Unit cell

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Revision as of 19:16, 3 June 2014 by 68.194.136.6 (talk) (Notation)
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The unit cell is the basic building block of a crystal lattice (whether an atomic crystal or a nanoscale superlattice). Crystalline materials have a periodic structure, with the unit cell being the minimal volume necessary to fully describe the repeating structure. There are a finite number of possible symmetries for the repeating unit cell.

Math

Vectors

Relations

Volume

If a, b, and c are the parallelepiped edge lengths, and α, β, and γ are the internal angles between the edges, the volume is

The volume of a unit cell with all edge-length equal to unity is:

Angles

  • is the angle between and
  • is the angle between and
  • is the angle between and

Reciprocal Vectors

Vector components

Generally:

With components:

Examples

Cubic

Since , , and:

And in reciprocal-space:

So:

Hexagonal

Since and , , and:

And in reciprocal-space:

So: