Solid State PhysicsThis book provides an introduction to the field of solid state physics for undergraduate students in physics, chemistry, engineering, and materials science. |
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Page 109
... Show that the structure factor ( 6.13 ) is then either 4 or 0 at all points of the simple cubic reciprocal lattice . ( b ) Show that when points with zero structure factor are removed , the remaining points of the reciprocal lattice ...
... Show that the structure factor ( 6.13 ) is then either 4 or 0 at all points of the simple cubic reciprocal lattice . ( b ) Show that when points with zero structure factor are removed , the remaining points of the reciprocal lattice ...
Page 449
... Show that when this happens the distortion of the dispersion relation for the monatomic chain is linear in A / K。.3 34 4. Polarization of the Normal Modes of a Monatomic Bravais Lattice ( a ) Show that if k lies along a 3- , 4- , or 6 ...
... Show that when this happens the distortion of the dispersion relation for the monatomic chain is linear in A / K。.3 34 4. Polarization of the Normal Modes of a Monatomic Bravais Lattice ( a ) Show that if k lies along a 3- , 4- , or 6 ...
Page 468
Neil W. Ashcroft, N. David Mermin. ( b ) Show that the next term in the high - temperature expansion of c / c is 1 g ( w ) hw 4 do g ( w ) . 240 S des gres ) ( het ) / S des KBT ( 23.42 ) ( c ) Show that if the crystal is a monatomic ...
Neil W. Ashcroft, N. David Mermin. ( b ) Show that the next term in the high - temperature expansion of c / c is 1 g ( w ) hw 4 do g ( w ) . 240 S des gres ) ( het ) / S des KBT ( 23.42 ) ( c ) Show that if the crystal is a monatomic ...
Contents
The Drude Theory of Metals | 1 |
Failures of the Free Electron Model | 57 |
Crystal Lattices | 63 |
Copyright | |
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alkali atomic band structure Bloch Bragg plane Bravais lattice Brillouin zone calculation carrier densities Chapter charge density coefficients collision conduction band conduction electrons contribution crystal momentum crystal structure density of levels dependence depletion layer described dielectric constant direction distribution Drude Drude model effect electric field electron gas electron-electron electronic levels electrostatic energy gap example Fermi energy Fermi surface Figure free electron frequency given Hamiltonian hexagonal holes impurity independent electron approximation insulators interaction ionic crystals k-space lattice planes lattice point linear low temperatures macroscopic magnetic field metals neutron normal modes number of electrons one-electron levels orbits periodic potential perpendicular phonon Phys positive primitive cell primitive vectors Problem properties quantum reciprocal lattice vector region result scattering Schrödinger equation semiclassical semiconductors simple cubic solid solution specific heat spin superconducting symmetry term theory valence band vanishes velocity wave functions wave vector zero