# Difference between revisions of "Polar lattice"

### From Online Dictionary of Crystallography

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*[[Reciprocal lattice]] | *[[Reciprocal lattice]] | ||

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## Revision as of 19:39, 24 August 2014

Réseau polaire (*Fr*), Reticolo polare (*It*).

The **polar lattice** is a lattice dual of the direct lattice, which is the ancestor of the reciprocal lattice. It was introduced by Auguste Bravais in a " mémoire" presented to the *Académie de Sciences de Paris* on 11 December 1848.

The construction of the polar lattice is essentially the same as that of the reciprocal lattice but the parameter along a row of the polar lattice is V^{2/3}/*d*(*hkl*) instead of 1/*d*(*hkl*). The polar lattice has thus the same dimensions as the direct lattice, namely Ångstroms, instead of Ångstroms^{-1}, like the reciprocal lattice.

- The unit cell of the polar lattice has the same volume as that of the direct lattice.
- The scalar product of the basis vectors of the direct and polar lattice is V
^{2/3}δ_{ij}, where δ is Kroneker's tensor and the indices i and j point to the basis vectors.

The polar lattice was introduced to facilitate the morphological study of crystals.