modes

2. Hooke’s law: Vibration frequency f = force constant, M = mass modes Atomic Vibrations in Crystals = Phonons Test for phonon effects by using isotopes with different mass, for example in super-conductivity, where electron pairs are formed by the electron-phonon interaction.

3. Transverse modes (Oscillating Dipole) r

4. r Quantum probability Classical probability Classical vs. quantum vibrations in a molecule r

5. Harmonic Anharmonic T>0 T=0 a Anharmonic oscillator and thermal expansion A realistic potential energy curve between two atoms is asymmetric: short-range Pauli repulsion versus long-range Coulomb attraction (see Lect. 5, p. 4): U(r)(r)2 (r)3… This asymmetry causes anharmonic oscillations. The probability density ||2 shifts towards larger r for the higher vibrational levels. These are excited at higher temperature. The symmetric potential of the har-monic oscillator does not produce such a shift.

6. Bragg reflection makes neutrons (and X-rays) monochromatic. Triple-axis spectrometer: k E0E Measuring phonons by inelastic (E≠0)neutron scattering Energy and momentum conservation: E = E0 Ephon k =k0 kphon+ Ghkl E,k E0,k0 Ephon,kphon

7. Tphonon photon phonon Tphoton Measuring phonons by inelastic photon scattering (Raman Spectroscopy) The phonon wave modulates the light wave, creating side bands (like AM radio).

8.  Measuring phonons by inelastic electron scattering Electron Energy Loss Spectroscopy (EELS) Probing Depth: Neutrons: cm Photons: m-cm Electrons: nm Electrons interact very strongly with optical phonons in ionic solids. That gives rise to multiple phonon losses.