## Physical Properties of Crystals: Their Representation by Tensors and Matrices |

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Page 48

It gives essentially the length of j once the direction is known ; to find the direction

of j we can use the radius-normal property of the representation quadric for

conductivity,

whose ...

It gives essentially the length of j once the direction is known ; to find the direction

of j we can use the radius-normal property of the representation quadric for

conductivity,

**denoted**by (3) in the figure. Exercise 2.6. Prove that the surfacewhose ...

Page 275

The components of p referred to axes Ox1, Ox2, Ox, are pv p2, ps- We write P = [

PvPt,P*], and often

product ...

The components of p referred to axes Ox1, Ox2, Ox, are pv p2, ps- We write P = [

PvPt,P*], and often

**denote**p by pj or [pt]. The magnitude, or length, of p is**denoted**by p: p, = pI+pI+p, = Pipi- A unit vector is one of unit length. The scalarproduct ...

Page 277

The symbol (hkl) is given a second meaning as

planes (hkl). There can be two such faces, one on each side of the crystal. The

face on the same side of the origin as the plane making intercepts a/h, b/k, c/l is ...

The symbol (hkl) is given a second meaning as

**denoting**a. face parallel to theplanes (hkl). There can be two such faces, one on each side of the crystal. The

face on the same side of the origin as the plane making intercepts a/h, b/k, c/l is ...

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### Contents

THE GROUNDWORK OF CRYSTAL PHYSICS | 3 |

EQUILIBRIUM PROPERTIES | 51 |

ELECTRIC POLARIZATION | 68 |

69 other sections not shown

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### Common terms and phrases

angle anisotropic applied biaxial birefringence centre of symmetry Chapter coefficients conductivity crystal classes crystal properties crystal symmetry cube cubic crystals defined denoted diad axis dijk direction cosines electric field electro-optical effect ellipsoid equal equation example expression follows force given gives heat flow Hence hexagonal indicatrix isothermal isotropic lattice left-handed magnetic magnitude matrix notation measured moduli monoclinic number of independent Onsager's Principle optic axis optical activity orientation permittivity perpendicular photoelastic effect piezoelectric effect plane plate point group positive principal axes produced pyroelectric effect quadric quantities radius vector referred refractive index relation representation quadric represents right-handed rotation scalar second-rank tensor set of axes shear shown shows strain stress suffix notation symbol symmetry elements Table temperature gradient thermal expansion thermodynamics thermoelectric effects Thomson heat tion transformation law trigonal uniaxial unit volume values wave normal wave surface written zero