Difference between revisions of "Atomic modulation function"
From Online Dictionary of Crystallography
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<Font color="blue">Fonction de modulation atomique</font> (Fr.) | <Font color="blue">Fonction de modulation atomique</font> (Fr.) | ||
| − | + | == Definition == | |
A modulated structure is a structure that may be obtained from a crystalline system | A modulated structure is a structure that may be obtained from a crystalline system | ||
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functions have Fourier transforms with delta peaks on wave vectors '''k''' of the form | functions have Fourier transforms with delta peaks on wave vectors '''k''' of the form | ||
| − | + | <math>k~=~\sum_{i=1}^n h_i a_i^*,~~(h_i~~{\rm integers},~n~{\rm finite}.)</math> | |
Modulation functions may be continuous or discontinuous. | Modulation functions may be continuous or discontinuous. | ||
Revision as of 16:00, 3 February 2012
Fonction de modulation atomique (Fr.)
Definition
A modulated structure is a structure that may be obtained from a crystalline system with space group symmetry, and therefore with lattice periodicity, by a regular displacement of atoms (displacive modulation) and/or change in the occupation probability of a site in the basic structure. The deviation from the positions in the basic structure are given by
[math]r(n,j) = n~+~r_j+u_j((n+r_j).[/math]
The occupation probability to find an atom of species A at the position [math]n+r_j[/math] is [math]p_A(n,j)[/math], where the sum over the species of the functions [math]p_A[/math] is one. Instead of a different species, one may have a vacancy. The functions [math]u(n,j)[/math] and [math]p_A(n,j)[/math] are the atomic modulation functions. For a crystal they should have Fourier modules of finite rank, i.e. the functions have Fourier transforms with delta peaks on wave vectors k of the form
[math]k~=~\sum_{i=1}^n h_i a_i^*,~~(h_i~~{\rm integers},~n~{\rm finite}.)[/math]
Modulation functions may be continuous or discontinuous.