# Difference between revisions of "Derivative structure"

### From Online Dictionary of Crystallography

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*[[Substructure]] | *[[Substructure]] | ||

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+ | [[Category:Crystal chemistry]] | ||

+ | [[Category:Fundamental crystallography]] |

## Latest revision as of 09:24, 17 February 2019

Structure dérivative (*Fr*). Struttura derivativa (*It*).

A **derivative structure** is a crystal structure S’ obtained from another crystal structure (called a **basic structure**) S under the following conditions:

- the space group G’ of S is a subgroup of the space group G of S;
- the translation lattice is preserved,
*i*.*e*. the translation subgroup T(G’) of S’ is the same as the translation subgroup T(G) of S; - as a consequence, the point group of P’ of S’ is a subgroup of the point group P of S (
*i*.*e*. S’ belong to a lower-symmetric geometric crystal class with respect to S); - at least one of the Wyckoff positions of S is split into two or more independent Wyckoff positions of S’ and the corresponding crystallographic orbits are occupied by chemically different atoms.

## Notes

The definition of derivative structure was introduced by Martin J. Buerger: *Journal of Chemical Physics* **15** (1947) 1-16.