Ca₆Al₇O₁₆, SrNbO₃, In₁₅SnO₂₄, and CaN₂) that exhibit characteristics of both metals and insulators - has been identified. While these materials have internal band gaps similar to insulators, their Fermi level is within one of the main band edges, giving a large intrinsic free carrier concentration. Such unique electronic structures give rise to unusual defect physics, e.g., when the acceptor defect formation in n-type gapped metal results in the decay of the conducting electron to the acceptor states. In concentration limits, such electron-hole recombination can compensate for the energy needed to break chemical bonds and form acceptor vacancy, often leading to off-stoichiometric compounds. Such unusual physics, however, makes these quantum materials distinct from traditional compounds. Motivated by this, herein, we establish a minimal level of theory needed to account for the complex interplay between electronic structure and analyzing defects in gapped metals that can be utilized for their design in different practical applications.

Keywords

Materials science / gapped metals / defects / electronic structure theory

Cite this article

Download citation ▾

Harshan Reddy Gopidi, Lovelesh Vashist, Oleksandr I. Malyi. Unveiling defect physics in gapped metals: a theoretical investigation into defect formation and electronic structure interplay. Journal of Materials Informatics, 2025, 5(2): 19 DOI:10.20517/jmi.2024.41

登录浏览全文

4963

注册一个新账户忘记密码

References

Publishing order | Descend order by publishing year | Descend order by cited within

[1]

Kittel, C. In Kittel's Introduction to Solid State Physics, Global Edition, 8th ed.; Introduction to solid state physics; John Wiley & Sons, 2021. pp 1-24. Available from: https://www.wiley.com/en-ie/Kittel’s+Introduction+to+Solid+State+Physics%2C+Global+Edition%2C+8th+Edition-p-9781119454168 (accessed 2025-02-25).

[2]	Crawford, J.H.; Slifkin, L.M. Point Defects in Solids: General and Ionic Crystals; Springer US, 2013.

[3]	Mosquera-Lois I,Klarbring J,Walsh A.Imperfections are not 0 K: free energy of point defects in crystals.Chem Soc Rev2023;52:5812-26

[4]	Walsh A.Instilling defect tolerance in new compounds.Nat Mater2017;Online ahead of print

[5]	Buckeridge J.Equilibrium point defect and charge carrier concentrations in a material determined through calculation of the self-consistent Fermi energy.Comput Phys Commun2019;244:329-42

[6]	Zunger A.Understanding doping of quantum materials.Chem Rev2021;121:3031-60

[7]	Goyal A,Toberer ES.First-principles calculation of intrinsic defect chemistry and self-doping in PbTe.npj Comput Mater2017;3:47

[8]	Broberg D,Srivastava S.High-throughput calculations of charged point defect properties with semi-local density functional theory - performance benchmarks for materials screening applications.npj Comput Mater2023;9:1015

[9]	Van de Walle, C.G.; Neugebauer, J. First-principles calculations for defects and impurities: applications to III-nitrides.J Appl Phys2004;95:3851-79

[10]	Freysoldt C,Hickel T.First-principles calculations for point defects in solids.Rev Mod Phys2014;86:253-305

[11]	Zunger A.Practical doping principles.Appl Phys Lett2003;83:57-9

[12]	Liu Q,Zunger A.Antidoping in insulators and semiconductors having intermediate bands with trapped carriers.Phys Rev Lett2019;122:106403

[13]	Zhang S,Zunger A.Overcoming doping bottlenecks in semiconductors and wide-gap materials.Physica B1999;273-274:976-80

[14]	Kılıç Ç.n -type doping of oxides by hydrogen.Appl Phys Lett2002;81:73-5

[15]	Van de Walle, C.G.; Neugebauer, J. Universal alignment of hydrogen levels in semiconductors, insulators and solutions.Nature2003;423:626-8

[16]	Yu YG,Zunger A.Natural off-stoichiometry causes carrier doping in half-Heusler filled tetrahedral structures.Phys Rev B2017;95:085201

[17]	Alkauskas A,Van de Walle CG.Tutorial: defects in semiconductors - combining experiment and theory.J Appl Phys2016;119:181101

[18]	Vashist L,Khan MR.Noble gas functional defect with unusual relaxation pattern in solids.J Phys Chem Lett2023;14:9090-5

[19]	Choi J,Lee S.First-principles study on the formation of a vacancy in Ge under biaxial compressive strain.Thin Solid Films2010;518:6373-7

[20]	Komsa H,Pasquarello A.Finite-size supercell correction schemes for charged defect calculations.Phys Rev B2012;86:045112

[21]	Freysoldt C,Van de Walle CG.Electrostatic interactions between charged defects in supercells.Phys Status Solidi (b)2011;248:1067-76

