Difference between revisions of "Thermal expansion"
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| − | + | <font color="blue">Dilatation thermique</font>(''Fr''). <font color="red">Wärmeausdehnung</font> (''Ge''). <font color="black">Dilatazione termica</font>(''It''). <font color="purple">熱膨張</font>(''Ja''). <font color="brown">термическое расширение</font> (''Ru''). <font color="green">Dilatación térmica</font> (''Sp''). | |
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= Coefficient of thermal expansion = | = Coefficient of thermal expansion = | ||
| − | The coefficient of thermal expansion relates the deformation that takes place when the temperature ''T'' of a solid is varied | + | The coefficient of thermal expansion relates the deformation that takes place when the temperature ''T'' of a solid is varied by the temperature variation Δ ''T''. |
| − | * ''' | + | * '''Isotropic media''' |
| − | + | The linear coefficient of thermal expansion, α, relates the relative variation | |
(Δℓ/ℓ) of the length ℓ of a bar to the temperature variation Δ''T''. In the first order approximation it is given by: | (Δℓ/ℓ) of the length ℓ of a bar to the temperature variation Δ''T''. In the first order approximation it is given by: | ||
| − | α = (Δ ℓ/ℓ) /Δ ''T'' | + | α = (Δ ℓ/ℓ) /Δ ''T''. |
| − | * ''' | + | * '''Anisotropic media''' |
| − | + | The deformation is described by the strain tensor ''u<sub>ij</sub>'' and the coefficient of thermal | |
expansion is represented by a rank 2 tensor, α''<sub>ij</sub>'', given by: | expansion is represented by a rank 2 tensor, α''<sub>ij</sub>'', given by: | ||
| Line 29: | Line 24: | ||
The volume thermal expansion, β, relates the relative variation of volume Δ ''V''/''V'' to Δ ''T'': | The volume thermal expansion, β, relates the relative variation of volume Δ ''V''/''V'' to Δ ''T'': | ||
| − | * ''' | + | * '''Isotropic media''' |
| + | β = Δ ''V''/''V'' Δ ''T'' = 3 α. | ||
| − | + | * '''Anisotropic media''' | |
| − | + | It is given by the trace of α''<sub>ij</sub>'': | |
| − | |||
| − | |||
β = Δ ''V''/''V'' Δ ''T'' = α ''<sub>11</sub>'' + α ''<sub>22</sub>'' + α ''<sub>33</sub>''. | β = Δ ''V''/''V'' Δ ''T'' = α ''<sub>11</sub>'' + α ''<sub>22</sub>'' + α ''<sub>33</sub>''. | ||
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The thermal expansion of a solid is a consequence of the anharmonicity of interatomic forces. The anharmonicity is most conveniently accounted for by means of the so-called `quasiharmonic approximation', assuming the lattice vibration frequencies to be independent of temperature but dependent on volume. This approach leads to the Grüneisen relation that relates the thermal expansion coefficients and the elastic constants: | The thermal expansion of a solid is a consequence of the anharmonicity of interatomic forces. The anharmonicity is most conveniently accounted for by means of the so-called `quasiharmonic approximation', assuming the lattice vibration frequencies to be independent of temperature but dependent on volume. This approach leads to the Grüneisen relation that relates the thermal expansion coefficients and the elastic constants: | ||
| − | * ''' | + | * '''Isotropic media''' |
| − | β = γ κ ''c<sup>V</sup>''/V | + | β = γ κ ''c<sup>V</sup>''/''V'' |
where γ is the average Grüneisen parameter, κ the isothermal compressibility, ''c<sup>V</sup>'' the specific heat at | where γ is the average Grüneisen parameter, κ the isothermal compressibility, ''c<sup>V</sup>'' the specific heat at | ||
constant volume. | constant volume. | ||
| − | * ''' | + | * '''Anisotropic media''' |
γ''<sub>ij</sub>'' = ''c<sub>ijkl</sub><sup>T</sup>'' α''<sub>kl</sub>'' ''V''/''c<sup>V</sup>'' | γ''<sub>ij</sub>'' = ''c<sub>ijkl</sub><sup>T</sup>'' α''<sub>kl</sub>'' ''V''/''c<sup>V</sup>'' | ||
| − | where the Grüneisen parameter is now represented by a second rank tensor, &# | + | where the Grüneisen parameter is now represented by a second-rank tensor, γ''<sub>ij</sub>'', and ''c<sub>ijkl</sub><sup>T</sup>'' is |
