# Lattice system

### From Online Dictionary of Crystallography

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== See also == | == See also == | ||

- | *[[Bravais | + | *[[Bravais class]] |

*Chapter 1.3.4.4.2 of ''International Tables for Crystallography, Volume A'', 6th edition | *Chapter 1.3.4.4.2 of ''International Tables for Crystallography, Volume A'', 6th edition | ||

[[category: Fundamental crystallography]] | [[category: Fundamental crystallography]] |

## Revision as of 17:22, 30 May 2019

Système réticulaire (*Fr*). Gittersystem (*Ge*). Sistema reticolare (*It*). 格子系 (*Ja*).

## Contents |

## Definition

A **lattice system** of space groups contains complete Bravais flocks. All those Bravais flocks which intersect exactly the same set of geometric crystal classes belong to the same lattice system.

## Alternative definition

A **lattice system** of space groups contains complete Bravais flocks. All those Bravais flocks belong to the same lattice system for which the Bravais classes belong to the same (holohedral) geometric crystal class.

## Lattice systems in two and three dimensions

In two-dimensional space there exist four lattice systems:

- monoclinic
- orthorhombic
- tetragonal
- hexagonal

In three-dimensional space there exist seven lattice systems:

- triclinic
- monoclinic
- orthorhombic
- tetragonal
- rhombohedral
- hexagonal
- cubic

Note that the adjective *trigonal* refers to a crystal system, not to a lattice system. Rhombohedral crystals belong to the trigonal crystal system, but trigonal crystals may belong to the rhombohedral or to the hexagonal lattice system.

## Note

In previous editions of *Volume A* of *International Tables of Crystallography* (before 2002), the lattice systems were called *Bravais systems*.

## See also

- Bravais class
- Chapter 1.3.4.4.2 of
*International Tables for Crystallography, Volume A*, 6th edition