Physical Properties Of Crystals

Author: J. F. Nye
Publisher: Oxford University Press
ISBN: 9780198511656
Size: 40.74 MB
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The author formulates the physical properties of crystals systematically in tensor notation, presenting tensor properties in terms of their common mathematical basis and the thermodynamic relations between them.

Handbook Of Nitride Semiconductors And Devices Materials Properties Physics And Growth

Author: Hadis Morkoç
Publisher: John Wiley & Sons
ISBN: 3527628460
Size: 73.84 MB
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Nye, J.F. (1964) Physical Properties of Crystals, Oxford University Press; Nye, J.F.
(1985) Physical Properties of Crystals: Their Representation by Tensors and
Matrices, Clarendon, Oxford; Nye, J.F. (1998) Physical Properties of Crystals:
Their Representation by Tensors and Matrices, Oxford University Press, New
York. Sheleg, A.U. and Savastenko, V.A. (1979) Izvestiya Akademii Nauk USSR,
Neorganicheskie Materialy, 15, 1598. Nye, J.F. (1985) Physical Properties of
Crystals: Their ...

Solid State Theory

Author: Walter A. Harrison
Publisher: Courier Corporation
ISBN: 0486152235
Size: 19.47 MB
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Then the components of the current are related to the components of the electric
field by .li = Zaing l The oil- are the elements of the matrix representing the
conductivity tensor of the crystal. If we know a group of symmetry operations that
leave the crystal invariant, these must also leave the conductivity tensor invariant,
so we have gained information about the conductivity tensor. For. 'J. F. Nye. "
Physical Properties of Crystals. Their Representation by Tensors and Matrices.“
Clarendon.

Symmetry And Physical Properties Of Crystals

Author: Cécile Malgrange
Publisher: Springer
ISBN: 9401789932
Size: 69.42 MB
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This decomposition is independent of the frame in which tensor [T] is expressed.
We demonstrate this for the symmetric part. In another orthonormal axis system (
Ox1x2x3), the components Sij of tensor [S] become Sij = aikajlSkl (Eq. (9.13a)). If
Skl = Slk, it is clear that S ij = Sji. 10.1.2. Matrix form of second-rank tensors We
saw that it is customary to represent the components of a rank-2 tensor, in a given
system of axes, by a matrix, extending to tensors the usual rule for writing
matrices.