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Study of Rattling Atoms in Type I and Type II Clathrate Semiconductors

Study of Rattling Atoms in Type I and Type II Clathrate Semiconductors. Charles W. Myles, 1 Texas Tech U. Jianjun Dong, Auburn U. Otto F. Sankey, 2 Arizona State U. 4 th Motorola Workshop on Computational Materials and Electronics, Nov. 14-15, 2002.

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Study of Rattling Atoms in Type I and Type II Clathrate Semiconductors

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  1. Study of Rattling Atoms in Type I and Type II Clathrate Semiconductors Charles W. Myles,1 Texas Tech U. Jianjun Dong, Auburn U. Otto F. Sankey,2 Arizona State U. 4th Motorola Workshop on Computational Materials and Electronics, Nov. 14-15, 2002 1Supported in part by a Texas Tech U. Faculty Development Leave. Thanks to ASU for hospitality! 2Supported in part by NSF Grant NSF-DMR-99-86706

  2. Clathrates • Crystalline Phasesof Group IV elements: Si, Ge, Sn (not C yet!) “New” materials, but known (for Si) since 1965! • J. Kasper, P. Hagenmuller, M. Pouchard, C. Cros, Science 150, 1713 (1965) • As in diamond structure, all Group IV atoms are 4-fold coordinated in sp3 bonding configurations. • Metastable, high energy phases of Si, Ge, Sn • Few pure elemental phases yet. Usually compounds with groups I and II elements (Na, K, Cs, Ba). • Applications: Thermoelectrics. • Open, cage-like structures. Large “cages” of group IV atoms. • Hexagonal & pentagonal rings, fused together to form “cages” of 20, 24, & 28 atoms

  3. Si46, Ge46, Sn46: (Type I Clathrates) • 20 atom (dodecahedron) “cages” and 24 atom (tetrakaidecahedron) cages, fused together through 5 atom pentagonal rings. • Crystal structure = simple cubic, 46 atoms per cubic unit cell. • Si136, Ge136, Sn136: (Type II Clathrates) • 20 atom (dodecahedron) “cages” and 28 atom (hexakaidecahedron) cages, fused together through 5 atom pentagonal rings. • Crystal structure = face centered cubic, 136 atoms per cubic unit cell (34 atoms/fcc unit cell)

  4. Type I Clathrate: Si46 , Ge46 or Sn46

  5. Type II Clathrate: Si136 , Ge136, Sn136

  6. Clathrate Structures 24 atom cages Type I Clathrate Si46, Ge46, Sn46 simple cubic 20 atom cages Type II Clathrate Si136, Ge136, Sn136 face centered cubic 28 atom cages

  7. Clathrates • Not found in nature. Synthesized in the lab. • Not normally in pure form, but with impurities (“guests”) encapsulated inside the cages. Guests  “Rattlers” • Guests: Group I atoms (Li, Na, K, Cs, Rb) or Group II atoms (Be, Mg, Ca, Sr, Ba)

  8. Type I Clathrate(with guest “rattlers”) 20 atom cage with guest atom [100] direction + 24 atom cage with guest atom [010] direction

  9. Clathrates • Semiconductors or semimetals. • Also superconducting materials made from sp3 bonded, Group IV atoms! (Ba8Si46) • Guests weakly bound in cages: • Host valence electrons taken up insp3bonds • Guest valence electrons go to conduction band of host (heavy doping density). • Guests weakly bonded in cages  Minimal effect on electronic transport • Guests vibrate (“rattle”) with low frequency modes  Strong effect on vibrational properties (thermal conductivity)

  10. Calculations • Computational package: VASP: Vienna Austria Simulation Package • First principles technique. • Many electron effects: Correlation: LocalDensityApproximation (LDA). Exchange-correlation energy: Ceperley-Adler Functional • Ultrasoft pseudopotentials. • Planewave basis • Extensively tested on a wide variety of systems • We’ve computed equations of state, bandstructures & phonon spectra.

  11. Start with given interatomic distances & bond angles. • Supercell approximation • Interatomic forces act to relax lattice to equilibrium configuration (distances, angles). • Schrdinger Eq. for interacting electrons, Newton’s 2nd Law motion for atoms. Equations of State • Total binding energy minimized by optimizing internal coordinates at given volume. • Repeat for several volumes. • Gives LDA binding energy vs. volume curve. • Fit to empirical eqtn of state (4 parameter): “Birch-Murnaghan” equation of state

  12. Birch-Murnaghan Eqtn of StateSn Clathrates = Metastable, expanded volume phases E(V) = E0 + (9/8)K V0[(V0/V) -1]2{1 + ½(4-K)[1- (V0/V)]} E0 Minimum binding energy, V0 Volume at minimum energy K  Equilibrium bulk modulus; K  dK/dP

  13. Bandstructures • At relaxed lattice configuration (“optimized geometry”) use one electron Hamiltonian + LDA many electron corrections to solve Schrdinger Eq. for bandstructures Ek.

  14. Sn46 & Sn136 BandstructuresC.W. Myles, J. Dong, O. Sankey, Phys. Rev. B64, 165202 (2001). The LDA UNDER-estimates bandgaps! LDA gap Eg 0.86 eV LDA gap Eg 0.46 eV Semiconductors of pure tin!!!!

