Solid State PhysicsThe Drude Theory of Metals. The Sommerfeld Theory of Metals. Failures of the Free Electron Model. Crystal Lattices. The Reciprocal Lattice. Determination of Crystal Structures by X-Ray Diffraction. Classification of Bravais Lattices and Crystal Structures. Electron levels in a Periodic Potential: General Properties. Electrons in a Weak Periodic Potential.THe Tight-Binding Method. Other Methods for Calculating Band Structure. The Semiclassical Model of Electron Dynamics. The Semiclassical Theory of Conduction in Metals. Measuring the Fermi Surface. Band Structure of Selected Metals. Beyond the Relaxation. Time Approximation. Beyond the Independent Electron Approximation. Surface Effects. Classification of Solids. Cohesive Energy. Failures of the Static Lattice Model. Classical Theory of the Harmonic Crystal. Quantum Theory of the Harmonic Crystal. Measuring Phonon Dispersion Relations. Anharmonic Effects in Crystals. Phonons in Metals. Dielectric Properties of Insulators. Homogeneous Semiconductors. Inhomogeneous Semiconductors. Defects in Crystals. Diamagnetism and Paramagnetism. Electron Interactions and Magnetic Structure. Magnetic Ordering. Superconductivity. Appendices. |
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Results 1-3 of 80
Page 68
3 ) Figure 4 . 6 Three primitive vectors , specified in Eq . ( 4 . 3 ) , for the body -
centered cubic Bravais lattice . The lattice is formed by taking all linear
combinations of the primitive vectors with integral coefficients . The point P , for
example , is P ...
3 ) Figure 4 . 6 Three primitive vectors , specified in Eq . ( 4 . 3 ) , for the body -
centered cubic Bravais lattice . The lattice is formed by taking all linear
combinations of the primitive vectors with integral coefficients . The point P , for
example , is P ...
Page 112
For example , the existence and basic properties of the reciprocal lattice depend
only on the existence of three ... It is nevertheless clear from examples already
described that Bravais lattices do fall naturally into categories on the basis of ...
For example , the existence and basic properties of the reciprocal lattice depend
only on the existence of three ... It is nevertheless clear from examples already
described that Bravais lattices do fall naturally into categories on the basis of ...
Page 389
At the extreme right of the table are the column VIII elements , which afford the
best example of molecular solids . The solid noble gases ( except for helium ) all
crystallize in monatomic fcc Bravais lattices . The electronic configuration of each
...
At the extreme right of the table are the column VIII elements , which afford the
best example of molecular solids . The solid noble gases ( except for helium ) all
crystallize in monatomic fcc Bravais lattices . The electronic configuration of each
...
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Contents
The Drude Theory of Metals | 1 |
Free electron densities and ra | 5 |
Thermal conductivities | 21 |
Copyright | |
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additional applied approximation assume atomic band Bragg Bravais lattice calculation carrier cell centered Chapter charge classical close collisions compared condition conduction consider constant constructed containing contribution crystal cubic density dependence described determined direction discussion distance distribution effect electric field elements energy equation equilibrium example faces fact factor Fermi surface Figure follows free electron frequency given gives heat hexagonal holes important independent integral interaction ionic ions known lattice vector leads levels limit linear magnetic field mean measured metals method normal Note observed occupied orbits perpendicular phonon plane position possible potential primitive cell Problem properties reciprocal lattice reflection region relation requires result satisfy scattering semiclassical Show shown simple single solid solution space space groups specific sphere structure symmetry Table temperature term theory thermal unit vanishes volume wave functions wave vector zone