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Comprehensive Summaries of Uppsala Dissertations from the Faculty of Science and Technology 982 Materials Design from ab initio Calculations BY SA LI ACTA UNIVERSITATIS UPSALIENSIS UPPSALA 2004 ! ""# $"%"" & & & ' ( ) *' +' ""#' & , ' ' -. ' !! ' ' /+01 -$233#23-4!23 ( & 5 & 67(8' , & & 3&2 09: 5 09# ' && 6 8 ' & ; & & ' & & ,/$2< + ) =" "' 3 "'3 $'" ) & ,!" 9# >299?' ( && & &&' && & & ' , ) & && ' ( & & 1@$;1 6;8 ) 1 = $ : 2 6 /// /A8 ; , B 1' ( & ' ( & )' ( 5 ; ) & ) ' 9 )5 & & ; ' ) ; 2(#+,: C ' +& & & 6"""$8 & & (2+2, ' ( ) & ; ' 7( ; 9 *9+ !" # " $% &'(" " )*+&,-, " D + ""# /++1 $$"#2 : ; /+01 -$233#23-4!23 %%%% 2# 4# 6%BB'5'BE=%%%% 2# 4#8 Printed in Sweden by Universitetstryckeriet, Uppsala 2004 To my family Front page illustration The electronic charge density distribution for the -AlOOH phase in the (001) plane. List of Publications I S. Li, R. Ahuja, and B. Johansson Pressure-induced phase transitions of KNbO 3 J. Phys. C 14, 10873 (2002) II Sa Li, R. Ahuja, and B. Johansson High pressure theoretical studies of actinide dioxides High Pressure Research 22, 471 (2002) III J. K. Dewhurst, R. Ahuja, S. Li, and B. Johansson Lattice Dynamics of Solid Xenon under Pressure Phys. Rev. Lett. 88, 075504 (2002) IV B. Holm, R. Ahuja, S. Li, and B. Johansson Theory of the ternary layered system Ti-Al-N J. of Appl. Phys. 91, 9874 (2002) V H.W.Hugosson, G.E.Grechnev, R.Ahuja, U.Helmersson, L.Sa, and O.Eriksson Stabilization of potential superhard RuO 2 phases: A theoretical study Phys. Rev. B 66, 174111 (2002) VI Z. M. Sun, R. Ahuja, S. Li, and J. M. Schneider Structure and bulk modulus of M2 AlC Appl. Phys. Lett. 83, 899 (2003) VII S. Li, R. Ahuja and Y. Wang, and B. Johansson Crystallographic structures of PbWO 4 High Pressure Research 23, 343 (2003) VIII Z. M. Sun, S. Li, R. Ahuja, and J. M. Schneider Calculated elastic properties of M2 AlC Solid State Commun. 129, 589 (2004) IX A. B. Belonoshko, S. Li, R. Ahuja, and B. Johansson High-pressure crystal structure studies of Fe, Ru and Os J. Phys. Chem. Sol. (In press) X S. Li, R. Ahuja, and B. Johansson Wolframite: the post-fergusonite phase in YLiF 4 J. Phys. C 16, 983 (2004) XI S. Li, R. Ahuja, and B. Johansson The Elastic and Optical Properties of the High-Pressure Hydrous Phase δ-AlOOH Submitted to Phys. Rev. B XII J. -P. Palmquist, S. Li, P. O. A. Persson, J. Emmerlich, O. Wilhelmsson, H. Högberg, M. I. Katsnelson, B. Johansson, R. Ahuja, O. Eriksson, L. Hultman, and U. Jansson New MAX Phases in the Ti-Si-C System Studied by Thin Film Synthesis and ab initio Calculations Submitted to Phys. Rev. B XIII P. Finkel, J. D. Hettinger, S. E. Lofland, K. Harrell, A. Ganguly, M. W. Barsoum, Z. sun, S. Li, and R. Ahuja Low Temperature Elastic, Electronic and Transport Properties of Ti3 Six Ge1−x C2 Solid Soutions Submitted to Phys. Rev. B XIV M. Magnuson, J. -P. Palmquist, M. Mattesini, S. Li, R. Ahuja, O. Eriksson, J.Emmerlich, O. Wilhelmsson, P. Eklund, H. Högberg, L. Hultman, and U. Jansson Electronic structure of the MAX-phases Ti 3 AC2 (A=Al, Si, Ge) investigated by soft X-ray absorption and emission spectroscopies Submitted to Phys. Rev. B XV Z. M. Sun, D. Music, R. Ahuja, S. Li, and J. M. Schneider Bonding and classification of nanolayered ternary carbides Submitted to Phys. Rev. B XVI R. Ahuja, H. W. Hugosson, S. Li, B. Johansson, and O. Eriksson Electronic structure and optical properties of C 60 Submitted to Phys. Rev. B XVII R. Ahuja, L. M. Huang, S. Li, and Y. Wang High pressure structural phase transition in Zircon (ZrSiO4 ) Submitted to Phys. Rev. B XVIII A. Grechnev, S. Li, R. Ahuja, O. Eriksson, and O. Jansson A possible MAX new phase, Nb3 SiC2 , predicted from First Principles Theory Submitted to Appl. Phys. Lett. XIX S. Li, H. Pettersson, C. G. Ribbing, B. Johansson, M. W. Barsoum, and R. Ahuja Optical properties of Ti3 SiC2 and Ti4 AlN3 In manuscript Comments on my contribution to the papers For those papers I, II, VII, X, XI and XIX, I’m the first author of, I took the major responsibilities in calculation design and their execution, as well as paper drafting. For papers IX and XIV, I have performed calculations and contributed to the paper writings. In the experimental paper XII, I have carried out calculations and written up the theoretical parts of the publication. As regards paper III, IV, V, VI, VIII, IX, XIII, XV, XVI, XVII and XVIII, I have contributed either with ideas or calculations and result analysis. Contents 1 Introduction 2 Many body problem 2.1 Introduction . . . . . . . . . 2.2 The Hartree approximation 2.3 Hartree-Fock approximation 2.4 Density functional theory . 3 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 5 5 6 7 7 3 Computational methods 3.1 Introduction . . . . . . . . . . . . . . 3.2 Electronic structure methods . . . . 3.3 The LMTO method . . . . . . . . . 3.3.1 Muffin-tin orbitals . . . . . . 3.3.2 The LMTO-ASA method . . 3.4 Full potential LMTO method . . . . 3.4.1 The basis set . . . . . . . . . 3.4.2 The LMTO matrix . . . . . . 3.4.3 Total energy . . . . . . . . . 3.5 Projector Augmented Wave Method 3.5.1 Wave function . . . . . . . . 3.5.2 Charge density . . . . . . . . 3.5.3 Total energy . . . . . . . . . 3.6 Ultrasoft pseudopotential . . . . . . 3.7 PAW and US-PP . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 9 9 11 12 12 14 14 15 16 17 18 18 20 21 22 23 . . . . . . . 25 25 26 26 27 29 29 30 . . . . . . . . . . . . . . . . 4 Phase transitions 4.1 Static total energy calculation . . . . . . . 4.2 Elastic stability criteria . . . . . . . . . . 4.3 Bain path . . . . . . . . . . . . . . . . . . 4.4 Dynamical stability (phonon calculation) . 4.5 Equation of state . . . . . . . . . . . . . . 4.5.1 Murnaghan equation of state . . . 4.5.2 Birch-Murnaghan equation of state . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 4.5.3 4.5.4 Universal equation of state . . . . . . . . . . . . . 31 Comparison of different EOS for Fe . . . . . . . . . 31 5 Semiconductor optics 33 5.1 Dielectric function . . . . . . . . . . . . . . . . . . . . . . 33 5.2 Dielectric function of PbWO4 . . . . . . . . . . . . . . . . 34 5.3 Solar energy materials . . . . . . . . . . . . . . . . . . . . 36 6 MAX phases 6.1 MN+1 AXN phase . . . . . . . . . 6.2 Phase stability in Ti-Si-C system 6.3 Chemical bonding in 312 phases 6.4 XAS and XES calculation . . . . 6.5 DOS with electrical conductivity 6.6 Optical properties . . . . . . . . 6.7 Surface energy . . . . . . . . . . 6.8 Ductility . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 39 39 40 42 43 43 46 48 50 7 Sammanfattning på svenska 53 Acknowledgments 57 Bibliography 59 Chapter 1 Introduction In 1998, Walter Kohn was awarded Nobel Prize in chemistry. His work has enabled physicists and chemists to calculate the properties of molecules and solids using computers, without performing experiments in the laboratory. Already around 1930 physicists were fully aware of the quantum mechanical equations governing the behavior of systems of many electrons, but were incapable of exactly solving them in all but the very simplest cases. They developed several approximation schemes, but none of them was very successful. In 1964 Walter Kohn [1] and Pierre Hohenberg and somewhat later Walter Kohn and Lu Jeu Sham [2] had proved an idea that was essential to their solution scheme, which is now called density functional theory (DFT). DFT differs from quantum chemical methods and does not yield a correlated N-body wavefunction. Many of the chemical and electronic properties of molecules and solids are determined by electrons interacting with each other and with atomic nuclei. In DFT, knowing the average density of electrons at all points in space is enough to uniquely determine the total energy, hence also a number of other properties of the system. DFT theory is based on one-electron theory and shares many similarities with the Hartree-Fock method. DFT has come to prominence over the last decade as a method potentially capable of generating very accurate results at relatively low cost. By means of state-of-the-art DFT, great achievements in calculating mechanical and electronic properties of solids have been made. Different approximations related to the construction of exchange-correlation functionals used in DFT for ground and excited states have been introduced, for example, local density approximation (LDA) [3] and generalized gradient approximations (GGA) [4], LDA+U [5] and GW [6] approximation. Applications to materials modeling in general as well as to nanotubes, quantum dots, and artificial molecules are incorporated. The calcula3 4 CHAPTER 1. INTRODUCTION tions have developed so rapidly and reached such an advanced level that it now becomes the right time for a theory-based approach, to support as well as supplement experiment. This development has also been facilitated by the continued upgrading of powerful computers, which have made it possible to calculate materials properties with an impressive accuracy. The main thrust of the present thesis is to use highly accurate theoretical ab initio methods to predict materials properties and search for the new engineering materials. Recently, the nanolayered ternary compounds M N+1 AXN (MAX) [7], where N =1, 2 or 3, M is an early transition metal, A is an Agroup (mostly IIIA and IVA) element, and X is either C and/or N, have attracted increasing interests owing to their unique properties. These ternary carbides and nitrides combine the unique properties of both metals and ceramics. Like metals, they are good thermal and electrical conductors with electrical and thermal conductivities ranging from 0.5 to 14×106 Ω−1 m−1 [8], and from 10 to 40 W/m·K [9], respectively. They are relatively soft with Vickers hardness of about 2-5 GPa. Like ceramics, they are elastically stiff, some of them, like Ti 3 SiC2 , Ti3 AlC2 and Ti4 AlN3 also exhibit excellent mechanical properties at high temperatures. They are resistant to thermal shock and unusually damage tolerant, and exhibit excellent corrosion resistance. Above all, unlike conventional carbides or nitrides, they can be machined by conventional tools without lubricant. All these excellent properties make MAX phases a new family of technologically important materials. Systematic studies on MAX phases regarding their electronic, bonding, elastic and optical properties have been carried out and described in this thesis. The relation between mechanical and bonding properties of these solids elaborated by the present electronic structure studies provides robust support to the exploration of the behavior of these ternary compounds. The rest of the thesis is organized as the following. The second chapter describes the main idea of density functional theory. The third chapter deals with the computational methods. My research results can be classified in three parts, 1) Phase transition and its related properties, such as phase stability and equations of states, which are elaborated in Chapter 4. 2) The calculated results for the linear optical properties of certain semiconductors, such as the scintillating crystal PbWO 4 and the solar energy materials CuIn1−x Gax Se2 are described in Chapter 5. 