squarewell¶
Square well structure factor with Mean Spherical Approximation closure
Parameter |
Description |
Units |
Default value |
---|---|---|---|
radius_effective |
effective radius of hard sphere |
Å |
50 |
volfraction |
volume fraction of spheres |
None |
0.04 |
welldepth |
depth of well, epsilon |
kT |
1.5 |
wellwidth |
width of well in diameters (=2R) units, must be > 1 |
diameters |
1.2 |
The returned value is a dimensionless structure factor, \(S(q)\).
Calculates the interparticle structure factor for a hard sphere fluid with a narrow, attractive, square well potential. The Mean Spherical Approximation (MSA) closure relationship is used, but it is not the most appropriate closure for an attractive interparticle potential. However, the solution has been compared to Monte Carlo simulations for a square well fluid and these show the MSA calculation to be limited to well depths \(\epsilon < 1.5\) kT and volume fractions \(\phi < 0.08\).
Positive well depths correspond to an attractive potential well. Negative well depths correspond to a potential “shoulder”, which may or may not be physically reasonable. The stickyhardsphere model may be a better choice in some circumstances.
Computed values may behave badly at extremely small \(qR\).
Note
Earlier versions of SasView did not incorporate the so-called \(\beta(q)\) (“beta”) correction [2] for polydispersity and non-sphericity. This is only available in SasView versions 5.0 and higher.
The well width \((\lambda)\) is defined as multiples of the particle diameter \((2 R)\).
The interaction potential is:
where \(r\) is the distance from the center of a sphere of a radius \(R\).
In SasView the effective radius may be calculated from the parameters used in the form factor \(P(q)\) that this \(S(q)\) is combined with.
For 2D data: The 2D scattering intensity is calculated in the same way as 1D, where the \(q\) vector is defined as
Source
References
R V Sharma, K C Sharma, Physica, 89A (1977) 213
M Kotlarchyk and S-H Chen, J. Chem. Phys., 79 (1983) 2461-2469
Authorship and Verification
Author:
Last Modified by:
Last Reviewed by: Steve King Date: March 27, 2019