the elastic stiffness tensor at constant temperature. | the elastic stiffness tensor at constant temperature. | ||
| − | For details see | + | For details see Chapters 1.4.2 and 2.1.2.8 of ''International Tables for Crystallography, Volume D''. |
= Measurement = | = Measurement = | ||
| − | The coefficient of thermal expansion can be measured using diffraction methods (for powder diffraction methods, see | + | The coefficient of thermal expansion can be measured using diffraction methods (for powder diffraction methods, see Chapter 2.3 of ''International Tables for Crystallography Volume C'', for single crystal methods, see Chapter 5.3 of ''International Tables for Crystallography Volume C''), optical methods (interferometry) or electrical methods (pushrod dilatometry methods or capacitance methods). For details see Chapter 1.4.3 of ''International Tables for Crystallography Volume D''. |
= See also = | = See also = | ||
| − | Chapters 2.3 and 5.3 | + | *Chapters 2.3 and 5.3 of ''International Tables for Crystallography, Volume C'' |
| − | Chapters 1.4 and 2.1 | + | *Chapters 1.4 and 2.1 of ''International Tables for Crystallography, Volume D'' |
| − | |||
[[Category:Physical properties of crystals]] | [[Category:Physical properties of crystals]] | ||
Latest revision as of 14:02, 20 November 2017
Dilatation thermique(Fr). Wärmeausdehnung (Ge). Dilatazione termica(It). 熱膨張(Ja). термическое расширение (Ru). Dilatación térmica (Sp).
Contents
Coefficient of thermal expansion
The coefficient of thermal expansion relates the deformation that takes place when the temperature T of a solid is varied by the temperature variation Δ T.
- Isotropic media
The linear coefficient of thermal expansion, α, relates the relative variation (Δℓ/ℓ) of the length ℓ of a bar to the temperature variation ΔT. In the first order approximation it is given by:
α = (Δ ℓ/ℓ) /Δ T.
- Anisotropic media
The deformation is described by the strain tensor uij and the coefficient of thermal expansion is represented by a rank 2 tensor, αij, given by:
αij = uij / Δ T.
Volume thermal expansion
The volume thermal expansion, β, relates the relative variation of volume Δ V/V to Δ T:
- Isotropic media
β = Δ V/V Δ T = 3 α.
- Anisotropic media
It is given by the trace of αij:
β = Δ V/V Δ T = α 11 + α 22 + α 33.
Grüneisen relation
The thermal expansion of a solid is a consequence of the anharmonicity of interatomic forces. The anharmonicity is most conveniently accounted for by means of the so-called `quasiharmonic approximation', assuming the lattice vibration frequencies to be independent of temperature but dependent on volume. This approach leads to the Grüneisen relation that relates the thermal expansion coefficients and the elastic constants:
- Isotropic media
β = γ κ cV/V
where γ is the average Grüneisen parameter, κ the isothermal compressibility, cV the specific heat at constant volume.
- Anisotropic media
γij = cijklT αkl V/cV
where the Grüneisen parameter is now represented by a second-rank tensor, γij, and cijklT is the elastic stiffness tensor at constant temperature.
For details see Chapters 1.4.2 and 2.1.2.8 of International Tables for Crystallography, Volume D.
Measurement
The coefficient of thermal expansion can be measured using diffraction methods (for powder diffraction methods, see Chapter 2.3 of International Tables for Crystallography Volume C, for single crystal methods, see Chapter 5.3 of International Tables for Crystallography Volume C), optical methods (interferometry) or electrical methods (pushrod dilatometry methods or capacitance methods). For details see Chapter 1.4.3 of International Tables for Crystallography Volume D.
See also
- Chapters 2.3 and 5.3 of International Tables for Crystallography, Volume C
- Chapters 1.4 and 2.1 of International Tables for Crystallography, Volume D