3) In Chapter 6, applications of DFT in MAX phases are presented, which include their electronic, bonding, mechanical and optical properties. Chapter 2 Many body problem 2.1 Introduction In this work our focus is restricted to bulk materials. This means that possible surface effects are excluded and that we consider the bulk to be an infinite crystal. To study the properties of atoms, molecules and solids, the so-called Schrödinger Equation has become the basic tool that the solid state theorists work with. The time-independent Schrödinger Equation has the form HΨ = EΨ, (2.1) which has been proven to quite exactly solve the problem with one nucleus and one electron, such as the hydrogen atom. However for a solid the system is described by the many electron wave function Ψ(r1 , r2 , ..., rN ), where ri gives the position and spin of particle i. In a solid we are typically dealing with 1023 particles and this makes the problem very complex. Let us have a closer look at the Hamiltonian that describes the whole bulk system: H = − + h̄2 2 h̄2 2 1 Z 2 e2 − i + 2 k 2Mk 2m i 2 k=l |Rk − Rl | e2 Ze2 1 − , 2 i=j |ri − rj | |ri − Rk | i k (2.2) where h̄ is Planck constant, Rk is the nuclear coordinate for the k’th nucleus, ri the electronic coordinate for the i’th electron and M k and m are the corresponding masses. Z is the nuclear charge. The first two terms in Eq. (2.2) are the kinetic energy operators for the nuclei and electrons, respectively and the third term describes the nuclei-nuclei interaction, VNN . The next term in Eq. (2.2) is the electron-electron interaction, Vee . The last term is the interaction between the electrons 5 CHAPTER 2. MANY BODY PROBLEM 6 and nuclei and could be regarded as an external potential, V ext , acting upon the electrons. Since the Hamiltonian describes a strongly coupled system involving both electrons and nuclei, it is quite difficult to solve. The first approximation we introduce is Born-Oppenheimer approximation. Within this approximation the nuclei are taken to be stationary, so that the nuclear kinetic energy will be zero. Now the total energy Hamiltonian can be expressed as H = Te + VNN + Vee + Vext = − + 2.2 h̄2 2 1 Z 2 e2 i + 2m i 2 k=l |Rk − Rl | e2 Ze2 1 − 2 i=j |ri − rj | |ri − Rk | i k (2.3) The Hartree approximation The Hartree approximation provides one way to reduce Eq. ( 2.3) to a problem which we can solve easily. In Eq. (2.3), the potential which a certain electron feels depends upon all the other electrons’ positions. However this potential can be approximated by an average single-particle potential |ψj (rj )|2 nj , (2.4) Vd (ri ) = e2 |ri − rj | j=i where nj are the orbital occupation numbers and ψ j (rj ) is a singleparticle wave-equation, i.e. a solution to the one-particle wave-equation, h̄2 2 − +Vext + Vd (ri ) ψi (ri ) = εi ψi (ri ) 2m (2.5) With this simplification the set of equations now become separable. However the equations are still non-linear and have to be solved selfconsistently by iteration. According to the Pauli exclusion principle, two electrons can not be in the same quantum state. However the wave function in Hartree theory Ψ(r1 σ1 , r2 σ2 ..., rN σN ) = N ψi (ri , σi ) (2.6) i is not antisymmetric under the interchange of electron coordinates and accordingly does not follow the Pauli principle. Furthermore, the Hartree approximation fails to represent how the configuration of the N − 1 electrons affects the remaining electrons. This problem has been rectified by Hartree-Fock theory. 2.3. HARTREE-FOCK APPROXIMATION 2.3 7 Hartree-Fock approximation We assert that a solution to HΨ = EΨ is given by any state Ψ that makes the following quantity stationary: E= (Ψ, HΨ) . (Ψ, Ψ) (2.7) According to the variational principle [10], the normalized expectation value of energy is minimized by the ground-state wave function Ψ. A better description is to replace wave function Eq. (2.6) by a Slaterdeterminant of one-electron wave functions ψ (r σ ) ψ (r σ ) · · · 1 2 2 1 1 1 1 ψ2 (r1 σ1 ) ψ2 (r2 σ2 ) · · · Ψ(r1 σ1 , r2 σ2 ..., rN σN ) = √ .. .. .. . N! . . ψN (r1 σ1 ) ψN (r2 σ2 ) · · · . ψN (rN σN ) ψ1 (rN σN ) ψ2 (rN σN ) .. . (2.8) This is a linear combination of products of the form given by of Eq. (2.6) and all other products obtainable from the permutation of the r i σi among themselves. The Hartree-Fock equation which follows from an energy-minimization is given by: − j 2 h̄ 2 +Vext (ri ) + Vd (ri ) ψi (ri ) − 2m 2 e ∗ dr |r−r | ψj (r )ψi (r )ψj (r)δsi sj = εi ψi (ri ). (2.9) The last term on the left side due to exchange originates from the wave function (Slater determinant). This term only operates between electrons having the same spin, this is called the exchange term. In addition to this, there should also be a correlation interaction between electrons, which is not included here. Consequently, the correlation energy can be described as the difference between the exact energy and the HartreeFock energy. Another more effective approach to treat the electrons in a solid will be introduced in the following sections. 2.4 Density functional theory The density functional theory is based on two fundamental theorems introduced by Hohenberg and Kohn [1], and later extended by Kohn and Sham [2]. First, the ground-state energy E of a many electron system is shown to be a unique functional of the electron density n(r), E[n] = drVext (r)n(r) + F [n]. (2.10) CHAPTER 2. MANY BODY PROBLEM 8 According to the Hohenberg and Kohn theory, we can separate the functional F [n] into two terms F [n] = n(r)n(r ) drdr + G[n]. |r − r | (2.11) The first term on the right is the usual electron-electron Coulomb contribution, and the second term G[n] is a universal functional of the electron density. Kohn and Sham proposed the following approximation for the functional G[n], (2.12) G[n] = T [n] + Exc [n], where T [n(r)] is the kinetic energy of a system of non-interacting electrons with electron density n(r). However, it is impossible to find an exact expression for the exchange-correlation energy E xc . To deal with the problem of the exchange-correlation energy E xc , a most useful approximation has been introduced, namely the local density approximation (LDA). This approximation is exact in the limit of slowly varying densities. In LDA the exchange-correlation energy is replaced by Exc [n] = n(r)εxc [n]dr, (2.13) where the εxc is the exchange and correlation energy per particle of a homogeneous electron gas. Now we write the electron density in terms of one-electron wavefunctions, ψ(r), as n(r) = N ψi∗ (r)ψi (r), (2.14) i=1 where N is the total number of electrons. The one-particle Schrödinger equation now becomes [− 2 +Veff (r)]ψi (r) = εi ψi (r), (2.15) where the atomic unit h̄ = 2me = e2 /2 = 1 has been used. The effective one-electron potential, Veff , is given by Veff (r) = Vext (r) + where Vxc (r) = 2n(r ) dr + Vxc (r), |r − r | δ(n(r)εxc [n(r)]) . δ(n(r)) (2.16) (2.17) The set of equations, (2.15) − (2.17) are known as the Kohn-Sham equations, which have to be solved in a self-consistent way, just like the Hartree and Hartree-Fock approximations. Chapter 3 Computational methods 3.1 Introduction In the previous chapter we have obtained an effective one-electron equation which can be solved in a self-consistent way, [− 2 +Veff (r)]ψi (r) = εi ψi (r). (3.1) The method of solving this eigenvalue equation makes use of the symmetry of the crystal structure. For an infinite crystal the potential is periodic, i.e. invariant under lattice translations R. For a monoatomic solid we have V (r + R) = V (R), (3.2) R = n 1 a1 + n 2 a2 + n 3 a3 , (3.3) where R is defined by in which ni are integers and the set of vectors a i are the real space Bravais lattice vectors that span the crystal cell. According to the Bloch’s theorem, the eigenstates can be chosen to take the form of a plane wave times a function with the periodicity of the Bravais lattice; ψk (r + R) = eik·R ψk (r). (3.4) where the k is the so called Bloch wave vector. Now, the one-electron function can be characterized by the Bloch vector k. As a consequence, Eq. (3.1) can be written as Heff (r)ψn (k; r) = εn (k)ψn (k; r), (3.5) where the index i in Eq. (3.1) has been substituted by the quantum number n, the band index. The one-electron wave function ψ n and the 9 10 CHAPTER 3. COMPUTATIONAL METHODS corresponding eigenvalues, εn are now be characterized by the Bloch wave vector k. The Bloch vector k used to label the one-electron states is conveniently viewed as a vector in the reciprocal space. A lattice vector G in the reciprocal space is constructed as G = x1 b1 + x2 b2 + x3 b3 , (3.6) where the xi are the integers and the bi are the basic vectors of the reciprocal lattice: (3.7) ai · bj = δij . Regarded as functions of the wave vector k, the energy eigenvalues and wave functions have the translational symmetry of the reciprocal lattice, ε(k) = ε(k + G) (3.8) ψ(k, r) = ψ(k + G, r). (3.9) As the Wigner-Seitz cell is the smallest unit that characterizes the crystal structure, the Brillouin Zone (BZ) is the smallest unit that builds up the whole reciprocal lattice by repeating itself periodically. By means of translational symmetry as well as other point group symmetries (rotations, mirror, inversion operations), we can reduce the problem to the irreducible part of the BZ, the smallest zone which defines a complete set of wave vectors. For example, in a lattice with full cubic symmetry, the irreducible part of the BZ is only 1/48 of the full BZ. It is only in this part we need to solve the electronic structure problem. According to the Pauli exclusion principle the eigenstates with eigenvalue εi (k) are occupied from the lowest eigenvalue up to the Fermi energy, εF . The Fermi energy is defined by N= εF −∞ D(ε)dε, (3.10) where N is the number of valence electrons and D(ε) is the density of states (DOS), dS 2 . (3.11) D(ε) = 3 8π S(ε) | ε(k)| The integration is carried out over a surface of constant energy, S(ε), in the first BZ. The one electron states most relevant for most of the physical properties are those with energies around the Fermi level. These states are closely related to crystal structure stability, transport properties, susceptibility, etc.. 3.2. ELECTRONIC STRUCTURE METHODS 3.2 11 Electronic structure methods In practice the solution to equation (3.5), ψ n (k; r), can be expanded in some basis sets. To solve the problem we need to resort to one of many available electronic structure methods. For the different selection of the basis set, electronic structure methods can be divided into two parts [11]: Fixed basis set Variable Basis Set Plane Wave Augmented Plane Wave Tight Binding Korringa Kohn Rostoker Pseudopotential Linear Augmented Plane Wave Orthogonalized Plane Wave Linearized Muffin Tin Orbitals Linear Combination of Atomic Orbitals Augmented Spherical Wave The first set of methods obey the Bloch condition explicitly. That is, in the expansion cn φn (r) (3.12) ψ(r) = n the basis functions are fixed and the coefficients c n are chosen to minimize the energy. One disadvantage of these methods is that the wavefunctions are fixed. This often leads to great difficulty in obtaining a sufficiently converged basis set. In the second set of methods, the wavefunctions are varied. This is performed by introducing energy dependent wavefunctions φ n (ε, r). The wavefunctions are energy dependent and have the form of ψ(ε, r) = cn φn (ε, r), (3.13) n However, the Bloch condition is not automatically fulfilled. The solutions in one unit cell are chosen to fit smoothly to those of the neighbor cells, thus fulfilling the Bloch condition “indirectly”. As the wavefunction can be modified to the problem at hand, these techniques converge very fast in the number of required basis function. In APW and KKR, the price for doing so is the additional parameter ε. At every k-point of the band structure, equation (3.5) must be solved for a large number of ε. Solutions only exist for those ε that are actual eigenvalues. While these methods are accurate, they are also time consuming. The solution to this problem is to linearize the energy dependent orbitals as is done in LAPW, LMTO, and ASW. They are expanded as a Taylor expansion in ε so that the orbitals themselves are energy independent, although 12 CHAPTER 3. COMPUTATIONAL METHODS Figure 3.1: Muffin-tin part of the crystal potential V(r) and radial wave function. SMT is the radius of the muffin-tin sphere, S E is the radius of the escribed sphere and VMTZ is the potential of the interstitial region. the expansion retains the energy dependence. The variational equation (3.5) thus has to be solved only once for each k-point. These methods are extremely rapid and only slightly less accurate than other non-linear methods. 