EFFECTIVE MAGNETIC HAMILTONIANS: ab initio determination

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 1 EFFECTIVE MAGNETIC HAMILTONIANS: ab initio determination Václav Drchal Institute of Physics ASCR, Praha, Czech Republic in collaboration with Josef Kudrnovský and Ilja Turek Czech Science Foundation Project 22/9/775

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 2 MOTIVATION magnetic structures are usually determined from total energy calculations: only a few configurations can be investigated approach is limited to the ground state (T = ) alternatively, the total energy is mapped onto classical Heisenberg Hamiltonian and statistical mechanics are used to study magnetic structure at T > excited states are accessible all configurations can be investigated temperature dependence of the magnetic structure can be studied magnon spectra, critical temperatures, spin stiffness, etc. besides many successes this approach has certain problems: valid only for robust (constant size) moments induced moments (contribution to energy, ghost magnon bands) orientation of magnetic moments with respect to crystallographic axes is not determined

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 3 OUTLINE Local (on-site) exchange Isotropic exchange (classical Heisenberg Hamiltonian) Anisotropic exchange Application 1: effective magnetic Hamiltonian for 3d and 4d metals Application 2: magnetic structure of magnetic monolayers on non-magnetic substrates Conclusions and outlook

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 4 we wish to treat on equal footing local exchange H LE interatomic isotropic exchange H Heis interatomic anisotropic exchange H aniso PRESENT APPROACH H = H LE + H Heis + H aniso Methods electronic structure from first principles (in our case usually TB-LMTO-CPA) mapping of the total energy onto an effective Hamiltonian H eff find the ground state of H eff use the methods of statistical mechanics to determine magnetic properties of the system at T > such as M(T), phase transitions, susceptibilities,...

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 5 LOCAL EXCHANGE 1 local exchange together with exchange field from other atoms is responsible for appearance of magnetic moments information on the local exchange can be found from constrained LSDA calculations (fixed spin moment method) Schwartz, Mohn J. Phys. F 14 L129 (1984), Moruzzi et al. PRB 34 1784 (1984), Dederichs et al. PRL 53 2512 (1984) fixed spin moment method can be extended to disordered local moments (DLM) state

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 6 LOCAL EXCHANGE 2 ferromagnetic 3d metals energy [mry] 6 5 4 3 2 1-1 -2-3 bcc Fe DLM FM -4-5. 1. 2. 3. 4. magnetic moment [µ B ] energy [mry] 6 5 4 3 2 1 fcc Co DLM FM..5 1. 1.5 2. 2.5 3. magnetic moment [µ B ] energy [mry] 4 35 3 25 2 15 fcc Ni DLM the energy is described with a good accuracy by the 4th degree polynomial H LE = X i ˆAi + B i M 2 i + C im 4 i 1 5 FM..2.4.6.8 1. 1.2 1.4 magnetic moment [µ B ]

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 7 LOCAL EXCHANGE 3 other 3d metals energy [mry] 1 9 8 7 6 5 4 3 2 1 hcp Ti DLM FM..5 1. 1.5 2. 2.5 magnetic moment [µ B ] energy [mry] 5 4 3 2 1 fcc Mn FM DLM -1..5 1. 1.5 2. 2.5 3. magnetic moment [µ B ] 8 7 6 bcc Cr FM usually for small M i quadratic polynomial is sufficient energy [mry] 5 4 3 2 AFM 1 DLM..5 1. 1.5 2. magnetic moment [µ B ] H LE = X i B i M 2 i but not always (e.g. DLM Mn)

