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Difference between revisions of "Incommensurate composite crystal"

From Online Dictionary of Crystallography

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themselves modulated structures, with basis structures that are mutually incommensurate.
 
themselves modulated structures, with basis structures that are mutually incommensurate.
 
Each subsystem (numbered by ν) has a reciprocal lattice for its  basic structure with three basis vectors
 
Each subsystem (numbered by ν) has a reciprocal lattice for its  basic structure with three basis vectors
'''a'''<sub>i</sub><sup>*&nu;</sup>. There is a basis of the module of diffraction spots that has at most
+
<math>a_i^{*\nu}</math>. There is a basis of the [[vector module]] of diffraction spots that has at most
3''N'' basis vectors  '''A'''<sub>j</sub><sup>*</sup> such that
+
3''N'' basis vectors  <math>A_j^*</math> such that
  
 
<math> a_i^{*\nu}~=~\sum_{j=1}^n Z_{ij}^{\nu}  A_j^* ~~~(i=1,2,3),</math>
 
<math> a_i^{*\nu}~=~\sum_{j=1}^n Z_{ij}^{\nu}  A_j^* ~~~(i=1,2,3),</math>
  
where Z<sub>ij</sub><sup>&nu;</sup> are integer coefficients.
+
where <math>Z_{ij}^{\nu}</math> are integer coefficients.
 
If ''n'' is larger than the dimension of space (three), the composite crystal is an aperiodic crystal.
 
If ''n'' is larger than the dimension of space (three), the composite crystal is an aperiodic crystal.
 +
''n'' is the rank of the vector module.
  
 
  '''Applications'''
 
  '''Applications'''

Revision as of 06:20, 19 May 2009

Incommensurate Composite Crystal


Cristal composite (Fr.)

Definition

An incommensurate composite crystal is a compound with two or more (N) subsystems that are themselves modulated structures, with basis structures that are mutually incommensurate. Each subsystem (numbered by ν) has a reciprocal lattice for its basic structure with three basis vectors [math]a_i^{*\nu}[/math]. There is a basis of the vector module of diffraction spots that has at most 3N basis vectors [math]A_j^*[/math] such that

[math] a_i^{*\nu}~=~\sum_{j=1}^n Z_{ij}^{\nu} A_j^* ~~~(i=1,2,3),[/math]

where [math]Z_{ij}^{\nu}[/math] are integer coefficients. If n is larger than the dimension of space (three), the composite crystal is an aperiodic crystal. n is the rank of the vector module.

Applications

Examples are intergrowth crystals and adsorbed monolayers. To the former belongs Hg3-δAsF6 with two systems of Hg chains inside the host lattice formed by AsF6 octahedra. Another example is nonadecane in the channels of a urea host crystal.