3.3 The LMTO method During the last decades, the linear-muffin-tin-orbital (LMTO) [12] method has become very popular for the calculation of the electronic structure of crystalline systems. The LMTO method combines the following advantages: (1) it uses a minimal basis, which leads to high efficiency and makes calculations possible for large unit cell; (2) it treats all elements in the same way, so that d and f metals as well as atoms with a large number of core states can be considered; (3) it is very accurate, due to the augmentation procedure which gives the wave function the correct shape near the nuclei; (4) it uses atom-centered basis functions of well-defined angular momentum, which makes the calculated properties transparent [13]. 3.3.1 Muffin-tin orbitals The crystal is divided into non-overlapping muffin-tin spheres surrounding the atomic sites and an interstitial region outside the spheres. Inside the muffin-tin sphere the potential is assumed to be spherically symmetric while in the interstitial region the potential, V MTZ , is assumed to be 3.3. THE LMTO METHOD 13 constant or slowly varying. Because the potential in the interstitial is constant we can shift the energy scale so as to set it to zero. In the following, we consider a crystal with only one atom per primitive cell. Within a single muffin-tin well we define the potential VMT (r) = V (r) − VMTZ , |r| < SMT 0 , |r| > SMT (3.14) Here V (r) is the spherically symmetric part of the crystal potential. The radii of the muffin-tin spheres are chosen so that they do not touch each other. In the following, SMT is expressed by S. Now we try to solve the Schrödinger equation for muffin-tin potential, [− 2 +VMT ]ψ(ε, r) = (ε − VMTZ )ψ( r). We define the kinetic energy κ2 (3.15) in the interstitial region by κ2 = ε − VMTZ (3.16) For an electron moving in the potential from an isolated muffin-tin well embedded in the flat potential VMTZ , the spherical symmetry can extend throughout all space and the wave functions are ψL (ε, r) = il Ylm (r̂)ψl (ε, r) (3.17) where we use the convention that r = |r| and r̂ is the direction of r. A phase factor il is included. To obtain basis functions which are approximately independent of energy, reasonably localized, and normalizable for all values of κ 2 , Anderson [14] accomplished these by Muffin-tin orbitals. A spherical Bessel function that cancels the divergent part of ψ l (ε, κ, r) and simultaneously reduces the energy and potential dependence of the tails, we have the muffin-tin orbitals in form of χlm (ε, r) = i l Ylm (r̂) l (r/S) ψl (ε, r) + Pl (ε) 2(2l+1) (r/S)−l−1 , |r| < S , |r| > S (3.18) where ψl (ε, r) is a solution of the radial Schrödinger equation inside the atomic sphere. The potential function Dl (ε) + l + 1 (3.19) Pl (ε) = 2(2l + 1) Dl (ε) − l and the normalization of ψl (ε, r) are determined by satisfying differentiability and continuity of the basis function on the sphere boundary. Here the Dl (ε) is the logarithmic derivative of the wave function. The tail of the basis function, i.e. the part outside the muffin-tin sphere can in general be written as Neumann function. But in Eq. (3.16) the kinetic energy of this tail, known as κ2 , is chosen to be zero. Therefore the Neumann function has a simple form like this. CHAPTER 3. COMPUTATIONAL METHODS 14 3.3.2 The LMTO-ASA method In the atomic sphere approximation, LMTO-ASA, the muffin-tin spheres are overlapping in such a way that the total volume of muffin-tin sphere is the same as the atomic volume. This means that the muffin-tin radius S is equal to the Wigner- Seitz radius S WS where the total volume per 3 . In the ASA, the potential is also atom is given by V = (4π/3)SWS assumed to be spherically symmetric inside each muffin-tin sphere and the kinetic energy of the basis functions defined in the interstitial is restricted to be constant, actually zero in the calculation. In order to construct a linear method, the energy dependent terms in the muffin-tin spheres of the Eq. (3.18) are replaced by the energy independent function Φ. The function is defined as a combination of radial functions and their energy derivative Φ(D, r) = φl (r) + ω(D)φ̇l (r), (3.20) where w(D) is a function of the logarithmic derivative and w(D) should make the energy dependent orbitals χ lm (ε, r) defined in the Eq. (3.18) continuous and differentiable at the sphere boundary S. The boundary condition determines D = −l − 1, The so obtained energy independent orbital can now be written as χlm (ε, r) = i 3.4 l Ylm (r̂) Φl (D, r) , |r| < S −l−1 . |r| > S (r/S) (3.21) Full potential LMTO method The FP-LMTO calculations are all electron, fully relativistic, without shape approximation to the charge density or potential. The crystal is divided into non-overlapping muffin-tin sphere and an interstitial region outside the spheres. The wave function is then represented differently in the two types of regions. Inside a muffin-tin spheres, the basis functions are as in the LMTO-ASA method. They are Bloch sum of linear muffin-tin orbitals and are expanded by structure constant, φ ν (r) and φ̇ν (r). However the kinetic energy is not, as in the ASA approximation, restricted to the zero in the interstitial region. For simplicity, here we only consider a monoatomic solid, and suppress the atomic site index. The κ dependent linear muffin-tin orbitals can now be written as ψκlm (k, r) = χκlm (r) + Jκlm (r)Sκlm,l m (k), (3.22) lm where l χlm (r) = i Ylm (r̂) Φ(Dh ,r) −iκhl (κS) Φ(D h ,S) −iκhl (κr) , |r| < S , |r| > S (3.23) 3.4. FULL POTENTIAL LMTO METHOD 15 and l Jκlm (r) = i Ylm (r̂) Φ(DJ ,r) Jl (κS)(κS) Φ(D J ,S) Jl (κr) , |r| < S . |r| > S (3.24) Inside the muffin-tin at τ , we can also expand the electron densities and potential in spherical harmonics times a radial function, nτ (r)|τ = nτ (h; rτ )Dh (r̂τ ), (3.25) Vτ (h; rτ )Dh (r̂τ ), (3.26) h Vτ (r)|τ = h where Dh are linear combinations of spherical harmonics, Y lm (r̂). Dh are chosen here because we need an invariant representation of the local point group of the atomic site contained in the muffin-tin. The expansion coefficients nτ (h; rτ ) and Vτ (h; rτ ) are numerical functions given on a radial mesh. In the interstitial region, the basis function, charge densities and potential are expressed as Fourier series, ψ(k; r)|I = ei(k+G)·r ψ(k + G), (3.27) G nI (r)|I = nG ei(k+G)·r , (3.28) VG ei(k+G)·r , (3.29) G VI (r)|I = G where G are reciprocal lattice vectors spanning the Fourier space. 3.4.1 The basis set Envelope function is the basis function in the interstitial region. By choosing appropriate envelope functions, such as plane waves, Gaussians, and spherical waves (Hankel functions), we can generate various electronic structure methods (LAPW, LCGO, LMTO, etc.). The LMTO envelope function is represented as below, Klm (κ; r) = −κ l+1 l i Ylm (r̂) 2 −h+ l (κr) , κ ≤ 0 , κ2 > 0 nl (κr) (3.30) where nl is a spherical Neumann function and h+ l is a spherical Hankel function of the first kind. The envelope function is a singular Hankel or Neumann functions with regards to the sign of the kinetic energy. This CHAPTER 3. COMPUTATIONAL METHODS 16 introduces a κ dependence for the basis functions inside the muffin-tin sphere through the matching conditions at the sphere boundary. This is not a problem. Using a variational method, the ground state still has several basis functions with the same quantum numbers, n, l and m, but different κ2 . This is called a double basis. The basis set can always contain different bases corresponding to the atomic quantum number l but with different principle quantum numbers n. A basis constructed in this way forms a fully hybridizing basis set, not a set of separate energy panels. To illustrate the way the basis set is constructed, we take fcc Ce [15] as an example. The ground state configuration is 4f 1 5d1 6s2 . Thus we include the 6s, 6p, 5d, 4f as valence states. To reduce the core leakage at the sphere boundary, we also treat the core states 5s and 5p as semicore states. By this kind of construction, the basis set becomes more complete. 3.4.2 The LMTO matrix We now introduce a convenient notation for the basis functions: |χi (k) = |φi (k) + |ψi (k), (3.31) where |φ is the basis function inside the muffin-tin spheres and |ψ i (k) represents the basis functions, tails, outside the spheres. We can construct a wave function Ψ kn (r) by a linear combination of LMTO basis functions, χi . Hence the linear combination can be written as Ai |χi (3.32) |Ψ = i The Hamiltonian operator is Ĥ = H0 + Vnmt + VI (3.33) where H0 is the Hamiltonian operator containing the kinetic operator and the spherical part of the muffin-tin potential, V nmt represents the non-spherical part of the muffin-tin potential, and V I is the interstitial potential. Then by using the variational principle for the one-electron Hamiltonian the LMTO secular matrix follow as [χi (k)|H0 + Vnmt + VI |χj (k) − ε(k)χi (k)|χj (k)]Aj = 0 (3.34) j We can reduce it to 0 1 [Hij + Hij − ε(k)Oij ]Aj = 0 j (3.35) 3.4. FULL POTENTIAL LMTO METHOD 17 where 0 = φi (k)|H0 |φj (k) Hij (3.36) Oij = φi (k)|φj (k) + ψi (k)|ψj (k) (3.37) 1 1 = φi (k)|Vnmt |φj (k) + (κi 2 + κj 2 )ψi (k)|ψj (k) + ψi (k)|VI |ψj (k) Hij 2 (3.38) 0 is where |ψj (k) is an eigenfunction to 2 with eigenvalue κ2j . Hij the spherical muffin-tin part of Hamiltonian matrix. O ij is the overlap 1 between the orbitals inside the sphere as well as in the interstitial. H ij contains the corrections to the Hamiltonian matrix coming from the muffin-tin and interstitial region. The first term in Eq. (3.38) is the non-spherical potential matrix. The next term is the expectation value of the kinetic energy operator in the interstitial region. The last term is the interstitial potential matrix. 3.4.3 Total energy The total energy for whole crystal can be expressed as [16] Etot = Tval + Tcor + Ec + Exc , (3.39) where Tval and Tcor are the kinetic energy for the valence and core electrons, Ec is electrostatic energy including electron-electron, electronnucleus and nucleus-nucleus energy, and E xc is our familiar term which has been studied in LDA. The kinetic energy is usually expressed as the expectation value of the kinetic operator − 2 . By using the eigenvalue equation the expectation value can be expressed as the sum over one electron energies minus the effective potential energy. The core eigenvalues εiτ are obtain as exact solution to the Dirac equation with the spherical part of the muffin-tin potential. The total energy can be written as Etot = occ kn − wnk εkn + fiτ εiτ + µτ 1 Zτ j Vc (τj ; 0) + 2 j Vc 1 n(r)[ Vc (r) − Vin (r)]dr 2 Vc n(r)εxc (n(r))dr, (3.40) where the integral is over the unit cell [14]. The sum j is over the core states. The density n(r) is the total charge density, valence as well as core electrons. Vin is the input potential obtained from LDA. Madelung term Vc (τ ; 0) is the Coulomb potential at the nucleus less the Z/r self contribution and εxc is the exchange-correlation energy. 