From Online Dictionary of Crystallography
Revision as of 15:59, 24 February 2019 by MassimoNespolo (better Japanese translation: 消滅則(systematic absences) -> 回折条件(reflection conditions))
Conditions de réflexion (Fr). Auslöschungsgesetze (Ge). Condizioni di diffrazione (It). 回折条件 (Ja). Ausencias sistemáticas (Sp).
The reflection conditions describe the conditions of occurrence of a reflection (structure factor not systematically zero). There are two types of systematic reflection conditions for diffraction of crystals by radiation:
(1) General conditions. They apply to all Wyckoff positions of a space group, i.e. they are always obeyed, irrespective of which Wyckoff positions are occupied by atoms in a particular crystal structure. They are due to one of three effects:
- Centred cells
The resulting conditions apply to the whole three-dimensional set of reflections hkl. Accordingly, they are called integral reflection conditions. They are given in Table 1.
|Centring type of cell||Centring symbol|
R (rhombohedral axes)
|h + k = 2n||C-face centred||C|
|k + l = 2n||A-face centred||A|
|l + h = 2n||B-face centred||B|
|h + k + l = 2n||body centred||I|
|h + k, h + l and |
k + l = 2n or:
|− h + k + l = 3n|| rhombohedrally
|R (hexagonal axes)|
|h − k + l = 3n|| rhombohedrally|
|h − k = 3n||hexagonally centred||H|
|h + k + l = 3n||D centred||D|
- Glide planes
The resulting conditions apply only to two-dimensional sets of reflections, i.e. to reciprocal-lattice nets containing the origin (such as hk0, h0l, 0kl, hhl). For this reason, they are called zonal reflection conditions. For instance, for a glide plane parallel to (001):
|Type of reflection||Reflection condition||Glide vector||Glide plane|
|0kl||k = 2 n||b/2||b|
|l = 2 n||c/2||c|
|k + l = 2 n||b/2 + c/2||n|
|k + l = 4 n|
k, l = 2n
|b/4 ± c/4||d|
The zonal reflection conditions are listed in Table 188.8.131.52 of International Tables for Crystallography, Volume A, 6th edition.
- Screw axes
The resulting conditions apply only to one-dimensional sets of reflections, i.e. reciprocal-lattice rows containing the origin (such as h00, 0k0, 00l). They are called serial reflection conditions. For instance, for a screw axis parallel to , the reflection conditions are:
|Type of reflection||Reflection condition||Screw vector||Screw axis|
|00l||l = 2 n||c/2||21; 42|
|l = 4 n||c/4||41; 43|
|000l||l = 2 n||c/2||63|
|l = 3 n||c/3||41; 31; 32; 62; 64|
|l = 6 n||c/6||61;65|
The serial reflection conditions are listed in Table 184.108.40.206 of International Tables for Crystallography, Volume A, 6th edition.
(2) Special conditions ('extra' conditions). They apply only to special Wyckoff positions and occur always in addition to the general conditions of the space group.
- Chapter 1.6.4 of International Tables for Crystallography, Volume A, 6th edition