Solid state physics
Enregistré dans:
Auteurs principaux : | , |
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Format : | Livre |
Langue : | anglais |
Titre complet : | Solid state physics / Neil W. Ashcroft,. N. David Mermin |
Publié : |
Philadelphia (Pa.) :
Saunders College
, C 1976 |
Description matérielle : | 1 vol. (XXI-826 p.) |
Sujets : |
- 1. The Drude theory of metals
- 2. The Summerfeld theory of metals
- 3. Failures of the free elctron model
- 4. Crystal lattices
- 5. The reciprocal lattice
- 6. Determination of crystla structures by X-ray diffraction
- 7. Classification of Bravais lattices and crystal structures
- 8. electron levels in a periodic potential : general properties
- 9. Electrons in a weak periodic potential
- 10. The tight-binding method
- 11. Other methods for calculating band structure
- 12. The semiclassical model of electron dynamics
- 13. The semiclassical theory of conduction in metals
- 14. Measuring the Fermi surface
- 15. Band structure of selected metals
- 16. Beyond the relaxation-time approximation
- b17. Beyond the independent electron approximation
- 18. Surface effects
- 19. Classification of solids
- 20. Cohesive energy
- 21. Failures of the static lattice model
- 22. Classical theory of the harmonic crystal
- 23. Quantum theory of the harmonic crystal
- 24. Measuring phonon dispersion relations
- 25. Anharmonic effects in crytals
- 26. Phonons in metals
- 27. Dielectric properties of insulators
- 28. Homogeneous semiconductors
- 29. Inhomogeneous semiconductors
- 30. Defects in crystals
- 31. Diamagnetism and paramagnetism
- 32. Electron interactions and magnetic structure
- 33. Magnetic ordering
- 34. Superconductivity
- A. Summary of important numerical relations in the free electron theory of metals
- B. The chemical potential
- C. The Sommerfeld expansion
- D. Plane-wave expansions of periodic functions in more than one dimensions
- E. The velocity and effective mass of Bloch electrons
- F. Some identities related to Fourier analysis of periodic systems
- G. The variational principle for Schrödinger's equation
- H. Hamiltonian formulation of the semiclassical equations of motion, and Liouville's theorem
- I. Green's theorem for periodic functions
- J. Conditions for the absence of interband transitions in uniform electric or magnetic fields
- K. Optical properties of solids
- L. Quantum theory of the harmonic crystal
- M. Conservation of crystal momentum
- N. Theory of the scattering of neutrons by a crystal
- O. Anharmonic terms and n-phonon processes
- P. Evaluation of the Landé g-factor