18 3.5 CHAPTER 3. COMPUTATIONAL METHODS Projector Augmented Wave Method Blöchl [17] developed the projector augumented wave method (PAW) by combining the ideas from pseudopotentials and linear augmentedplane-wave (LAPW) methods. PAW method is an all-electron electronic structure method. It describes the wave function by a superposition of different terms: the plane wave part, the so-called pseudo wave function, and expansions into atomic and pseudo atomic orbitals at each atom. On one hand, the plane wave part has the flexibility to describe the bonding and tail region of the wave functions, but if it is used alone it would require prohibitive large basis sets to describe correctly all the oscillations of the wave function near the nuclei. On the other hand, the expansions into atomic orbitals can describe correctly the nodal structure of the wave function near the nucleus, but lack the variational degrees of freedom for the bonding and tail regions. The PAW method combines the virtues of both numerical representations in one well-defined basis set. To avoid the dual efforts by performing two electronic structure calculations, both plane waves and atomic orbitals, the PAW method does not determine the coefficients of the atomic orbitals variationally. Instead, they are unique functions of the plane wave coefficients. The total energy, and most other observable quantities can be broken into three almost independent contributions: one from the plane wave part and a pair of expansions into atomic orbitals on each atom. The contributions from the atomic orbitals can be broken down furthermore into contributions from each atom, so that strictly no overlap between atomic orbitals on different sites need to be computed. In principle, the PAW method is able to recover rigorously the density functional total energy, if plane wave and atomic orbital expansions are complete. This provides us with a systematic way to improve the basis set errors. The present implementation uses the frozen core approximation, it provides the correct densities and wave functions, and thus allows us to calculate other parameters of the system. By making the unit cell sufficiently large and decoupling the long-range interactions, limitations of plane wave basis sets to periodic systems (crystals) can easily be overcome. Thus this method can be used to study molecules, surfaces, and solids within the same approach. 3.5.1 Wave function Firstly, we will introduce a transformation matrix τ . There are two Hilbert spaces, one called all electron (AE) Hilbert, and the other called 3.5. PROJECTOR AUGMENTED WAVE METHOD 19 pseudo (PS) Hilbert. We need to map the AE valence wave functions onto to the fictitious PS wave functions. Every PS wave function can be expanded into PS partial waves |Ψ̃ = |φ̃i ci (3.41) i The corresponding AE wave function is of the form |Ψ = τ |Ψ̃ = |φi ci (3.42) i From the two equations above, we can derive |Ψ = |Ψ̃ − |φ̃i ci + i |φi ci (3.43) i because we need the transformation τ to be linear, the coefficients must be linear functions of the PS wave functions. Therefore the coefficients are scalar products of PS wave function with projector functions p̃ i |, p̃i |Ψ̃. The projector functions must fulfill the condition |φ̃i p̃i | = 1 (3.44) i within the augmentation region ΩR , which implies that p̃i |φ̃j = δij . (3.45) Finally, the transformation matrix can be deduced from Eq. (3.42) and Eq. (3.43) with the definition ci = p̃i |Ψ̃ τ =1+( |φi − |φ̃i )p̃i |. (3.46) i Using this transformation matrix, the AE valence wave function can be obtained from PS wave function by |Ψ = |Ψ̃ + (|φi − |φ̃i )p̃i |Ψ̃ (3.47) i The core states wave functions |Ψc are decomposed in a way similar to the valence wave functions. They are decomposed into three contributions: (3.48) |Ψc = |Ψ̃c + |φc − |φ̃c . Here |Ψ̃c is a PS core wave function, |φc is AE core partial wave and lastly |φ̃c is the PS core partial wave. Comparing to the valence wave functions no projector functions are needed to be defined for the core states, and the coefficients of the one-center expansion are always unity. CHAPTER 3. COMPUTATIONAL METHODS 20 Figure 3.2: PAW method illustration 3.5.2 Charge density The charge density at point r in space is composed of three terms: n(r) = ñ(r) + n1 (r) − ñ1 (r) (3.49) The soft pseudo charge density ñ(r) is the expectation value of real-space projection operator |rr| on the pseudo-wave-functions. ñ(r) = fn Ψ̃n |rr|Ψ̃n (3.50) n The onsite charge densities n1 and ñ1 are treated on a radial support grid. They are given as: n1 (r) = fn Ψ̃n |p̃i φi |rr|φj p̃j |Ψ̃n = ρij φi |rr|φj (3.51) n here ρij is the occupancies of each augmentation channel (i, j) and they are calculated from the pseudo-wave-functions applying the projector functions: ρij = n fn Ψ̃n |p̃i p̃j | Ψ̃n , and ñ1 (r) = fn Ψ̃n |p̃i φ̃i |rr|φ̃j p̃j |Ψ̃n = ρij φ̃i |rr|φ̃j (3.52) n We will focus on the frozen core case, ñ, ñ 1 , n1 are restricted to the valence quantities. Besides that, we introduce four quantities that will be used to describe the core charge density: n c , ñc , nZc , ñZc . nc denote the charge density of frozen core all-electron wave function in the reference atom. The partial core density ñ is introduced to calculate nonlinear core corrections. nZc is defined as the sum of the point charge of nuclei nZ and frozen core AE charge density n c : nZc = nZ + nc , Lastly, the pseudized core density is a charge distribution that is equivalent to nZc outside the core radius and have the same moment as the nZc inside the core region. nZc (r)d3 r = Ωr ñZc (r)d3 r Ωr (3.53) 3.5. PROJECTOR AUGMENTED WAVE METHOD 21 The total charge density nT [18] is decomposed into three terms: = n + nZc nT = (ñ + n̂ + ñZc ) + (n1 + nZc ) − (ñ1 + n̂ + ñZc ) = ñT + n1T − ñ1T (3.54) A compensation charge n̂ is added to the soft charge densities ñ+ ñ Zc and ñ1 + ñZc to reproduce the correct multipole moments of the AE charge density n1 + nZc that is located in each augmentation region. Because nZc and ñZc have exactly the same monopole −Zion (charge of an electron is +1), the compensation charge must be chosen so that ñ1 + n̂ has the same moments as the AE valence charge density n 1 within each augmentation sphere. 3.5.3 Total energy The final expression for the total energy can also be split into three terms: (3.55) E(r) = Ẽ(r) + E 1 (r) − Ẽ 1 (r). Where Ẽ(r), E 1 (r), Ẽ 1 (r) are given by Ẽ(r) = n 1 fn Ψ̃n | − ∆|Ψ̃n + Exc [ñ + n̂ + ñc ] + EH [ñ + n̂] 2 vH [ñZc ][ñ(r) + n̂(r)]dr + U (R, Zion ) + (3.56) U (R, Zion ) is the electrostatic energy of point charges Z ion in an uniform electrostatic background, 1 ρij φi | − ∆|φj + Exc [n1 + nc ] + EH [n1 ] E 1 (r) = 2 i,j vH [ñZc ]n1 (r)dr + (3.57) Here vH [ñZc ]n1 (r)dr is the electrostatic interaction between core and valence electrons and EH is electrostatic energy 1 1 EH [n] = (n)(n) = 2 2 Ẽ 1 (r) = i,j + dr dr n(r)n(r ) |r − r | (3.58) 1 ρij φ̃i | − ∆|φ̃j + Exc [ñ1 + n̂ + ñc ] + EH [ñ1 + n̂] 2 vH [ñZc ][ñ1 (r) + n̂(r)]dr (3.59) The overline means that the corresponding terms must be evaluated on the radial grid within each augmentation region. CHAPTER 3. COMPUTATIONAL METHODS 22 3.6 Ultrasoft pseudopotential It is unaffordable to treat first-row elements, transition metals, and rareearth elements by standard Norm-conserving Pseudopotentials (NCPP). Therefore, various attempts have been made to generate the so called soft potentials, and Vanderbilt [19] ultrasoft pseudopotentials (US-PP) has been proved to be the most successful one among them. There are number of improvements in US-PP method: 1) nonlinear core corrections were included in the US-PP. 2) Lower cutoff energy, namely reduced number of plane waves, was required in US-PP than NC-PP. This enables us to perform molecular dynamics simulations for systems containing first-row elements and transition metals. is exactly the same in the PAW method and US-PP meBecause E thod, we only need to consider the linearization of E 1 and Ẽ 1 . We obtain E 1 to the first order by linearization of the E 1 in the PAW total energy functional around atomic reference occupancies ρ ij E1 ≈ C + ij 1 a ρij φi | − ∆ + υef f |φj 2 (3.60) a 1 1 with υef f = υH [na + nZc ] + υxc [na + nc ] and C is a constant. A similar linearization can also be done for Ẽ 1 Ẽ ≈ C + 1 1 a [ρij φi | − ∆ + υef f |φj + 2 ij a L (r)υ ef Q ij f (r)dr] (3.61) with a 1a + n a + n Zc] + υxc [n 1a + n a + n Zc ] υef f = υH [n (3.62) L (r) is a pseudized augmentation charge in the US-PP approaches. Q ij ∗ (r)φ j (r), L (r) = Qij (r) = φ∗ (r)φj (r) − φ Given Q ij i i 1 = E1 − E ij 1 1 ρij (φi | − ∆|φj − φi | − ∆|φj ). 2 2 (3.63) Now, we can compare the PAW functional with the US-PP functional. In the PAW method, if the sum of compensation charge and 1 + n , is equivalent to the onsite AE charge denpseudocharge density, n 1 1 from Zc = nZc , n c = nc ,we can derive the same E1 − E sity n , and n Eq. (3.57) and Eq. (3.59). In this limiting case, The PAW method is equivalent to the US-PP method. 3.7. PAW AND US-PP 3.7 23 PAW and US-PP The general rule in Vienna ab initio simulation package (VASP) is to use PAW potential wherever possible, the PAW potentials are especially generated for improving the accuracy for magnetic materials, alkai and alkai earth elements, 3d transition metals, lanthanides and actinides. For these materials, the treatment of semicores states as valence states are desirable. The PAW method is as efficient as the FLAPW method, it is easy to unfreeze of low lying core states, only one partialwave (and project) for the semicore states is included. Differences between PAW and US-PP are only related to the pseudization of the augmentation charges. By choosing very accurate pseudized augmentation function, discrepancies of both methods can be removed. However, augmentation charges must be represented on a regular grid with the US-PP approach. Therefore, hard and accurate pseudized augmentation charges are expensive in terms of computer time and memory. The PAW method avoids these drawbacks by introducing radial support grids. The rapidly varying functions can be elegantly and efficiently treated on radial support grids. The PAW potentials are generally slightly harder than US-PP and they retains similar hardness across the periodic table. Vice versa, the US-PP Potential become progressively softer when moving down in the periodic table. For multi species compounds with very different covalent radii mixed, the PAW potentials are clearly superior, except for one component system, the US -PP might be slightly faster at the price of reduced precision. Most PAW potential were optimised to work at a cutoff of 250-300 eV, which is only slightly higher than in the US-PP. 24 CHAPTER 3. COMPUTATIONAL METHODS Chapter 4 Phase transitions 4.1 Static total energy calculation Static total energy is still the main method of ab initio simulation. These calculations evaluate the energy and stability of an ‘ideal’, zero temperature crystal in which all atoms are located on their lattice positions. Pressure induced phase transitions can be reliably predicted by evaluating the enthalpy (total energy plus PV) for each phase as a function of pressure. At a given pressure, the stable structure is the one which has the lowest minimum enthalpy. The phase transition pressure can also be deduced from the common tangent between curves on a total energy vs volume graph corresponding to the two phases. The transition pressure is given by PT = (F2 − F1 )/(V1 − V2 ) where F1 and F2 are the Helmholtz free energy for phase 1 and 2 respectively (this is identical to the total energy for T = 0). The free energy is minimised with respect to the internal coordinates and unit cell parameters in each phase. One cannot evaluate PT directly from the above equation. So one has to calculate equations of states for the two phases separately, and then compared. The hydrous phases δ-AlOOH (paper XI) have recently been subjected to various studies at high pressure and high temperature [20, 21]. One of the most important hydrous phase is the so called Egg phase, AlSiO3 OH [22, 23]. Recent x-ray diffraction studies at high pressure and high temperature have shown that this Egg phase decomposes into δ-AlOOH and stishovite SiO2 at 23 GPa and 1000◦ C. This decomposition reaction suggests that water stored in the phase Egg can be carried further by δ-AlOOH into the deep lower mantle. The stability field of δ-AlOOH was reported to be from 17 GPa up to at least 25 GPa at around 1000◦ C to 1200◦ C [24]. In our calculation, a phase transition from α-AlOOH to δ-AlOOH was calculated to take place at 17.9 GPa 25 CHAPTER 4. PHASE TRANSITIONS 26 Difference in enthalpy (mRy/atom) 3 δ-AlOOH α-AlOOH 2 1 0 -1 -2 -3 0 10 20 30 40 50 Pressure (GPa) Figure 4.1: The 0 K enthalpy as a function of pressure for two different crystal structures: α-AlOOH and δ-AlOOH. The enthalpy of the αAlOOH phase is taken as the energy zero. The transition from α-AlOOH to δ-AlOOH takes place at 17.9 GPa. and with a volume collapse of 3%, as shown in Fig. 4.1. 