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 8 LOCAL EXCHANGE 4 E(M) 1 2 D(M M ) 2 system M [µ B ] B [mry/µ 2 B ] C[mRy/µ4 B ] D [mry/µ2 B ] bcc-fe FM 2.28-16.7 1.53 33.85 fcc-co FM 1.656-15.69 3.35 18.31 fcc-ni FM.639-3.6 12.71 18.66 bcc-fe DLM 2.193-1.9 1.15 18.14 fcc-co DLM 1.56-8.2 2.63 9.83 fcc-ni DLM.118-1.88 12.13 1.59 bcc-cr FM. 13.58 -.3 92.79 bcc-cr DLM. 16.83-1.17 36.4 fcc-mn FM. 5.28 -.6 15.86 fcc-mn DLM.526 -.34.26.54 fcc-cu FM. 19.93 5.26 45.24

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 9 EXCHANGE ENERGY DLM state: E DLM tot E exch intra... intraatomic exchange energy FM state: E FM tot Eexch inter + Eexch intra... sum of interatomic and intraatomic exchange energy E exch inter = EFM tot E DLM interatomic exchange energy [mry] 4 2-2 tot -4 fcc-ni fcc-co bcc-cr fcc-mn bcc-fe hcp-ti. 1. 2. 3. 4. 5. magnetic moment [µ B ] negative interatomic exchange energy: tendency to FM ordering positive interatomic exchange energy: tendency to AFM ordering Ti: strong exchange field, but atomic polarization requires large energy

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 1 REVERSED MOMENTS consider one reversed moment in a ferromagnetic material, the interatomic exchange acting on this atom is reversed and we expect that the energy of such atom is changed to E reversed = Eintra exch Eexch inter = EDLM tot Einter exch = 2 EDLM tot E FM tot Iron energy is increased moment is diminished Nickel moment disappears.6.5.4 bcc Fe.5.4 fcc Ni energy [Ry].3.2.1. -.1 -.2 -.3 reversed FM energy [Ry].3.2.1. reversed FM -.4 -.5..5 1. 1.5 2. 2.5 3. 3.5 4. magnetic moment -.1..2.4.6.8 1. 1.2 1.4 1.6 magnetic moment

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 11 ISOTROPIC (HEISENBERG) EXCHANGE 1 H Heis = X ij J ij e i e j, e i = M i M i... unit vectors exchange interactions... J ij J ij > ferromagnetic coupling J ij < antiferromagnetic coupling magnetic force theorem: Liechtenstein formula: Liechtenstein et al. JMMM 67 65 (1987), Turek et al. Phil. Mag. 86 1713 (26) i (z) = P i (z) P i (z) J ij = 1 Z 4π Im C ḡij σ (z)... intersite block of the Green function tr L h i (z) ḡ ij (z) j(z) ḡ ji (z) i dz responsible for mutual orientation of moments, but the orientation of moments with respect to crystallographic axes is indetermined higher order interactions, e.g., J ijkl (e i e j )(e k e l ) might be important

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 12 ANISOTROPIC EXCHANGE INTERACTIONS responsible for orientation of moments with respect to crystallographic axes origin: relativistic terms (spin-orbit coupling) and dipole-dipole interactions H anisotropy = X i K(e i ) X i,j e T i JS ij e i X i,j D ij [e i e j ] K(e i )... on-site anisotropy energy J S ij... symmetric part of interatomic exchange, Tr JS ij = : contains crystal field effects and dipole-dipole interaction D ij... Dzyaloshinski-Moriya vector (antisymmetric part of interatomic exchange) L. Udvardi et al. PRB 68 14436 (23)... KKR expressions dipole-dipole interaction E dip = k M R M R 3(M R n) (M R n) R R 3, n = (R R )/ R R is the unit vector in the direction R R, and M R is the total magnetic moment at site R, k = 2.66 1 5 in atomic Rydberg units

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 13 GROUND STATE (T=) systems with one sublattice isotropic case: the ground state is given by a single q-vector wave e i (q) = (cos(q R i ),sin(q R i ),) which corresponds to the maximum of the Fourier transform of exchange interactions: J(q) = X j e iq R j J,j, E(q) = J(q) anisotropic case: the energy of the ground state is given by the largest eigenvalue of the 3 3 matrix J(q) and the orientation of moments follows from the corresponding eigenvector systems with two or more sublattices theory is rather complicated, see Alexander PR 127 42 (1962)

