Introduction to Solid State Physics |
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Page 30
We suppose that the Nation carries a single positive charge , so that the
electronic configuration is identical with neon , and that the Clion carries a single
negative charge ( argon configuration ) . If di ; is the interaction energy between
ions i ...
We suppose that the Nation carries a single positive charge , so that the
electronic configuration is identical with neon , and that the Clion carries a single
negative charge ( argon configuration ) . If di ; is the interaction energy between
ions i ...
Page 80
In the spirit of the Debye approximation we may suppose that the dependence of
Fo on the volume V is adequately described by specifying the dependence of the
Debye temperature R on V . Thus , from ( 5 . 27 ) and ( 5 . 28 ) , ( 5 .
In the spirit of the Debye approximation we may suppose that the dependence of
Fo on the volume V is adequately described by specifying the dependence of the
Debye temperature R on V . Thus , from ( 5 . 27 ) and ( 5 . 28 ) , ( 5 .
Page 323
We suppose that the ion is embedded in a crystal of orthorhombic symmetry ;
then the charges on neighboring ions located along the x , y , z axes will produce
an electrostatic potential V about the nucleus of the form ( H . 1 ) eV = Ax2 + By2 ...
We suppose that the ion is embedded in a crystal of orthorhombic symmetry ;
then the charges on neighboring ions located along the x , y , z axes will produce
an electrostatic potential V about the nucleus of the form ( H . 1 ) eV = Ax2 + By2 ...
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Contents
LATTICE ENERGY OF IONIC CRYSTALS | 29 |
ELASTIC CONSTANTS OF CRYSTALS | 43 |
LATTICE VIBRATIONS | 60 |
Copyright | |
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Common terms and phrases
alloy applied approximation atoms axes axis band boundary calculated cell chapter charge chloride condition conductivity consider constant crystal cubic defined dependence determined dielectric diffusion direction discussed dislocations displacement distance distribution domains effect elastic electric electron energy equal equation equilibrium example excitation experimental expression factor field force frequency function given gives heat holes interaction ionic ions lattice levels London magnetic magnetic field material mean measurements mechanism metals method molecules motion negative neighbor normal observed obtained parallel particles Phys physical plane polarization positive possible potential problem properties quantum range reference reflection region relation resistivity result room temperature scattering Show shown in Fig sodium solids space specimen stress structure suppose Table temperature theory thermal tion transition unit usually vacancy values volume wave zero
Bibliographic information
| Title | Introduction to Solid State Physics Wiley series on the science and technology of materials |
| Author | Charles Kittel |
| Edition | 2 |
| Publisher | Wiley, 1953 |
| Original from | the University of Michigan |
| Digitized | 21 Nov 2007 |
| Length | 396 pages |
| Export Citation | BiBTeX EndNote RefMan |