4.2 Elastic stability criteria For a cubic crystal with elastic constants C 11 , C12 and C44 , the generalized elastic stability criteria are C 11 + 2C12 > 0, C44 > 0 and C11 − C12 > 0 [25, 26]. The transition metals, Ti, Zr and Hf stabilized in the hcp structure at the ambient conditions. The bcc phase is calculated to be unstable and with a negative C (C = (C11 − C12 )/2). With the increasing pressure, C becomes positive at the V /V0 = 0.73. A high pressure bcc phase is predicted to be stable, this can be understood as an effect of the s → d transfer under compression. This means that Ti behave more like its nearest neighbor V, which has the bcc crystal structure [27] at ambient conditions. 4.3 Bain path The structural path for going from bcc phase to fcc phase within the tetragonal structure is well known as Bain Path [28]. Body-centered and face-centered cubic crystal can be considered as special cases of a √ body-centered tetragonal crystal with c/a = 1 and 2, respectively. Starting with a normally fcc element Ce [29] (Fig. 4.2), and calculating energy as a function of c/a, we obtain two local minimums at c/a = 1.41 4.4. DYNAMICAL STABILITY (PHONON CALCULATION) 27 V/V0=0.57 Total Energy (Ry) -0.7025 V/V0=0.58 -0.706 1.4 1.5 1.6 c/a ratio Figure 4.2: The comparison between the c/a ratio of V /V 0√= 0.57 and V /V0 = 0.58 for Ce. When V /V0 = 0.58, the fcc (c/a = 2) phase is more stable. When V /V0 = 0.57, the bct phase is more stable. and c/a = 1.66. The curvature of E(c/a) around the maximum and the minimum directly correspond to√ C we mentioned above. Before the transition, the fcc phase (c/a = 2) is more stable compared to the bct phase and after the transition, the bct phase starts to win in the total energy as the volume is changing from V /V 0 = 0.58 to V /V0 = 0.57. 4.4 Dynamical stability (phonon calculation) The soft phonon phase transition is one of the best established mechanisms by which a crystal structure can change [30]. In the pressureinduced case, the frequency of a given vibration in the lattice goes to zero as the transition is approached: zero frequency implies that the lattice structure has become unstable, and will transform to a new phase. Considering a system consists of N atoms, the Hamiltonian of the system can then be expressed as [31] H= 1 1 Mi [u̇(i)]2 + φαβ (i, j)uα (i)uβ (j) 2 i 2 ij αβ (4.1) Here mi is the mass of atom i and u(i) is its displacement away from its equilibrium position, while α and β subscripts denote one of the Cartesian components of a vector. φαβ (i, j) is the so called force tensor, which is simply the second derivative of the potential. φαβ (i, j) = ∂2U ∂uα (i)∂uβ (j) (4.2) CHAPTER 4. PHASE TRANSITIONS 28 The substitution e(i) = H= √ Mi u(i) yields 1 φ(ij) ė(i)2 + e(i) e(j) 2 i Mi Mj ij (4.3) We define the dynamical matrix for the system, 1 Dαβ (i, j) = φαβ (i, j) Mi Mj (4.4) which can be constructed from force constant tensor. The size of the dynamical matrix is 3N × 3N . Diagonalizing the dynamical matrix we obtain all of its eigenvalues λm , m = 1 · · · 3N . In the harmonic approximation, the knowledge of these frequencies is sufficient to determine other thermodynamic quantities of the system. For example, the free energy of the system can now be calculated through [32] F = 3N kB T h̄ωm )]. ln[2sinh( N m=1 2KB T (4.5) In a crystal, the determination of the normal modes is somewhat simplified by the translational symmetry of the system. Say n denotes l the number of atoms per unit cell, u is the displacements of atom i l l is the force i in cell l away from its equilibrium position, and Φ i j constant relative to atom i in cell l and atom j in cell l and let e l i = exp [ι2π(k · l)] e 0 i , (4.6) √ where ι = −1, l denotes the Cartesian coordinates of one corner of cell l, and k is a point in the first Brillouin zone. This fact reduces the problem of diagonalizing the 3N × 3N matrix D to the problem of diagonalizing a 3n × 3n matrix D(k) for various values of k. This can be shown by a simple substitution of Eq. (4.6) into Eq. (4.3). The dynamical matrix D(k) to be diagonalized is given by       exp[ι2π(k · l)]  D(k) =   l    Φ √ Φ √ o l 1 1 o l n 1 M1 Mn ··· .. . ··· o l 1 n      M1 Mn  ..  .    o l  Φ  n n Φ M1 Mn .. . √ √ M1 Mn (4.7) 4.5. EQUATION OF STATE 29 As before, the resulting eigenvalues λ(k) for i = 1, · · ·, n give the fre1 λ(k). The function ω(k) for quencies of the normal modes ω(k) = 2π a given i is called a phonon branch, while the plot of the k dependence of all branches along a given direction in k space is called the phonon dispersion curve. In periodic systems, the phonon DOS, which gives the number of modes of oscillation having a frequency lying in the energy interval [ω, ω + dω] is defined as g(ω) = 3n i=1 BZ δ[ω − ωi (k)]dk (4.8) where the integral is taken over the first Brillouin zone. Phonon calculation in Ti was performed by means of PWSCF package (Plane-Wave Self-Consistent Field). PWSCF is a first-principles energy code that uses pseudopotentials (PP) and ultrasoft pseudopoentials (US-PP) within DFT. In contrast to the frozen-phonon method, it includes linear response method, which allows the treatment of arbitrary phonon wave vectors q. The phonon dispersion curves along several of high symmetry k points for the Ti high pressure γ phase is presented. Vohra et al. [33] observed a transformation from an ω phase to an orthorhombic phase (γ phase) at a pressure of 116 ± 4 GPa, and this phase is stable up to 146 GPa. In this pressure range (see Fig. 4.3), our calculated phonon dispersion curves give an imaginary phonon frequency indicating that the γ phase is unstable in the pressure range we calculated, from 119 GPa to 173 GPa. 4.5 Equation of state The equation of state (EOS) of solids is of great importance in basic and applied science. The measurable properties of solids, such as the equilibrium volume (V0 ), the bulk modulus (B0 ) and its first pressure derivative (B0 ) are directly related to the EOS. The high pressure EOS has been represented in various functional forms, for example, the Murnaghan equation, Birch-Murnaghan (BM) equation, universal equation and recently a new equation of state which is appropriate at strong compressions has been put forward by Holzapfel [34, 35]. 4.5.1 Murnaghan equation of state Murnaghan EOS was introduced by Murnaghan et al. in the forties [36]. The E-V form Murnaghan EOS can be represented as, E(V ) = B0 V0 B0 1 B0 −1 V0 V B −1 0 + V V0 − B0 B0 −1 + Ecoh (4.9) CHAPTER 4. PHASE TRANSITIONS 30 16 12 8 4 Frequency (THz) 0 16 12 8 4 0 16 12 8 4 0 Γ Z T Γ Y S R Figure 4.3: The phonon dispersion curves for the γ phase of Ti: from up to down, P=119, 140 and 173 GPa respectively. Ecoh is the cohesive energy and is treated as an adjustable parameter. Since the pressure can be obtained from P (V ) = −∂E(V )/∂V , the Murnaghan equation can be expressed in its usual form P (V ) = B0 B0 V0 V B 0 −1 . (4.10) The bulk modulus is derived through the volume derivative of the equation above, B = −V (∂P /∂V ), B(V ) = B0 4.5.2 V0 V B 0 . (4.11) Birch-Murnaghan equation of state Birch et al. [37, 38] expanded the Gibb’s free energy F in terms of Eulerian strain , with V0 /V = (1 − 2)3/2 . The integrated energyvolume form of the third order BM-EOS, V3 V 7/3 9 B0 [(4 − B0 ) V02 − (14 − 3B0 ) V04/3 E(V ) = − 16 V 5/3 +(16 − 3B0 ) V02/3 ] + E0 (4.12) Using the obtained B0 , B0 and V0 from a least-square fit of the calculated V-E curves to the EOS above, the hydrostatic pressure P was determined 4.5. EQUATION OF STATE 31 from the P-V form of the BM EOS, which is the volume derivative of the former equation. The second order BM-EOS can be written as P (V ) = 1.5B0 V0 V 7/3 − V0 V 5/3 (4.13) While the third order BM-EOS [39] has the analytical form; P (V ) = 1.5B0 · 1+ 3 4 (B0 V0 V − 4) 7/3 − 2/3 V0 V V0 V 5/3 −1 (4.14) The bulk modulus corresponding to Eq. (4.14) is B(V ) = 1.5B0 7 3 V0 V · 1 + 34 (B0 − 4) +1.5B0 4.5.3 V0 V 7/3 − V0 V 7/3 V0 V − 2/3 5/3 5 3 V0 V 5/3 −1 1 2 (B0 − 4) V0 V 2/3 (4.15) Universal equation of state Vinet et al. [40] have reported a universal form the EOS for all classes of solids, such as ionic, metallic, covalent and rare-gas solid, under compression. Their P-V relation can be represented as [41] (1 − x) exp[η(1 − x)] P (V ) = 3B0 x2 (4.16) Here η is fixed in terms of B0 η = 3/2(B0 − 1) (4.17) and x = ( VV0 )1/3 . Poirier [42, 43] has pointed out that the Universal EOS can be obtained by the same derivation as the Birch-Murnaghan EOS, using a strain parameter = (V0 /V )1/3 − 1 and the free energy F = F0 (1 + A)exp(−A) (F0 and A are constants). 4.5.4 Comparison of different EOS for Fe Iron has attracted a lot of attention from geophysicists because it is considered to be the major constituent of the earth core. At low temperature, a Fe bcc (α) - hcp () transition takes place around 13 GPa [44], and the hcp phase is believed to be stable up to the pressure of CHAPTER 4. PHASE TRANSITIONS 32 the inner core. In paper IX, we show that the c/a ratio of Fe increases with increasing pressure and eventually approaches the ideal ratio of 8 3 = 1.633 at extreme pressures. Three different equations of states (as shown in Fig. 4.4) have been used to fit the same set of GGA calculated E-V data set for the hcp phase. Because B 0 and B0 are highly correlated parameters in the Birch-Murnaghan equation of state (EOS) [45], we show the comparison when B0 is taken to be the experimental value 5.8 [46]. These three EOS have similar behavior in the low pressure range, but they start to diverge at a pressure around 150 GPa. The Vinet EOS shows a better agreement with the experimental data of Mao et al. and Dubrovinsky et al. under pressure. All these EOS fitted equilibrium volume (6.14 cm3 /mol) is lower than that obtained from the experimental data (6.73 cm 3 /mol [46]). The treatment of antiferromagnetically ordered structure gives a better equilibrium V 0 =6.35 cm3 /mol [47]. However, none of them can successfully reproduce the experimental equilibrium volume. 500 450 Jephcoat et al. Mao et al. Dubrovinsky et al. Vinet EOS Murnaghan EOS BM EOS Fe 400 Pressure (GPa) 350 300 250 200 150 100 50 0 4 4.5 5 5.5 6 6.5 3 Volume (cm /mol) Figure 4.4: Comparison between the experimental and theoretical EOS using three different EOS for hcp Fe. The filled circle data points are experiments from Mao et al. [48] up to 304 GPa without medium. The square data points correspond to 300 K x-ray diffraction measurements with Ar and Ne medium up to to 78 GPa [49]. The dot-dashed line is the latest data from Dubrovinsky et al. [50]. The Murnaghan, Birchmurnaghan and Vinet EOS are denoted by dashed, dotted and solid line respectively. Chapter 5 Semiconductor optics 5.1 Dielectric function Materials having an energy band gap, Eg , in the range 0 < Eg ≤ 4 eV are called semiconductors and those where having a gap E g ≥ 4 eV are insulators [51]. Semiconductors with a gap approximately below or near 0.5 eV are named as narrow-gap semiconductors; on the other hand, materials with a gap between 2 eV and 4 eV are called wide-gap semiconductors. If Eg is close to zero, they are called semimetals, such as TiC. It is known that the measurement of optical properties is helpful to explain the electronic structure of materials. The knowledge of the refractive indice and absorption coefficient of semiconductors is especially important in the design and analysis of heterostructure lasers and other semiconductor devices [52]. The dielectric function, ε(w) = ε1 (w) + iε2 (w), fully describes the optical properties of medium at all photon energies, h̄ω. The (q = 0) dielectric function can be calculated in the momentum representation, which requires matrix elements of the momentum, p, between occupied and unoccupied eigenstates. To be specific, the imaginary part of the dielectric function, ε2 (w) = Imε(q = 0, w), can be calculated from εij 2 (w) = 4π 2 e2 Ωm2 w 2 knn σ < knσ|pi |kn σ >< kn σ|pj |knσ > ·fkn (1 − fkn )δ(ekn − ekn − h̄w). (5.1) In