[22]	Freysoldt C,Van de Walle CG.Fully ab initio finite-size corrections for charged-defect supercell calculations.Phys Rev Lett2009;102:016402

[23]	Makov G.Periodic boundary conditions in ab initio calculations.Phys Rev B Condens Matter1995;51:4014-22

[24]	Gopidi HR,Malyi OI.Physics of band-filling correction in defect calculations of solid-state materials.RSC Adv2024;14:17675-83 PMCID:PMC11148636

[25]	Sopiha KV,Persson C.Chemistry of oxygen ionosorption on SnO₂ surfaces.ACS Appl Mater Interfaces2021;13:33664-76 PMCID:PMC8397246

[26]	Lany S.Assessment of correction methods for the band-gap problem and for finite-size effects in supercell defect calculations: case studies for ZnO and GaAs.Phys Rev B2008;78:235104

[27]	Castleton CWM.Finite-size scaling as a cure for supercell approximation errors in calculations of neutral native defects in InP.Phys Rev B2004;70:195202

[28]	Muy S,Marzari N.AiiDA-defects: an automated and fully reproducible workflow for the complete characterization of defect chemistry in functional materials.Electron Struct2023;5:024009

[29]	Goyal A,Peng H,Stevanović V.A computational framework for automation of point defect calculations.Comput Mater Sci2017;130:1-9

[30]	Broberg D,Zimmermann NE.PyCDT: A Python toolkit for modeling point defects in semiconductors and insulators.Comput Phys Commun2018;226:165-79

[31]	Xiao J,Guo D.Realistic dimension-independent approach for charged-defect calculations in semiconductors.Phys Rev B2020;101:165306

[32]	Chen W.First-principles determination of defect energy levels through hybrid density functionals and GW.J Phys Condens Matter2015;27:133202

[33]	Janotti A.Oxygen vacancies in ZnO.Appl Phys Lett2005;87:122102

[34]	Thiering G.Ab Initio magneto-optical spectrum of group-IV vacancy color centers in diamond.Phys Rev X2018;8:021063

[35]	Li S,Hu A.Giant shift upon strain on the fluorescence spectrum of V_NN_B color centers in h-BN.npj Quantum Inf2020;6:312

[36]	Abdi M,Gali A.Color centers in hexagonal boron nitride monolayers: a group theory and Ab initio analysis.ACS Photonics2018;5:1967-76

[37]	Alkauskas A,Pasquarello A.Defect energy levels in density functional calculations: alignment and band gap problem.Phys Rev Lett2008;101:046405

[38]	Malyi OI,Poeppelmeier KR,Zunger A.Spontaneous non-stoichiometry and ordering in degenerate but gapped transparent conductors.Matter2019;1:280-94

[39]	Xu X,Efstathiou P.A red metallic oxide photocatalyst.Nat Mater2012;11:595-8

[40]	Cheikh D,Vo T.Praseodymium telluride: a high-temperature, high-ZT thermoelectric material.Joule2018;2:698-709

[41]	Dismukes JP.The preparation, properties, and crystal structures of some scandium sulfides in the range Sc₂S₃-ScS.Inorg Chem1964;3:1220-8

[42]	Male JP,Wood M,Snyder GJ.Using vacancies to tune mechanical and elastic properties in La_3−xTe₄, Nd_3−xTe₄, and Pr_3−xTe₄ rare earth telluride thermoelectric materials.Mater Today Phys2023;32:101016

[43]	Wickramaratne D,Monserrat B.Defect identification based on first-principles calculations for deep level transient spectroscopy.Appl Phys Lett2018;113:192106

[44]	Castelletto S,Ivády V.A silicon carbide room-temperature single-photon source.Nat Mater2014;13:151-6

[45]	Kresse G.Ab initio molecular dynamics for liquid metals.Phys Rev B Condens Matter1993;47:558-61

[46]	Kresse G.Ab initio molecular-dynamics simulation of the liquid-metal-amorphous-semiconductor transition in germanium.Phys Rev B Condens Matter1994;49:14251-69

[47]	Kresse G.Efficiency of ab-initio total energy calculations for metals and semiconductors using a plane-wave basis set.Comput Mater Sci1996;6:15-50

[48]	Kresse G.Efficient iterative schemes for ab initio total-energy calculations using a plane-wave basis set.Phys Rev B Condens Matter1996;54:11169-86

[49]	Perdew JP,Ernzerhof M.Generalized gradient approximation made simple.Phys Rev Lett1996;77:3865-8

[50]	Ong SP,Jain A.Python materials genomics (pymatgen): a robust, open-source python library for materials analysis.Comput Mater Sci2013;68:314-9

