mass_fractal

Mass Fractal model

Parameter	Description	Units	Default value
scale	Scale factor or Volume fraction	None	1
background	Source background	cm-1	0.001
radius	Particle radius	Å	10
fractal_dim_mass	Mass fractal dimension	None	1.9
cutoff_length	Cut-off length	Å	100

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

Calculates the scattering from fractal-like aggregates based on the Mildner reference.

Definition

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

$$I(q) = scale \times P(q)S(q) + background$$

$$P(q) = F(qR)^2$$

$$F(x) = \frac{3\left[sin(x)-xcos(x)\right]}{x^3}$$

$$S(q) = \frac{\Gamma(D_m-1)\zeta^{D_m-1}}{\left[1+(q\zeta)^2 \right]^{(D_m-1)/2}} \frac{sin\left[(D_m - 1) tan^{-1}(q\zeta) \right]}{q}$$

$$scale = scale\_factor \times NV^2(\rho_\text{particle} - \rho_\text{solvent})^2$$

$$V = \frac{4}{3}\pi R^3$$

where $R$ is the radius of the building block, $D_m$ is the mass fractal dimension, $\zeta$ is the cut-off length, $\rho_\text{solvent}$ is the scattering length density of the solvent, and $\rho_\text{particle}$ is the scattering length density of particles.

Note

The mass fractal dimension ( $D_m$ ) is only valid if $1 < mass\_dim < 6$. It is also only valid over a limited $q$ range (see the reference for details).

Fig. 107 1D plot corresponding to the default parameters of the model.

Source

mass_fractal.py $\ \star\ $ mass_fractal.c $\ \star\ $ sas_gamma.c $\ \star\ $ sas_3j1x_x.c

References

1. D Mildner and P Hall, J. Phys. D: Appl. Phys., 19 (1986) 1535-1545 Equation(9)

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