bcc_paracrystal

Body-centred cubic lattic with paracrystalline distortion

Parameter	Description	Units	Default value
scale	Source intensity	None	1
background	Source background	cm-1	0.001
dnn	Nearest neighbour distance	Å	220
d_factor	Paracrystal distortion factor	None	0.06
radius	Particle radius	Å	40
sld	Particle scattering length density	10-6Å-2	4
sld_solvent	Solvent scattering length density	10-6Å-2	1
theta	In plane angle	degree	60
phi	Out of plane angle	degree	60
psi	Out of plane angle	degree	60

The returned value is scaled to units of cm^-1 sr^-1, absolute scale.

Definition

Calculates the scattering from a body-centered cubic lattice with paracrystalline distortion. Thermal vibrations are considered to be negligible, and the size of the paracrystal is infinitely large. Paracrystalline distortion is assumed to be isotropic and characterized by a Gaussian distribution.

The scattering intensity \(I(q)\) is calculated as

\[I(q) = \frac{\text{scale}}{V_p} V_\text{lattice} P(q) Z(q)\]

where scale is the volume fraction of spheres, \(V_p\) is the volume of the primary particle, \(V_\text{lattice}\) is a volume correction for the crystal structure, \(P(q)\) is the form factor of the sphere (normalized), and \(Z(q)\) is the paracrystalline structure factor for a body-centered cubic structure.

Equation (1) of the 1990 reference[2] is used to calculate \(Z(q)\), using equations (29)-(31) from the 1987 paper[1] for \(Z1\), \(Z2\), and \(Z3\).

The lattice correction (the occupied volume of the lattice) for a body-centered cubic structure of particles of radius \(R\) and nearest neighbor separation \(D\) is

\[V_\text{lattice} = \frac{16\pi}{3} \frac{R^3}{\left(D\sqrt{2}\right)^3}\]

The distortion factor (one standard deviation) of the paracrystal is included in the calculation of \(Z(q)\)

\[\Delta a = g D\]

where \(g\) is a fractional distortion based on the nearest neighbor distance.

Fig. 45 Body-centered cubic lattice.

For a crystal, diffraction peaks appear at reduced q-values given by

\[\frac{qD}{2\pi} = \sqrt{h^2 + k^2 + l^2}\]

where for a body-centered cubic lattice, only reflections where \((h + k + l) = \text{even}\) are allowed and reflections where \((h + k + l) = \text{odd}\) are forbidden. Thus the peak positions correspond to (just the first 5)

\[\begin{split}\begin{array}{lccccc} q/q_o & 1 & \sqrt{2} & \sqrt{3} & \sqrt{4} & \sqrt{5} \\ \text{Indices} & (110) & (200) & (211) & (220) & (310) \\ \end{array}\end{split}\]

NB: The calculation of \(Z(q)\) is a double numerical integral that must be carried out with a high density of points to properly capture the sharp peaks of the paracrystalline scattering. So be warned that the calculation is SLOW. Go get some coffee. Fitting of any experimental data must be resolution smeared for any meaningful fit. This makes a triple integral. Very, very slow. Go get lunch!

This example dataset is produced using 200 data points, qmin = 0.001 Å^-1, qmax = 0.1 Å^-1 and the above default values.

The 2D (Anisotropic model) is based on the reference below where \(I(q)\) is approximated for 1d scattering. Thus the scattering pattern for 2D may not be accurate.

Fig. 46 Orientation of the crystal with respect to the scattering plane.

Fig. 47 1D and 2D plots corresponding to the default parameters of the model.

References

[1]	Hideki Matsuoka et. al. Physical Review B, 36 (1987) 1754-1765 (Original Paper)

[2]	Hideki Matsuoka et. al. Physical Review B, 41 (1990) 3854 -3856 (Corrections to FCC and BCC lattice structure calculation)

Authorship and Verification

• Author: NIST IGOR/DANSE Date: pre 2010
• Last Modified by: Paul Butler Date: September 29, 2016
• Last Reviewed by: Richard Heenan Date: March 21, 2016