Eq. (5.1), e is the electron charge, m is its mass, Ω is the crystal volume, and fkn is the Fermi distribution. Moreover |knσ is the crystal wave function corresponding to the nth eigenvalue with crystal momentum k and spin σ. With our spherical wave basis functions, the matrix elements of the momentum operator are conveniently calculated in spherical coordinates and for this reason the momentum is written in 33 CHAPTER 5. SEMICONDUCTOR OPTICS 34 √ p = µ e∗µ pµ , where µ is -1, 0, or 1, and p−1 = 1/ 2(px − ipy ), p0 = pz , √ and p1 = 1/ 2(px + ipy ). The evaluation of the matrix elements in Eq. (5.1) is done over the muffin-tin region and the interstitial separately. The integration over the primitive cell is done in way similar to what Oppeneer [53] and Gasche [11] did in their calculations. The summation over the Brillouin zone in Eq. (5.1) is calculated using linear interpolation on a mesh of uniformly distributed points, i.e., the tetrahedron method. Matrix element, eigenvalues, and eigenvectors are calculated in the irreducible part of the Brillouin-zone. The correct symmetry for the dielectric constant is obtained by averaging the calculated dielectric function. Through the Kramers-Kronig relations, we have derived the real part of the dielectric function ε1 . ε1 (w) = 1 + 1 π ∞ 0 dω ε2 (ω )( ω 1 1 + ) −ω ω +ω (5.2) The relation between the dielectric function and the complex refractive index N = n + ik is given by ε1 = n2 − k2 (5.3) ε2 = 2nk (5.4) and Given n and k, we can derive the normal-incidence reflectivity R R= (n − 1)2 + k2 (n + 1)2 + k 2 (5.5) and the absorption coefficient α α= 5.2 4πk λ (5.6) Dielectric function of PbWO4 Under the ambient conditions, lead tungstate has two stable crystallographic structures, raspite and scheelite. For raspite, with a monoclinic structure, the total dielectric function is composed of three different dielectric functions along the a, b and and c axis. But for scheelite, having a tetragonal structure, we only need to average over two components to get the total dielectric function, namely the components corresponding 5.2. DIELECTRIC FUNCTION OF PBWO4 35 to light polarized parallel and perpendicular to the c axis. In this case the total, orientation averaged ε2 is given by εtot 2 (w) ε (w) + 2ε⊥ 2 (w) = 2 3 (5.7) ⊥ In the discussion that follows we will refer to ε ij 2 (w) as ε2 (w) when i=j=x and as ε2 (w) when i=j=z. 20 6 5 4 3 15 10 (a) scheelite PbWO4 A↑ ↑ B 3.3 3.4 3.5 ε2 5 0 (b) raspite PbWO4 3 2 15 10 0 experiment calculation C↓ 1 2.6 2.8 3 5 0 0 5 10 15 20 25 PHOTON ENERGY (eV) Figure 5.1: The imaginary part of the dielectric function for both scheelite (a) and raspite structure (b) of PbWO 4 . The experimental data are from Itoh et al. [54]. The inserts show an expanded part of ε 2 . In Fig. 5.1, we show the averaged ε2 for both scheelite and raspite structure. Our calculated dielectric function agrees very well with the experimental data even without any broadening. From the experimental dielectric function, we can see the energy gap, around 3.5 eV acts as a threshold for interband excitations for both structures. In the scheelite structure, the doublet peaks observed by Shpinkov et al. [55] and Itoh et al. can be clearly seen at 3.30 eV and 3.44 eV from our calculation. The sharp intensive experimental peak at 4.18 eV which these two doublet peaks contribute to was reproduced by a rather prominent calculated peak at 3.35 eV. According to the selection rule, l = ±1, only such transitions that change of the angular momentum quantum number of 1 are allowed. These two peaks in the calculated spectrum can be assigned to Pb s → p interband transitions. In the raspite structure, most features of the measured data are well reproduced by our calculations. 36 CHAPTER 5. SEMICONDUCTOR OPTICS The weak peak at 3.75 eV was reproduced by a calculated peak at 2.95 eV in Fig. 5.1 (b). Since the energy gap was underestimated by around 1 eV in the LDA approximation, and if we shift the calculated curve by 1 eV, the agreement will be even better. 5.3 Solar energy materials Solar cells are devices which convert solar energy into electricity, either directly via the photovoltaic effect, or via the intermediate of heat or chemical energy. The ideal solar energy cell is required to have a band gap in the visible light region as well as to have high absorption in the visible region. CuInSe2 (CIS) has a band gap of only 1 eV, with Ga addition to CIS, forming the CuIn1−x Gax Se2 (CIGS) alloy, the gap is raised, and thus increases the open circuit voltage [56]. At present, the putatively best CIGS solar cells are made with 30% doping of Ga [57]. The effect of the Ga doping to CuInSe2 can be observed in the change of the band gap [58] Eg (x) = (1 − x)Eg (CIS) + xEg (CGS) − bx(1 − x), (5.8) b=0.21 was given by Wei et al. [56] CIS exhibits a direct band gap at Γ point, which indicates that the photon energy is directly converted into the creation of electron/hole pairs in the semiconductor material. This is preferable to the material that exhibits an indirect band gap, where there is some energy loss due to the creation of phonons. The band gap in CIS is 1.04 eV [59], and 1.68 eV [59] in CGS, according to Eq. (5.8) CuIn0.75 Ga0.25 Se2 , CuIn0.5 Ga0.5 Se2 should have the band gap around 1.16 eV and 1.31 eV respectively. Although the chalcopyrite structure resembles to the zinc-blende structure, the band gaps of the ternary (I-III-VI2 ) semiconductors are only less than half of their binary analogs (II-VI). This band gap anomaly makes CIS one of the most known absorbers in the solar spectrum. The p-d hybridization and structure anomaly attribute to the anomaly in the band gap [59]. From upper panel of Fig. 5.2, we can easily observe the opening of the band gap with Ga addition to CuInSe2 . The band gap is directly obtained from calculation without any shift. CIS has a high optical absorption coefficient, which provides information about optimum solar energy conversion efficiency. The absorption coefficient of a material indicates how far light of a specific wavelength (or energy) can penetrate into the material before being absorbed. 5.3. SOLAR ENERGY MATERIALS 12 37 E⊥c 10 CuInSe2 CuIn0.75Ga0.25Se2 CuIn0.5Ga0.5Se2 8 CuGaSe2 6 4 ε2 2 0 12 E || c 10 8 6 4 2 0 2 4 8 6 PHOTON ENERGY (eV) Figure 5.2: The imaginary part of the dielectric function of CuInSe 2 , CuIn0.75 Ga0.25 Se2 , CuIn0.5 Ga0.5 Se2 and CuGaSe2 for both E⊥c and Ec. 8 5 Absorption coeifficient (×10 ) E⊥ c CuInSe2 6 4 2 0 8 E || c 6 4 2 0 0 1 2 3 Energy (eV) 4 5 Figure 5.3: The absorption coefficient of CuInSe 2. The experimental data and theoretical results are denoted by dashed and solid line respectively. The experimental data are taken from Kawashima et al. [60]. 38 CHAPTER 5. SEMICONDUCTOR OPTICS A small absorption coefficient means that light is not readily absorbed by the material. The depth of penetration (1/α = d in this case) is defined by the distance at which the radiant power decreases to 1/e of its incident value. The fundamental absorption corresponds to a strong absorption region which is in order of 105 cm−1 to 106 cm−1 . The fundamental absorption area is manifested by the rapid rise in absorption and is used to determine the energy gap of the semiconductor. In Fig. 5.3, the interband transitions start at around 1 eV, and CuInSe 2 shows a high absorption coefficient up to 8 × 105 cm−1 in the energy range where we are interested in. Chapter 6 MAX phases 6.1 MN+1 AXN phase MN+1 AXN (MAX) (N=1 to 3) phases are a series of ceramics but with a combination of ductility, conductivity and machinability comparable to metals. M is an early transition metal, A is an A-group element (mostly IIIA and IVA) and X is either C or N. These phases have hexagonal layered structures and belong to the space group P6 3 /mmc, wherein MN+1 XN layers have the rock salt structure interleaved with pure layers of the A-group elements (Fig. 6.1). The structures of the vast majority of these compounds were determined by Nowotny [61] and co-workers in the sixties. Up tp now, there are roughly fifty M 2 AX phases, three M3 AX2 and one M4 AX3 phases known [7] (Table 6.1). Figure 6.1: Crystal structures of 211, 312 and 413. 39 CHAPTER 6. MAX PHASES 40 Table 6.1: Known MAX phases 211 Ti2 AlC Nb2 AlC Nb2 SnC Zr2 PbC Hf2 SC Nb2 SC Sc2 InC Ti2 CdC Ti2 AlN (Nb,Ti)2 AlC Ti2 PbC Nb2 PC Ti2 GaN Cr2 GaN Hf2 SnN Hf2 InN Ti3 AlC2 312 Ti3 SiC2 413 Ti4 AlN3 6.2 Ti2 GeC Zr2 SnC Hf2 PbC Ti2 AIN0.5 C0.5 Ti2 GaC V2 GaC Ti2 InC Zr2 InC Cr2 AlC Ta2 AlC Cr2 GaC Nb2 GaC V2 GaN V2 GeC Ti2 TlC Zr2 TlC Ti3 GeC2 Hf2 SnC Zr2 SC V2 AsC Nb2 InC V2 AlC Mo2 GaC Ti2 InN Hf2 TlC Ti2 SnC Ti2 SC Nb2 AsC Hf2 InC V2 PC Ta2 GaC Zr2 InN Zr2 TlC Phase stability in Ti-Si-C system In the paper XII, we presented the formation energy calculation for Ti-Si-C system. The phase stability has been predicted by comparing the cohesive energy of the MAX phase with the cohesive energy of the competing equilibrium phases at corresponding composition as given by the phase diagram in Fig. 6.2. All the calculations have been carried out on stoichiometric phases without consideration to homogeneity ranges (e. g. TiCx ; x=1 and Ti5 Si3 Cx ; x=0). Ti3 SiC2 is the only ternary phase reported to exist in this system. Figure 6.2: Phase diagram at 1250◦ C for the Ti-Si-C system [62] 6.2. PHASE STABILITY IN TI-SI-C SYSTEM 41 The phase diagram shows that the competing phases for Ti 4 SiC3 , Ti5 SiC4 and Ti7 Si2 C5 are Ti3 SiC2 and TiC, while the competing phases for Ti2 SiC and Ti5 Si2 C3 are Ti3 SiC2 , TiSi2 and Ti5 Si3 (in reality Ti5 Si3 Cx ). Table 6.2 lists the cohesive energy per atom (Ecoh) for each of the calculated MAX phases and for the competing equilibrium phases. The stability of a given MAX phase is determined by the energy difference (∆E) between the MAX phase and its competing phases. A negative ∆E indicates a stable phase. A positive ∆E suggests that it will decompose or not formed at all in favor for the competing phases. From Table 6.2, it can be seen that there is a very small, but negative, energy difference of -0.008 eV/atom, between the 211 phase and its competing phases. This suggests that the 211 could be stable, but it should be noted that the calculated energy difference is so small that it is approaching the accuracy of the calculations. This phase may be metastable and can be synthesized as thin films. A more significant negative energy difference is calculated for the 413 compound with −0.029 eV/atom. This suggests that the 413 phase actually is stable. For the 514 compound, the calculated energy difference is clearly positive, +0.037 eV/atom and this phase should therefore not be stable. The calculations of the new MAX phase structures, 523 and 725, show that the energy difference is positive compared with the competing phases; +0.007 eV/atom for the 523 compound (again, this energy difference approaches the accuracy of the calculations) and +0.030 eV/atom for the 725 compound. This suggests that both the observed inter-grown phases should not be stable. However, it should be noted that even though ∆E > 0 the calculated energy differences are very small and that the compound still may be formed under metastable conditions. Table 6.2: Formation energy in Ti-Si-C system Si/Ti decompositions Ti2 SiC 0.5 0.75Ti3 SiC2 +0.107TiSi2 +0.1429Ti5 Si3 Ti3 SiC2 0.33 0.75Ti3 SiC2 + 0.25 TiC Ti4 SiC3 0.25 Ti5 SiC4 0.2 0.6Ti3 SiC2 + 0.4 TiC 0.4 0.9Ti3 SiC2 + 0.0429 TiSi2 + 0.057 Ti5 Si3 Ti5 Si2 C3 0.8571Ti3 SiC2 + 0.1429 TiC Ti7 Si2 C5 0.286 ∆E -0.0076 -0.0288 0.0373 0.0359 0.0278 CHAPTER 6. MAX PHASES 42 6.3 Chemical bonding in 312 phases Three types of bonding, namely, metallic, covalent and ionic contribute to the bonding in MAX phases. The high electrical conductivity is attributed to the metallic bonding parallel to the basal plane (Ti I and TiII ) and high bulk modulus is attributed to the strong Ti-C covalent bond. The calculated balanced crystal orbital overlap (BCOOP) [63] is used as a tool to study the chemical bonding in the Ti-Si-C system. BCOOP can easily indicate the covalent bonding between two types of orbitals. In Ti3 SiC2 , we are interested in the bonding between α 1 : Ti 3d states and α2 : C 2p states BCOOPα1 ,α2 = α1 |α2 δ( − n (k)) α α |α n,k (6.1) Here n (k) is the Kohn-Sham eigenvalue, each eigenvector can be de composed into non-orthogonal contributions |n, k = α |α, and |α = i ci (n, k) |i. The denominator in Eq. (6.1), α α1 |α2 , is introduced to balance the bonding and antibonding states. BCOOP has positive value for bonding states and negative value for the antibonding states, the intensity of peaks and areas gives an indication of the strength of the bonding. 