Difference between revisions of "Debye-Waller factor"

Latest revision as of 09:01, 29 October 2014

The Debye-Waller factor is a term (in scattering equations) which accounts for how thermal fluctuations extinguish scattering intensity (especially high-q peaks). This scattering intensity then appears as diffuse scattering. Conceptually, thermal fluctuations create disorder, because the atoms/particles oscillate about their equilibrium positions and thus the lattice is never (instantaneously) perfect.

The same conceptual framework can be used to describe static disorder. A defective lattice where many particles are displaced from their idealized positions will cause the structural scattering to be weakened, with diffuse scattering appearing instead.

Mathematical form

For a lattice-size a, the constituent entities (atoms, particles, etc.) will oscillate about their equilibrium positions with an rms width $\sigma _{a}$ , attenuating structural peaks like:

{\begin{alignedat}{2}G(q)&=e^{-\langle u^{2}\rangle q^{2}}\\&=e^{-\sigma _{\mathrm {rms} }^{2}q^{2}}\\&=e^{-\sigma _{a}^{2}a^{2}q^{2}}\end{alignedat}}

Where $\sigma _{\mathrm {rms} }\equiv {\sqrt {\langle u^{2}\rangle }}$ is the root-mean-square displacement of the lattice-spacing a (such that the spacing at time t is $a+u(t)$ ), and $\sigma _{a}\equiv \sigma _{\mathrm {rms} }/a$ is the relative displacement.

Thus, the intensity of the structural peaks is multiplied by $G(q)$ , which attenuates the higher-order (high-q) peaks, and redistributes this intensity into a diffuse scattering term, which appears in the structure factor ( $S(q)$ ) as:

S_{\mathrm {diffuse} }(q)=\left[1-G(q)\right]

And thus appears in the overall intensity as:

I_{\mathrm {diffuse} }(q)=P(q)\left[1-G(q)\right]

where $P(q)$ is the form factor.

In the high-q limit, form factors frequently exhibit a $q^{-4}$ scaling (c.f. sphere form factor), in which case one expects (since $G(q\rightarrow \infty )=0$ ):

I_{\mathrm {diffuse} }(q\rightarrow \infty )\propto q^{-4}

(Which reproduces the scaling of the Porod law.)

@@ Line 1: / Line 1: @@
-The '''Debye-Waller factor''' is a term (in scattering equations) which accounts for how thermal fluctuations extinguish scattering intensity (especially high-''q'' peaks). This scattering intensity then appears as [[diffuse scattering]]. Conceptually, thermal fluctuations create disorder, because the atoms/particles oscillate about their equilibrium positions and thus the lattice is never (instantaneously) perfect.
+The '''Debye-Waller factor''' is a term (in [[scattering]] equations) which accounts for how thermal fluctuations extinguish scattering intensity (especially high-''q'' peaks). This scattering intensity then appears as [[diffuse scattering]]. Conceptually, thermal fluctuations create disorder, because the atoms/particles oscillate about their equilibrium positions and thus the lattice is never (instantaneously) perfect.
+The same conceptual framework can be used to describe static disorder. A defective [[lattice]] where many particles are displaced from their idealized positions will cause the structural scattering to be weakened, with diffuse scattering appearing instead.
 ==Mathematical form==
-For a lattice-size ''a'', the constituent entities (atoms, particles, etc.) will oscillate about their equilibrium positions with an rms width <math>\sigma_a</math>, attenuating structural peaks like:
+For a [[lattice]]-size ''a'', the constituent entities (atoms, particles, etc.) will oscillate about their equilibrium positions with an rms width <math>\sigma_a</math>, attenuating structural peaks like:
 :<math>
@@ Line 13: / Line 15: @@
 Where <math>\sigma_{\mathrm{rms}} \equiv \sqrt{ \langle u^2 \rangle }</math> is the [http://en.wikipedia.org/wiki/Root_mean_square root-mean-square] displacement of the lattice-spacing ''a'' (such that the spacing at time ''t'' is <math>a+u(t)</math>), and <math>\sigma_a \equiv \sigma_{\mathrm{rms}}/a</math> is the relative displacement.
-Thus, the intensity of the structural peaks is multiplied by <math>G(q)</math>, which attenuates the higher-order (high-''q'') peaks, and redistributes this intensity into a [[diffuse scattering]] term, which appears in the [[structure factor]] (<math>S(q)</math>) as:
+Thus, the intensity of the structural peaks is multiplied by <math>G(q)</math>, which attenuates the [[Tutorial:Qualitative_inspection#Higher_Orders|higher-order]] (high-''q'') peaks, and redistributes this intensity into a [[diffuse scattering]] term, which appears in the [[structure factor]] (<math>S(q)</math>) as:
 :<math>
 S_{\mathrm{diffuse}}(q) = \left[ 1- G(q) \right]
@@ Line 23: / Line 25: @@
 where <math>P(q)</math> is the [[form factor]].
-In the high-''q'' limit, form factors frequently exhibit a <math>q^{-4}</math> scaling (c.f. [[Form_Factor:Sphere#Isotropic_Form_Factor_Intensity_at_large_q|sphere form factor]]), in which case one expects (since <math>G(q \rightarrow \infty) = 1</math>):
+In the high-''q'' limit, form factors frequently exhibit a <math>q^{-4}</math> scaling (c.f. [[Form_Factor:Sphere#Isotropic_Form_Factor_Intensity_at_large_q|sphere form factor]]), in which case one expects (since <math>G(q \rightarrow \infty) = 0</math>):
 :<math>
 I_{\mathrm{diffuse}}(q \rightarrow \infty) \propto q^{-4}
 </math>
+(Which reproduces the scaling of the [[Diffuse_scattering#Porod_law|Porod law]].)
 ==See Also==
 * [http://en.wikipedia.org/wiki/Debye%E2%80%93Waller_factor Wikipedia: Debye-Waller factor]

Difference between revisions of "Debye-Waller factor"

Latest revision as of 09:01, 29 October 2014

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