[51]	Momma K.VESTA 3 for three-dimensional visualization of crystal, volumetric and morphology data.J Appl Cryst2011;44:1272-6

[52]	Bragg WL.XLII.The crystalline structure of copper28:355-60

[53]	Hull AW.Graphical determination of hexagonal and tetragonal crystal structures from X-ray data.Phys Rev1921;17:549-70

[54]	Hannerz H,Istomin S.Transmission electron microscopy and neutron powder diffraction studies of GdFeO₃ type SrNbO₃.J Solid State Chem1999;147:421-8

[55]	Matsuishi S,Hirano M,Shamoto S.Direct synthesis of powdery inorganic electride [Ca₂₄Al₂₈O₆₄]⁴⁺(e^-)₄ and determination of oxygen stoichiometry.Chem Mater2009;21:2589-91

[56]	Schneider SB,Schnick W.Synthesis of alkaline earth diazenides M_AEN₂ (M_AE = Ca, Sr, Ba) by controlled thermal decomposition of azides under high pressure.Inorg Chem2012;51:2366-73

[57]	Odaka HO, Yuzo Shigesato YS, Takashi Murakami TM, Shuichi Iwata SI. Electronic structure analyses of Sn-doped In₂O₃.Jpn J Appl Phys2001;40:3231

[58]	Setyawan W.High-throughput electronic band structure calculations: challenges and tools.Comput Mater Sci2010;49:299-312

[59]	Chan MK.Efficient band gap prediction for solids.Phys Rev Lett2010;105:196403

[60]	He J,Wolverton C.Assessment of exchange-correlation functionals on oxygen vacancy formation energies of metal oxides.Phys Rev B2023;108:104103

[61]	Nazarov R,Neugebauer J.Vacancy formation energies in fcc metals: influence of exchange-correlation functionals and correction schemes.Phys Rev B2012;85:144118

[62]	Jain A,Hautier G.Commentary: the materials project: a materials genome approach to accelerating materials innovation.APL Materials2013;1:011002

[63]	Zhang X,Perkins JD.Intrinsic transparent conductors without doping.Phys Rev Lett2015;115:176602

[64]	Ricci F,Jain A,Hautier G.Gapped metals as thermoelectric materials revealed by high-throughput screening.J Mater Chem A2020;8:17579-94

[65]	Burton LA,Chen W,Hautier G.High-throughput identification of electrides from all known inorganic materials.Chem Mater2018;30:7521-6

[66]	Kim SW,Hosono H.Solvated electrons in high-temperature melts and glasses of the room-temperature stable electride [Ca₂₄Al₂₈O₆₄]⁴⁺·4e^-.Science2011;333:71-4

[67]	Matsuishi S,Miyakawa M.High-density electron anions in a nanoporous single crystal: [Ca₂₄Al₂₈O₆₄]⁴⁺(4e^-).Science2003;301:626-9

[68]	Hosono H.Advances in materials and applications of inorganic electrides.Chem Rev2021;121:3121-85

[69]	Li G,Wood M.Mechanical properties of thermoelectric lanthanum telluride from quantum mechanics.J Phys D: Appl Phys2017;50:274002

[70]	Hu X,Li Z.High-throughput search for lossless metals.Phys Rev Mater2022;6:065203

[71]	Khan MR,Malyi OI.Optical properties and electronic structures of intrinsic gapped metals: inverse materials design principles for transparent conductors.Appl Phys Lett2023;123:061101

[72]	Zhang L,Guo L.Correlated metals as transparent conductors.Nat Mater2016;15:204-10

[73]	Walsh A,Buckeridge J,Catlow CRA.Oxidation states and ionicity.Nat Mater2018;17:958-64

[74]	Walsh A,Buckeridge J,Catlow CRA.Electron counting in solids: oxidation states, partial charges, and ionicity.J Phys Chem Lett2017;8:2074-5

[75]	Malyi OI,Zhao X-G,Zunger A.Realization of predicted exotic materials: the burden of proof.Mater Today2020;32:35-45

[76]	Malyi OI.False metals, real insulators, and degenerate gapped metals.Appl Phys Rev2020;7:041310

[77]	Khan MR,Wlazło M.Fermi-level instability as a way to tailor the properties of La₃Te₄.J Phys Chem Lett2023;14:1962-7

[78]	Hart GL.Origins of nonstoichiometry and vacancy ordering in Sc_1-x□_xS.Phys Rev Lett2001;87:275508

[79]	Li B,Corbett JD.Valence compounds versus metals. Synthesis, characterization, and electronic structures of cubic Ae₄Pn₃ phases in the systems Ae = Ca, Sr, Ba, Eu; Pn = As, Sb, Bi.Inorg Chem2003;42:6940-5