0.4 Ti I-C Ti II-C Ti II-A 0.2 0.0 Ti3SiC2 -0.2 -0.4 0.4 Ti3AlC2 0.2 BCOOP (1/eV) 0.0 -0.2 -0.4 0.4 Ti3GeC2 0.2 0.0 -0.2 -0.4 0.4 TiC 0.2 0.0 -0.2 -0.4 -6 -4 -2 0 2 4 6 E-EF (eV) Figure 6.3: BCOOP for Ti3 SiC2 , Ti3 AlC2 , Ti3 GeC2 and TiC. 6.4. XAS AND XES CALCULATION 43 In Fig. 6.3, the area under the TiII -C peaks is larger than the area under TiI -C peaks indicates that TiII -C bond is stronger than TiI -C bond. While TiII -Al BCOOP located closer to the fermi level compared with TiII -Ge and TiII -Si suggests that TiII -Al bond is weaker than the other two types of bonds. This can easily be understood from the electronic configuration. Al has three valence electrons instead of four valence electrons in Si and Ge, which should form less strong covalent bond because of less saturated bonds. 6.4 XAS and XES calculation The X-ray absorption (XAS) and X-ray emission (XES) in paper XIV has been calculated using WIEN2K [64] code. The electric-dipole approximation has been employed, which means that only the transitions between the core states with angular momentum l to the l ± 1 components of the conduction bands have been considered. In Paper XIV, we show the calculated XES spectra of Ti 3 SiC2 , Ti3 AlC2 and Ti3 GeC2 and TiC. The calculated 3d DOS was projected by 3d, 4s → 2p dipole transition matrix elements. We may notice that Ti3 AlC2 shows a much more pronounced double peak structure compared with Ti3 SiC2 and Ti3 GeC2 (Fig. 6.4). There is an extra peak located at -1 eV below the fermi level for Ti3 AlC2 . To understand the orgin of this special double-structure in Ti3 AlC2 , we plot the band structure for these three phases (as shown in Fig. 6.5). A flat band between L to M, and K to H around -1 eV corresponds to a high density of state in DOS, and this originates from Si p state. The extra peak at -1 eV in Fig. 6.4 could due to the Ti-Si hybridization. The other flat band between K to H symmetry points attributes to the higher DOS of Ti at EF in Ti3 AlC2 . 6.5 DOS with electrical conductivity The density of states at Fermi level N(E F ) in the simplest approximation is directly related to the electrical conductivity. Our calculated N(E F ) for 211, 312, 413 and 514 phases are 0.36, 0.33, 0.29 and 0.25 states/eV per atom, respectively. This can be compared to TiC, which has a pseudo gap at the Fermi level with N(EF ) close to 0.1 states/eV per atom, showing only weak metallic behavior. A trend of decreasing N(E F ) in the sequence of 211, 312, 413 and 514 compounds can be seen as decreasing metallicity of MAX phases with increasing number of n. A calculated N(EF ) = 3.96 states/eV per unit cell in 312 is in very good CHAPTER 6. MAX PHASES 44 L3 Ti I + Ti II Ti3SiC2 Ti3AlC2 Ti3GeC2 TiC L2 Intensity (arb. units) -20 -15 -10 -5 0 5 10 -5 0 5 10 -5 0 5 10 E-EF (eV) Ti II -20 -15 -10 -15 -10 E-EF (eV) Ti I -20 E-EF (eV) Figure 6.4: Calculated Ti L edge XES spectra of Ti 3 SiC2 , Ti3 AlC2 and Ti3 GeC2 and TiC for TiI , TiII and the sum. 2 1 0 -1 Energy (eV) -2 2 1 0 -1 -2 2 1 0 -1 -2 ΓA LM Γ KH A Figure 6.5: Band structures of Ti3 SiC2 , Ti3 AlC2 and Ti3 GeC2 . 6.5. DOS WITH ELECTRICAL CONDUCTIVITY 45 4 DOS (eV/states unit cell) Ti3SiC2 TiI TiII 3 2 1 0 -15 -10 -5 0 5 10 15 E-EF (eV) Figure 6.6: TiI and TiII type of DOS in Ti3 SiC2 agreement with experimental data of 4.42 states/eV per unit cell [66] derived from heat capacity data. All Tin+1 SiCn (n=1 to 4) MAX-phase films show excellent conducting properties (see Table 6.3). This is in good agreement with the DFT calculations, which show a relatively high DOS at Fermi level for all these compounds. The electrical conductivity properties of Ti n+1 SiCn should approach TiC with increasing number of Ti layers. Zhou et al [65] suggest that the difference in charge density distribution between TiI and TiII layers indicate that the TiII layers contribute more to the electrical conductivity than TiI layers. We also observe this from different contribution to DOS at EF from TiI and TiII , as shown in Fig. 6.6 for Ti3 SiC2 . Therefore, the number of TiII layers per unit cell plays an important role in the electrical conductivity. The highest calculated N(E F ) in the Tin+1 SiCn system suggests that 211 has higher conductivity than the other MAX phases, which is also consistent with that it only contains TiII type. As shown in Table 6.3, the ratio of TiII /Ti in one unit cell are Table 6.3: Density of state at fermi level (N EF ) and electrical resistivity. TiII /Ti TiC Ti2 SiC Ti3 SiC2 Ti4 SiC3 Ti5 SiC4 1 0.667 0.5 0.4 N(EF ) 0.1 0.36 0.33 0.29 0.25 Resistivity(µΩcm) 200-260 25-30 50 - CHAPTER 6. MAX PHASES 46 1 (4/4), 0.667 (4/6), 0.5 (4/8), 0.4 (4/10) in the sequence of 211, 312, 413 and 514, suggesting a decrease of the electrical conductivity with increasing number of n. 6.6 Optical properties In metals, optical absorption occurs through two processes. One is the intraband transition, the excitation of the electrons at the fermi level. The Drude term represents a phenomenological way to describe the intraband transition, which contributes at low energies [67]. The second process is interband transitions, i.e. the excitation of electrons from an occupied band to an empty band. These two contributions combined to give the total optical response. Drude term is composed of two parts: relaxation time and plasma frequency. 1) Relaxation time. This plays a fundamental role in the theory of metallic conduction. We pick an electron randomly in the free electron gas, on the average, it travels for a time τ before its next collision. The relaxation time can be estimated via the resistivities ρ and electron denm −14 to 10−15 sec sity n, τ = ρne 2 . At room temperature, τ is typically 10 [68]. Although there is no formally correlation between the relaxation times characterizes the (longitudinal) electrical conductivity and relaxation obtained in the Drude expression (describing transverse response), we believe that these two relaxation time are strongly correlated to each other. The inverse of τ , i.e. the collision frequency, often given the symbol Γ is a measure of the broadening of the the phenomenological Drude feature. 2) Plasma frequency. For the free electron gas ofdensity n, the os2 cillations of the electron plasma have frequency, ω p = 4πne m . The ωp is the frequency where the real part of the dielectric function goes through zero from below, and the imaginary part approaches zero from above. A sharp reflectance drop at ωp is a characteristic for high conductance metal. It is known TiN has a high reflectivity in the infrared, and a low reflectivity for shorter wavelengths. It is this property makes TiN a promising material for solar energy applications. The low reflectance in the region of blue and violet light (2.8-3.5 eV) for TiN renders it goldlike color [70]. With Al addition to TiN, the reflectivity decreases dramatically in the infrared region and increase in the visible light region (as shown in Fig. 6.7). The decrease of the reflectivity in the infrared region is because of lower plasma frequency. The dip shifts from 2.8 6.6. OPTICAL PROPERTIES 47 TiC TiN Ti3SiC2 Ti4AlN3 0.8 REFLECTIVITY 0.6 0.4 0.2 0 1.5 2 2.5 3 3.5 4 4.5 ENERGY (eV) Figure 6.7: Reflectivity for Ti3 SiC2 and Ti4 AlN3 . The experimental data for TiC and TiN are taken from Fuentes et al. [69]. eV to 3.7 eV, i.e. outside the region of visible light. This shift is not good for thermal solar collector applications, which require high solar absorption, i.e. low reflectance in the range 1.5-3.5 eV. To minimize radioactive losses the collector surface should simultaneously exhibit low thermal emittance at the working temperature, i.e. high reflectance in the infrared region. As just mentioned the alloying of aluminum into TiN annihilates both of these optical advantages, but with maintained mechanical strength as well as thermal and chemical inertness. This point makes another technical application for Ti 4 AlN3 . The reflectivity minimum 0.3 (30%) for Ti4 AlN3 is higher than 0.2 (20%) for pure TiN. It can therefore be used to avoid solar heating on space-crafts and also increase the radioactive cooling due to the increased thermal emittance compared to TiN [71]. The MAX-phases are therefore candidate materials for coatings in future space-missions to Mercury. The reflectance of Ti3 SiC2 shows similar behavior with TiC, with almost constant value in the region we have studied. The constant reflectance in the visible light region makes Ti3 SiC2 look metallic grey. It is known that in TiC the interband band transition occurs at low energies even less than 0.1 eV [72], there is almost no free-electron like region. In contrast, TiN exhibits a free-electron like region, below 2.5 eV, with high and constant reflectance [73]. Early band structure calculations by Neckel et al. [74] explained different onset of transition energy for TiC and TiN. The position where E F situated is the key to the onset of interband transition energy or plasma energy. In TiN, EF is located at the metal Ti-d dominated states, the free-electron like behavior comes from the d electron-gas. While in TiC, C has one electron less than N, EF moves down to the minimum of DOS, it becomes semi- CHAPTER 6. MAX PHASES 48 30 25 Ti3SiC2 C-p Ti-d DOS (States/eV unit cell) 20 15 10 5 0 30 Ti4AlN3 N-p Ti-d 25 20 15 10 5 0 -20 -15 -10 0 -5 Energy (eV) 5 10 15 Figure 6.8: Density of states for Ti3 SiC2 and Ti4 AlN3 . metal. The plasma energy is proportional to the position of E F above the DOS minimum. In Fig. 6.8, we plot the density of states for Ti 3 SiC2 and Ti4 AlN3 , We can observe that as Si addition to TiC, E F moves up to higher energy [75]; while as Al addition to TiN, E F moves down to the bottom of DOS valley [76]. This indicates that Ti 3 SiC2 should have higher plasma energy also higher conductivity than Ti 4 AlN3 . 6.7 Surface energy Surface energy is one of the fundamental properties in the surface science. In the Ti-Si-C system, surface energy calculations for the (0001) surface have been made. The surface energy for TiC (111) was used as a reference to compare the the Ti-C bond strength between TiC and the Ti-Si-C system. Because MAX phases have the layered hcp structure along the [111] direction of the TiC, if we stack fcc TiC along [111] direction, and replace a single layer of Si with C, we will get the hcp Ti3 SiC2 structure. Due to different bond strength between Ti-C and Ti-Si bond, the atom positions are slightly rearranged along the z direction in Ti3 SiC2 compared with TiC. In order to study the (0001) surface energy of the Ti-Si-C system, it would be very important to look at the surface energy in TiC. Firstly, we compared the calculated surface energy for the unpolar (001) surface of TiC with other existing results. The basis vector for fcc was represented using a primitive tetragonal basis (1/2, -1/2, 0) (1/2, 1/2, 0) (0 0 1). The resulting surface energy 2.26 J/m 2 agrees well with 2.254 J/m2 reported by Arya et al. [77], which shows that our calculations should be reliable. The Ti terminated surface has the lowest energy for the polar TiC 6.7. SURFACE ENERGY 49 (111) surface, while the C surface terminations yield much high surface energies. A calculated Ti terminated (111) surface energy E f = 3.122 J/m2 was reported by Arya et al. [77]. The anisotropy in fcc TiC can be described by the ratio γ100 /γ111 [78], a ratio of 1 gives a perfect isotropic structure. A ratio 1.875 for TiC indicates that it is strongly anisotropic. In order to study the Ti-C bond strength in TiC, we take the Ti and C terminated surface. The calculated average surface energy 5.4 J/m 2 is much higher than the result of Arya et al., which indicates that the C terminated surface might have even higher surface energy. The (0001) surface energy in the Ti-Si-C system was calculated by inserting vacuum layers with the thickness 12 atomic layers (1 lattice parameter along z direction). As we know, there are three types of bonding TiI -C, TiII -C and Ti-Si, we insert the vacuum at different position to break the different types of bonds. The average of all these three types of surface energy is the average surface energy of the (0001) plane, E= Evac − Ebulk . 