star_polymer

Star polymer model with Gaussian statistics

Parameter	Description	Units	Default value
scale	Source intensity	None	1
background	Source background	cm-1	0.001
rg_squared	Ensemble radius of gyration SQUARED of the full polymer	Å2	100
arms	Number of arms in the model	None	3

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

Definition

Calcuates the scattering from a simple star polymer with f equal Gaussian coil arms. A star being defined as a branched polymer with all the branches emanating from a common central (in the case of this model) point. It is derived as a special case of on the Benoit model for general branched polymers[1] as also used by Richter et al.[2]

For a star with \(f\) arms the scattering intensity \(I(q)\) is calculated as

\[I(q) = \frac{2}{fv^2}\left[ v-1+\exp(-v)+\frac{f-1}{2} \left[ 1-\exp(-v)\right]^2\right]\]

where

\[v=\frac{uf}{(3f-2)}\]

and

\[u = \left\langle R_{g}^2\right\rangle q^2\]

contains the square of the ensemble average radius-of-gyration of the full polymer while v contains the radius of gyration of a single arm \(R_{arm}\). The two are related as:

\[R_{arm}^2 = \frac{f}{3f-2} R_{g}^2\]

Note that when there is only one arm, \(f = 1\), the Debye Gaussian coil equation is recovered.

Note

Star polymers in solutions tend to have strong interparticle and osmotic effects. Thus the Benoit equation may not work well for many real cases. A newer model for star polymer incorporating excluded volume has been developed by Li et al in arXiv:1404.6269 [physics.chem-ph]. Also, at small \(q\) the scattering, i.e. the Guinier term, is not sensitive to the number of arms, and hence ‘scale’ here is simply \(I(q=0)\) as described for the mono_gauss_coil model, using volume fraction \(\phi\) and volume V for the whole star polymer.

Fig. 117 1D plot corresponding to the default parameters of the model.

References

[1]	H Benoit J. Polymer Science, 11, 507-510 (1953)

[2]	D Richter, B. Farago, J. S. Huang, L. J. Fetters, B Ewen Macromolecules, 22, 468-472 (1989)

Authorship and Verification

• Author: Kieran Campbell Date: July 24, 2012
• Last Modified by: Paul Butler Date: Auguts 26, 2017
• Last Reviewed by: Ziang Li and Richard Heenan Date: May 17, 2017