Structure factor: Difference between revisions

Latest revision as of 19:49, 20 February 2015

The static structure factor, $S(k)$ , for a monatomic system composed of spherical scatterers is defined by (Eq. 1 in ^[1]):

S(k):=1+{\frac {4\pi \rho }{k}}\int _{0}^{\infty }(g_{2}(r)-1)r\sin(kr)~{\mathrm {d} }r

where $g_{2}(r)$ is the radial distribution function, and $k$ is the scattering wave-vector modulus

k=|\mathbf {k} |={\frac {4\pi }{\lambda }}\sin \left({\frac {\theta }{2}}\right)

.

The structure factor is basically a Fourier transform of the pair distribution function ${\rm {g}}(r)$ ,

S(|\mathbf {k} |)=1+\rho \int \exp(i\mathbf {k} \cdot \mathbf {r} )\mathrm {g} (r)~\mathrm {d} \mathbf {r}

At zero wavenumber, i.e. $|\mathbf {k} |=0$ ,

S(0)=k_{B}T\left.{\frac {\partial \rho }{\partial p}}\right\vert _{T}

from which one can calculate the isothermal compressibility.

To calculate $S(k)$ in molecular simulations one typically uses:

S(k)={\frac {1}{N}}\sum _{n,m=1}^{N}\langle \exp(-i\mathbf {k} (\mathbf {r} _{n}-\mathbf {r} _{m}))\rangle

,

where $N$ is the number of particles and $\mathbf {r} _{n}$ and $\mathbf {r} _{m}$ are the coordinates of particles $n$ and $m$ respectively.

The dynamic, time dependent structure factor is defined as follows:

S(k,t)={\frac {1}{N}}\sum _{n,m=1}^{N}\langle \exp(-i\mathbf {k} (\mathbf {r} _{n}(t)-\mathbf {r} _{m}(0)))\rangle

,

The ratio between the dynamic and the static structure factor, $S(k,t)/S(k,0)$ , is known as the collective (or coherent) intermediate scattering function.

Binary mixtures[edit]

^[2]^[3]^[4]

References[edit]

Related reading

F. Zernike and J. A. Prins "Die Beugung von Röntgenstrahlen in Flüssigkeiten als Effekt der Molekülanordnung", Zeitschrift für Physik 41 pp. 184-194 (1920)
P. Debye and H. Menke "", Physik. Zeits. 31 pp. 348- (1930)
B. E. Warren "X-Ray Diffraction", Dover Publications (1969) ISBN 0486663175 § 10.4
Jean-Pierre Hansen and I.R. McDonald "Theory of Simple Liquids" (Third Edition) Chapter 4: "Distribution-function Theories" § 4.1

[1] A. Filipponi, "The radial distribution function probed by X-ray absorption spectroscopy", Journal of Physics: Condensed Matter 6 pp. 8415-8427 (1994)

[2] T. E. Faber and J. M. Ziman "A theory of the electrical properties of liquid metals III. the resistivity of binary alloys", Philosophical Magazine 11 pp. 153-173 (1965)

[3] N. W. Ashcroft and David C. Langreth "Structure of Binary Liquid Mixtures. I", Physical Review 156 pp. 685–692 (1967)

[4] A. B. Bhatia and D. E. Thornton "Structural Aspects of the Electrical Resistivity of Binary Alloys", Physical Review B 2 pp. 3004-3012 (1970)

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@@ Line 1: / Line 1: @@
 The '''static structure factor''', <math>S(k)</math>, for a monatomic system composed of spherical scatterers is defined by (Eq. 1 in <ref>[http://dx.doi.org/10.1088/0953-8984/6/41/006 A. Filipponi, "The radial distribution function probed by X-ray absorption spectroscopy", Journal of Physics: Condensed Matter  '''6''' pp.  8415-8427 (1994)]</ref>):
-:<math>S(k) = 1 + \frac{4 \pi \rho}{k} \int_0^{\infty} ( g_2(r) -1 ) r \sin (kr) ~{\mathrm {d}}r</math>
+:<math>S(k) := 1 + \frac{4 \pi \rho}{k} \int_0^{\infty} ( g_2(r) -1 ) r \sin (kr) ~{\mathrm {d}}r</math>
 where <math>g_2(r)</math> is the [[radial distribution function]], and <math>k</math> is the scattering wave-vector modulus

Structure factor: Difference between revisions

Latest revision as of 19:49, 20 February 2015

Binary mixtures[edit]

References[edit]

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