Small-Angle Scattering. Ian W. Hamley

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Название Small-Angle Scattering
Автор произведения Ian W. Hamley
Жанр Техническая литература
Серия
Издательство Техническая литература
Год выпуска 0
isbn 9781119768340



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      The amplitude structure factor in Eq. (1.27) is a complex quantity and so can be written as the product of an amplitude and a phase:

      where ϕhkl is the phase angle for reflection with indices hkl. The amplitude can be obtained from the square root of the intensity:

      (1.60)StartAbsoluteValue upper F Subscript italic h k l Baseline EndAbsoluteValue equals StartRoot upper I Subscript italic h k l Baseline EndRoot

      A number of structure factors have been proposed for fractal structures. For these systems, the separation of form and structure factors often does not make sense; therefore, we denote the scattering just by the intensity. One model commonly used in the analysis of SAS data is the Fischer–Burford fractal model, for which the structure factor is given by [32, 33]

      (1.61)upper I left-parenthesis q right-parenthesis equals upper I 0 left-parenthesis 1 plus StartFraction 2 Over 3 upper D EndFraction q squared upper R Subscript g Superscript 2 Baseline right-parenthesis Superscript negative upper D slash 2

      where I0 is the forward scattering intensity, D is the fractal dimension, and Rg is the radius of gyration of the aggregate.

      Another widely employed expression is that for the structure factor of a mass‐fractal: [33–36]

      (1.62)upper I left-parenthesis q right-parenthesis equals upper I 0 StartFraction sine left-bracket left-parenthesis upper D minus 1 right-parenthesis tangent Superscript negative 1 Baseline left-parenthesis q xi right-parenthesis right-bracket Over left-parenthesis upper D minus 1 right-parenthesis q xi left-parenthesis 1 plus q squared xi squared right-parenthesis Superscript left-parenthesis upper D minus 1 right-parenthesis slash 2 Baseline EndFraction

      where I0 denotes forward scattering, D is the fractal dimension, and ξ is the correlation length.

      Another widely used model was developed by Beaucage for a variety of systems with ordering on multiple length scales including fractal structures, and is based on an expression for the scattering from excluded volume polymer fractals [37, 38]. This gives a function that interpolates between a Guinier function at low q and a Porod function at high q. It is used for many types of systems, such as porous materials (Section 5.11), colloidal and gel aggregate structures, polymer foams, polymer nanocomposites, nanopowders, and other systems. The unified Beaucage expression for a system with one structural level is [39]:

      Here G is a Guinier scaling factor, Rg is the radius of gyration of the mass fractal object, P is a Porod constant, D is the fractal dimension, and erf denotes the error function. The constant P is related to G via the expression [38]:

      Here Γ(D/2) denotes a Gamma function. Analytical expressions are available for G and P for a variety of uniform particles with different shapes as well as types of polymers [40].

Schematic illustration of an example of fitting of SAS data using the unified Beaucage Eq. (1.63) to fit USAXS data for a titania nanopowder (inset: TEM image). The contributions from the Guinier and Porod components of Eq. (1.63) are shown. Also shown for comparison is the limiting Porod slope in a scattering profile from spheres of the same radius of gyration Rg as from the Beaucage model fit.

      Source: From Beaucage et al. [40]. © 2004, International Union of Crystallography.

      A generalized Beaucage function is used for a system with two structural levels with radius of gyration Rg for the fractal and Rsub for the subunits [41]