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 14 FINITE TEMPERATURES methods of statistical mechanics: mean field: low accuracy, overestimates ordering temperature random-phase approximation (RPA) Monte Carlo simulations: high accuracy, high demands on computer resources Remark: Z fixed size moments : Z = Z variable size moments : Z = M =M d 2 M e βm H give Langevin function d 3 M e βm H β(a+bm2 +CM 4 ) are analytically intractable (problem of Mexican hat in an external field)

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 15 Fe MONOLAYER ON Ir(1) SURFACE 1 high-quality layers without clustering negligible intermixing of Fe and Ir experiment geometry known from LEED: reduced interlayer distance between Fe and Ir layers MOKE: no magnetic signal from a monolayer ab initio theory Kudrnovský et al.: PRB 8 (29), 6445 (VASP, WIEN2k, LMTO) - isotropic Heisenberg Hamiltonian - reduced interlayer distance (-12 %) is of vital importance for correct description: - without relaxation: FM - with relaxation: tendency to AFM ordering Deák et al.: PRB 84 (211), 224413 (TB-KKR) - isotropic Heisenberg Hamiltonian - Dzyaloshinskii-Moriya interactions (DMI) - biquadratic interactions - extensive simulations

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 16 Fe MONOLAYER ON Ir(1) SURFACE 2 3 2 1-3 -2-1 1 2 3 4 5 E(q) [mry] 4 2 with DMI without DMI 1 2 3-2 Γ X M Γ q vector anisotropic interactions change the energy of the ground state anisotropic interactions change very little the position q of energy minimum we find q π a (1, 7 12 ) elementary cell: A 1 = a(2,) A 2 = a(1,12) basis: 24 Fe atoms, directions of moments given by angle φ = x.12 + y.15, where x and y are coordinates of atom in square lattice all moments lie in one plane (xz)

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 17 Fe MONOLAYER ON Ir(1) SURFACE 3 25 2 15 1 5 5 1 15 2 25

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 18 Fe-Co MONOLAYER ON Ir(1) SURFACE Fe monolayer: spiral, Co monolayer: FM, transition between these two structures Fe 75 Co 25 Fe 25 Co 75 Fe 5 Co 5 Fe Co 1

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 19 CONCLUSIONS AND OUTLOOK versatile tool for determination of magnetic structure yields a deeper understanding of the formation and ordering of magnetic moments open problems: statistical mechanics of variable size moments dependence of J(q) on size of moments ground state of systems with several sublattices reliable determination of anisotropic and higher-order interactions from first principles

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 2 SPIN DISORDER RESISTIVITY 1 Weiss, Marotta: J. Phys. Chem. Solids 9 (1959), 32 Wysocki et al.: PRB 8 (29), 224423 Wysocki et al. APS March Meeting (211), L19.1 scattering on spin disorder above T C is simulated by disordered local moments good agreement with experimental data for Fe, but for Ni theoretical ρ mag is approx. twice larger than the experimental value remedy: consider moments in Nickel reduced to.3 -.4 µ B

ICSM212, Istanbul, May 3, 212, Theoretical Magnetism I, 17:2 p. 21 SPIN DISORDER RESISTIVITY 2 how large are the moments on Ni atoms at Curie temperature? rough estimate: average exchange field is zero in the DLM state energy per atom is A + BM 2 + CM 4 entropy per atom is log(2j + 1), where M = gµ B J minimize free energy at T = T C w.r.t. M: F(M) = A + BM 2 + CM 4 k B T C log(2j + 1).2.15 M =.397µ B free energy [Ry].1.5. -.5 this is in agreement with neutron scattering data (.4 µ B ) of Acet et al.: Europhys. Lett. 4 (1997) 93 and theory (.42 µ B ) of Ruban et al.: PRB 75 (27) 5442. -.1..2.4.6.8 1. magnetic moment M