  15. Compensation • Guest-containing clathrates: Valence electrons from guests go to conduction band of host (heavy doping). Change material from semiconducting to metallic. • Compensate for this by replacing some host atoms in the framework by Group III atoms. • Sn46: Semiconducting • Cs8Sn46 : Metallic • Cs8Ga8Sn38 : Semiconducting • Cs8Zn4Sn42 : Semiconducting • Sn136 : Semiconducting • Cs24Sn136 : Metallic

  16. Cs8Ga8Sn38 BandstructureC.W. Myles, J. Dong, O. Sankey, Phys. Rev. B64, 165202 (2001). LDA gap Eg 0.61 eV

  17. Lattice Vibrational Spectra • At optimized LDA geometry, calculate total ground state energy: Ee(R1, R2, R3, …..RN) • Harmonic Approx.: “Force constant” matrix: (i,i)  (2Ee/Ui Ui) Ui= displacements from equilibrium • Derivatives  Eefor many different Ui. (Small Ui; harmonic approximation) • Group theory limits number & symmetry of Uirequired. • Positive & negative Uifor each symmetry: Cancels out 3rd order anharmonicity (beyond harmonic approx.). Once all unique (i,i) are computed, do lattice dynamics. • Lattice dynamics in the harmonic approximation: det[Dii(q) - 2 ii] = 0

  18. Sn46 & Sn136 PhononsC. Myles, J. Dong, O. Sankey, C. Kendziora, G. Nolas,Phys. Rev. B 65, 235208 (2002) Flat optic bands!

  19. Cs8Ga8Sn38 PhononsC. Myles, J. Dong, O. Sankey, C. Kendziora, G. Nolas,Phys. Rev. B 65, 235208 (2002) Ga modes Cs guest“rattler”modes (~25 - 40cm-1) “Rattler” modes: Due to Cs motion in large & small cages

  20. Raman Spectra • Do group theory necessary to determine Raman active modes (frequencies calculated from first principles as described). • Estimate Raman scattering intensities using empirical (two parameter) bond charge model.

  21. C. Myles, J. Dong, O. Sankey, C. Kendziora, G. Nolas, Phys. Rev. B 65, 235208 (2002) Experimental & theoretical rattler (& other) modes in very good agreement.

  22. Conclusion • Reasonable agreement of theory and experiment for Raman spectrum  UNAMBIGUOUS IDENTIFICATION of low frequency (25-40 cm-1) “rattling” modes of Cs guests in Cs8Ga8Sn38 • Also:(not shown)Detailed identification of frequencies & symmetries of several experimentally observed Raman modes by comparison with theory.

  23. Type II Clathrate PhononsWith “rattling”atoms • Current experiments: Focus on rattling modes in Type II clathrates (for thermoelectric applications).  Theory:Given our success with Cs8Ga8Sn38: Look at phonons & rattling modes in Type II clathrates Search for trends in rattling modes as host is changed from Si  Ge  Sn • Na16Cs8Si136 : Have Raman data & predictions • Na16Cs8Ge136 : Have Raman data & predictions • Cs24Sn136: Have predictions, NEED DATA! • Na16Cs8Sn136Calculations are in progress!

  24. Na16Cs8Si136 & Na16Cs8Ge136 PhononsJ. Dong, A. Poddar, C. Myles, O. Sankey, unpublished Cs rattler modes ~ 21 cm-1 Cs rattler modes ~ 65 cm-1

  25. Cs24Sn136 PhononsC. Myles, J. Dong, O. Sankey, unpublished Cs rattler modes:  ~ 25-30 cm-1(small cage)  ~ 5 cm-1(large cage) ! Cs in 8 large cages: Extremely anharmonic & “loosely” fitting.  Very small frequencies: ~ 5 cm-1

  26. Raman Spectra • Again, estimate Raman scattering intensities using empirical (two parameter) bond charge model.

  27. G. Nolas, C. Kendziora, J. Gryko, A. Poddar, J. Dong, C. Myles, O. Sankey J. Appl. Phys. (accepted). • Experimental & theoretical rattler (& other) modes in very good agreement. Also (not shown) detailed identification of frequencies & symmetries of several observed Raman modes by comparison with theory.

  28. G. Nolas, C. Kendziora, J. Gryko, A. Poddar, J. Dong, C. Myles, & O. Sankey, J. Appl. Phys. (accepted) • Experimental & theoretical rattler (& other) modes in very good agreement.

  29. Conclusions • Reasonable agreement of theory and experiment for Raman spectra, especially “rattling” modes (of Cs in large cages) in Type II Si & Ge clathrates.  UNAMBIGUOUS IDENTIFICATION of low frequency “rattling” modes of Cs in Na16Cs8Si136(~ 65 cm-1), Na16Cs8Ge136 (~ 21 cm-1) • Also:(not shown)Detailed identification of frequencies & symmetries of several experimentally observed Raman modes by comparison with theory.

  30. Prediction • Cs24Sn136: Prediction of low frequency “rattling” modes of Cs guests in small (~20-30 cm-1) & large (~ 5 cm-1) cages (a very small frequency!)  Potential thermoelectric applications. NEED DATA!

  31. Trends • Trends in Cs “rattling” modes as host is changed from Si  Ge  Sn Na16Cs8Si136(~ 65 cm-1), Cs in large cagesNa16Cs8Ge136 (~ 21 cm-1), Cs in large cages Cs24Sn136(~ 20-30 cm-1), Cs in large cages (~ 5 cm-1), Cs in small cages • In progress: Phonons in Na16Cs8Sn136

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