2 (6.2) where Evac is the total energy of surface slab plus vacuum layers and Ebulk is the bulk energy. To get reliable surface energies, we have to converge our surface energies with respect to k-points and vacuum layers. In this calculation, we have checked convergence up to 24 vacuum layers. The average surface energies are shown in Table 6.4. Our calculated average surface energy is strongly correlated to the bond strength. The relation between bulk modulus and the bond strength is illustrated, one can see from Table 6.4, the bulk modulus increases from 205 to 245 with increasing bond strength. But all these MAX phases is softer than TiC because of the much weaker Ti-Si bond. The Ti-C (both Ti II -C and TiI -C) bond is calculated to be much stronger than the Ti-Si bond. The TiII -C type bond is slightly stronger than the Ti I -C type bond, and the TiI -C bond strength is similar to the Ti-C bond in TiC. Table 6.4: The surface energy (eV) and bulk modulus (GPa) in the Ti-Si-C system. Ti-Si TiC 211 312 413 1.593 1.585 1.583 TiI -C 3.052 3.083 3.317 TiII -C 3.330 3.583 3.586 γs 3.052 2.462 2.750 2.951 B (GPa) 289 205 233 245 CHAPTER 6. MAX PHASES 50 6.8 Ductility Crystalline materials divide into two categories depending on their number of slip planes. Materials have a large multiplicity of easy glide slip demonstrate significant ductility, and the dislocation activity in this system is irreversible. Meanwhile, materials that exhibit limited amounts of slips are generally brittle (e.g. ceramics) [79], and constrain their use in a number of technological applications. One criterion proposed by Paugh for isotropic materials is the ratio between B (bulk) and G (shear modulus). There B represents the resistance to fracture, while G represents the resistance to plastic deformation. The critical value around 1.75 differentiates ductile from brittle materials [80]. An approximation to calculate the elastic properties for cubic structure from Grüneisen constant was introduced by Korzhavyi et al. [81]. We take the simple expression for the determination: γ = −1 − V ∂ 3 E/∂V 3 2 ∂ 2 E/∂V 2 (6.3) E is the total energy, which can take the integrated form of the third order BM-EOS, V3 V 7/3 9 B0 [(4 − B0 ) V02 − (14 − 3B0 ) V04/3 E(V ) = − 16 V 5/3 +(16 − 3B0 ) V02/3 ] + E0 (6.4) Then we can derived the γ at V = V0 1 1 γ = B − , 2 2 (6.5) This γ is exactly the Dugdale-MacDonald Grüneisen constant, which is proved to lie closest to the that determined from ab initio calculation [82]. The relation between the Grüneisen constant and Poisson’s ratio is σ= 4γ − 3 6γ + 3 (6.6) The ratio between B and G can be determined through Poisson’s ratio 2(1 + σ) . (6.7) B/G = 3(1 − 2σ) Our calculated Poisson’s ratio is in very good agreement with the ab initio value 0.25 calculated by Holm et al. [83] and in reasonable 6.8. DUCTILITY 51 Table 6.5: Comparison between TiC, Ti2 SiC, Ti3 SiC2 and Ti4 SiC3 . for bulk modulus (B0 ), first pressure derivative of bulk modulus (B 0 ), shear modulus (G), Young’s modulus (E) and Poisson’s ratio (σ). B0 B0 G E σ B/G TiC 289 3.892 183 454 0.238 1.578 211 205 4.043 120 302 0.254 1.703 312 233 4.045 137 343 0.255 1.704 413 245 4.069 142 357 0.257 1.725 agreement with the experimental value 0.20 [84]. In Table 6.5, we list the B/G ratio in the sequence of TiC, Ti2 SiC, Ti3 SiC2 and Ti4 SiC3 . It is well known that TiC is quite brittle. We can observe the pronounced change of B/G with Si addition to TiC and this makes it become more ductile. However, in our calculation, the B/G is very sensitive to the fitting parameter B and the slight increase or decrease of B can affect the ratio. Therefore to get reliable values for B/G, elastic constants calculations have to be carried out for this system. 52 CHAPTER 6. MAX PHASES Chapter 7 Sammanfattning på svenska Walter Kohn fick nobelpris i kemi 1998 för sina insatser inom elektronstrukturteorin. Kohns vetenskapliga arbeten har gjort det möjligt för kemister och fysiker att beräkna fundamentala egenskaper hos molekyler och fasta ämnen med hjälp av datorer, utan att behöva göra några som helst experiment i laboratoriet. Redan under 1930-talet var fysiker i full fart med att utarbeta de kvantmekaniska ekvationer som bestämmer uppförandet hos ett system med många elektroner. Tyvärr kunde de inte lösa dessa ekvationer utom för de allra enklaste fallen. De teoretiska fysikerna utvecklade en mängd approximationsmetoder, men ingen av dem var tillräckligt slagkraftig eller tillräckligt enkel att genomföra. 1964 bevisade Kohn tillsammans med Pierre Hohenberg en hypotes som sedan blev central för deras lösning till elektronproblemet, något som idag kallas för densitetsfunktionalteori (DFT). DFT skiljer sig från de traditionella kvantkemiska metoderna och ger inte en korrelerad N-kroppars vågfunktion. Många av de kemiska egenskaperna hos molekyler och de elektroniska egenskaperna hos fasta ämnen bestäms av elektroner som växelverkar mellan varandra och med atomkärnorna. Enligt en tidig version av DFT som Kohn utarbetade tillsammans med Sham var det tillräckligt att känna till medeltätheten för elektronerna i rummets alla punkter för att entydigt bestämma den totala energin, och därigenom en mängd andra egenskaper hos systemet. DFT-teorin är i grunden en s.k. en-elektronteori och uppvisar många likheter med Hartree-Fock-teorin. DFT har kommit att bli den dominerande metoden under det sista årtiondet, varande den som är potentiellt mest kapabel till att leverera noggranna resultat till låga kostnader. Med hjälp av den allra senaste formuleringen av densitetsfunktionalteorin har stora framsteg gjorts vad beträffar beräkning av mekaniska och elektroniska egenskaper hos fasta ämnen. Olika approximationer 53 54 CHAPTER 7. SAMMANFATTNING PÅ SVENSKA vad beträffar behandlingen av de utbytes-korrelationfunktionaler, som används inom densitetsfunktionalteorin för grundtillstånd och exciterade tillstånd har lagts fram, exempelvis lokaldensitetsapproximationen (LDA), generaliserande gradient approximationen (GGA), LDA+U och GW-approximationen. Mängder av tillämpningar inom materialmodellering i allmänhet liksom för nanotuber, kvantprickar och molekyler (även artificiella) har genomförts. Eftersom teorin har utvecklats mycket snabbt och nått en sådan avancerad nivå har tiden nu har blivit mogen för ett teoribaserat angrepp vad beträffar support och supplement till experiment. Denna utveckling har också fått stor hjälp genom den fortsatta förbättring av kraftfulla datorer som har gjort det möjligt att beräkna materialegenskaper med en imponerande noggrannhet. Huvudtemat i denna avhandling är att använda mycket noggranna teoretiska ab initio-metoder för att förutsäga materialegenskaper och söka efter nya teknologiskt användbara material. Nyligen har monolagrade ternära föreningar M N+1 AXN , där N=1,2 och 3, M en tidig övergångsmetall, A är ett element från A-gruppen (huvudsakligen III A och IV A), och X är antingen kol och/eller kväve, dragit till sig ett alltmer ökat intresse på grund av deras unika egenskaper. De temära karbiderna och nitriderna kombinerar egenskaper hos både metaller och keramer. Liksom metallerna är de goda termiska och elektriska ledare med elektriska och termiska konduktiviteter varierande från 0.5 till 14×106 Ω−1 m−1 , och från 10 till 40W/m·K, respektive. De är relativt mjuka med en Vickers hårdhet på omkring 2-5 GPa. På samma sätt som keramer är de elastiskt styva. Några av dem såsom Ti3 SiC2 , Ti3 AlC2 och Ti4 AlN3 uppvisar även excellenta mekaniska egenskaper vid höga temperaturer. De motstår termisk chock och är ovanligt tåliga gentemot skador, och uppvisar utmärkt korrosionsbeständighet. Framför allt, till skillnad från konventionella karbider och nitrider, kan de formbehandlas med konventionella verktyg utan smörjmedel, vilket har stor praktisk betydelse för användandet av MAX-faserna. De ovan nämnda egenskaperna gör MAX-faserna till en ny familj av teknologiskt viktiga material. Systematiska studier av MAX-faserna vad beträffar elektronstruktur, bindning, elastiska och optiska egenskaper har utförts i denna avhandling. Elektronstrukturen och bindningsegenskaper hos dessa fasta ämnen är nyckeln till att exploatera egenskaperna hos MAXfaserna. Avhandlingen är uppdelad enligt följande. Sektion 2 beskriver huvuddragen hos densitetsfunktionalteorin. Sektion 3 beskriver de beräkni ngsmetoder som jag har använt för mina beräkningar. Mina forskningsresultat är indelade i tre delar: 1) Fasövergångar och relaterade egenskaper såsom fasstabilitet och 55 tillståndsekvationer, vilket behandlas i kapitel 3. 2) Beräkning av linjära optiska egenskaper hos vissa halvledare, såsom solcellsmaterialen CuIn(Ga)Se2 och den scintillerande kristallen PbWO 4 . 3) I kapitel 5 behandlas tillämpningar av densitetsfunktionalteorin på MAX - faserna, inkluderande deras elektroniska, bindnings - , mekaniska och optiska egenskaper. 56 CHAPTER 7. SAMMANFATTNING PÅ SVENSKA Acknowledgments The work presented above was made possible by support of the Condensed Matter Theory Group (Fysik IV) at the Uppsala University (UU) under the supervision of Docent Rajeev Ahuja. Many other colleagues in the group have greatly contributed to my work and enriched my life. Words are not enough to express my cherishment of all the memorable moments of my stay in Fysik IV. I would like to extend my sincere gratitude to all those that had given me a helpful hand in the past four years. Among them, I am especially grateful to: Docent Rajeev Ahuja, my supervisor, for your indispensable hand-tohand education and visionary supervision; for all of the encouragements and supports you gave me, on my research work, on my publication and thesis write-up. I am especially thankful to you for being the one recruited me to the group. Prof. Börje Johansson, for your patience in revising my papers and thesis. Thank you especially for treating me as a friend, enlightening me with your wisdom in academics as well as in life. Prof. Olle Eriksson, for your interesting lectures, kind jokes, and for the pleasant working experience. My great thanks will also be directed to my co-workers J. M. Wills, Anna Delin and Kay Dewhurst who implemented the code, which fundamentally helped my work. Prof. Ulf Jansson, Prof. C-G Ribbing, Prof. Michel Barsoum, Prof. Jochen M. Schneider, Dr. Zhimei Sun, Dr. Martin Magnuson and Dr. Jens -P. Palmquist, I appreciate your collaborations, which significantly enriched my knowledge on MAX phases. Dr. Yi Wang, for your kind helps in solving the problems I encountered during the work. Ms. Lunmei Huang and all my Chinese friends in Uppsala for your sharing the feelings of living in foreign country in our mother language. Jorge Osorio, Alexei Grechnev, Weine Olovsson, Jailton Souza de Almeida, Erik Holmström and all other colleagues in the Condensed Matter Theory Group in Uppsala University, for your generous assistance in my study, my computer problems and everything else. Most 57 58 CHAPTER 7. SAMMANFATTNING PÅ SVENSKA importantly, for your care-free fellowships! 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