Cylindrical system
From Online Dictionary of Crystallography
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Système cylindrique (Fr) Sistema cylindrico (It).
Definition
The cylindrical system contains non-crystallographic point groups with one axis of revolution (or isotropy axis). There are five groups in the spherical system:
| Hermann-Mauguin symbol | Short Hermann-Mauguin symbol | Schönfliess symbol | order of the group | general form |
|---|---|---|---|---|
| [math] A_\infty[/math] | [math]\infty[/math] | [math]C_\infty [/math] | [math] \infty[/math] | rotating cone |
| [math] {A_\infty \over M}C[/math] | [math] {\bar \infty}[/math] | [math]C_{\infty h} \equiv S_{\infty} \equiv C_{\infty i}[/math] | [math] \infty[/math] | rotating finite cylinder |
| [math] A_\infty \infty A_2[/math] | [math] \infty 2[/math] | [math]D_{\infty }[/math] | [math] \infty[/math] | finite cylinder submitted to equal and opposite torques |
| [math] A_\infty M[/math] | [math]\infty m[/math] | [math]C_{\infty v}[/math] | [math] \infty[/math] | stationary cone |
| [math] {A_\infty \over M} {\infty A_2 \over \infty M} C[/math] | [math] {\bar \infty}m \equiv {\bar \infty} {2\over m}[/math] | [math]D_{\infty h} \equiv D_{\infty d}[/math] | [math] \infty[/math] | stationary finite cylinder |
Note that [math] A_\infty M[/math] represents the symmetry of a force, or of an electric field and that [math] {A_\infty \over M}C[/math] represents the symmetry of a magnetic field (Curie 1894), while [math] {A_\infty \over M} {\infty A_2 \over \infty M} C[/math] represents the symmetry of a uniaxial compression.
History
The groups containing isotropy axes were introduced by P. Curie (1859-1906) in order to describe the symmetry of physical systems (Curie P. (1884). Sur les questions d'ordre: répétitions. Bull. Soc. Fr. Minéral., 7, 89-110; Curie P. (1894). Sur la symétrie dans les phénomènes physiques, symétrie d’un champ électrique et d’un champ magnétique. J. Phys. (Paris), 3, 393-415.).
See also
Curie laws
spherical system
Section 10.1.4 of International Tables of Crystallography, Volume A
Section 1.1.4 of International Tables of Crystallography, Volume D