Difference between revisions of "Peak shape"

Latest revision as of 09:15, 12 October 2016

The peak width observed in x-ray scattering can be related to the grain size of the ordered structure giving rise to the scattering peak. More generally, the peak shape also encodes information about the sample order. Thus, peak shape analysis can be used to extract higher-order information.

One interpretation of peak shape is that encodes the average grain shape. That is, the peak shape function is the Fourier transform of the grain shape. Specific examples:

Gaussian peak in reciprocal-space implies a Gaussian-like decorrelation in realspace (i.e. that the average of grains/correlation-volumes decays with a Gaussian profile).
Lorentzian peak in reciprocal-space implies an exponential decorrelation in realspace.
Sinc function in reciprocal-space implies a top-hat function in realspace (sharp domain boundaries, with little to no variation in size of domains).

Note also that instrumental resolution contributes to peak width, and also to peak shape. Scattering peaks are thus sometimes fit using functions that include two contributes (e.g. a Gaussian, representing material grain size, plus a Lorentzian, representing instrumental resolution).

Generalized Peak Shape

A generalized peak shape can be computed using:

{\begin{alignedat}{2}L_{hkl}(q)&={\frac {2}{\pi \delta }}\prod _{n=0}^{\infty }{\left(1+{\frac {\gamma _{\nu }^{2}}{(n+\nu /2)^{2}}}{\frac {4q_{s}^{2}}{\pi ^{2}\delta ^{2}}}\right)^{-1}}\\&={\frac {2}{\pi \delta }}\left|{\frac {\Gamma \left[\nu /2+i\gamma _{\nu }(4q_{s}^{2}/\pi ^{2}\delta ^{2})^{2}\right]}{\Gamma \left[\nu /2\right]}}\right|^{2}\end{alignedat}}

Where $q_{s}=(q-q_{hkl})$ , $\delta$ describes the peak width, and $\nu$ describes the peak shape. The parameter $\gamma _{\nu }$ is a ratio of gamma functions:

\gamma _{\nu }={\sqrt {\pi }}{\frac {\Gamma \left[(\nu +1)/2\right]}{\Gamma \left[\nu +/2\right]}}

The limiting cases for peak shape are:

L_{hkl}(q_{s})=\left\{{\begin{array}{c l l}{\frac {\delta /2\pi }{q_{s}^{2}+(\delta /2)^{2}}}&\mathrm {for} \,\,\nu \to 0&\mathrm {(Lorentzian)} \\{\frac {2}{\pi \delta }}\exp \left[-{\frac {4q_{s}^{2}}{\pi \delta ^{2}}}\right]&\mathrm {for} \,\,\nu \to \infty &\mathrm {(Gaussian)} \\\end{array}}\right.

Thus the parameter $\nu$ allows one to vary continuously between a Lorentzian peak shape and a Gaussian peak shape. Note that for Lorentzian, $\delta$ describes the full-width at half-maximum (FWHM):

\delta _{\mathrm {lorentz} }=\mathrm {fwhm_{\mathrm {lorentz} }}

The Gaussian form can be written a few different ways:

{\begin{alignedat}{2}L_{hkl,\mathrm {gauss} }(q_{s})&={\frac {2}{\pi \delta }}\exp \left[-{\frac {4q_{s}^{2}}{\pi \delta ^{2}}}\right]\\&={\frac {1}{{\sqrt {2\pi }}\sigma }}\exp \left[-{\frac {q_{s}^{2}}{2\sigma ^{2}}}\right]\\&={\sqrt {\frac {\ln {2}}{\pi }}}{\frac {1}{\mathrm {fwhm} }}\exp \left[-{\frac {4\ln {2}q_{s}^{2}}{\mathrm {fwhm} ^{2}}}\right]\\\end{alignedat}}

where the width is described by:

\delta _{\mathrm {gauss} }={\sqrt {\frac {8}{\pi }}}\sigma _{\mathrm {gauss} }={\frac {\mathrm {fwhm} _{\mathrm {gauss} }}{\sqrt {\pi \ln {2}}}}

\sigma _{\mathrm {gauss} }={\sqrt {\frac {\pi }{8}}}\delta _{\mathrm {gauss} }={\frac {\mathrm {fwhm} _{\mathrm {gauss} }}{2{\sqrt {2\ln {2}}}}}

\mathrm {fwhm} _{\mathrm {gauss} }=2{\sqrt {2\ln {2}}}\sigma _{\mathrm {gauss} }={\sqrt {\pi \ln {2}}}\delta _{\mathrm {gauss} }

And note that $2{\sqrt {2\ln {2}}}\approx$ 2.35482004503...

Source

Scattering Curves of Ordered Mesoscopic Materials S. Förster, A. Timmann, M. Konrad, C. Schellbach, A. Meyer, S.S. Funari, P. Mulvaney, R. Knott, J. Phys. Chem. B, 2005, 109 (4), pp 1347–1360 DOI: 10.1021/jp0467494

Literature Examples

Warren/Averbach paracrystal

B. E. Warren, X-RAY STUDIES OF DEFORMED METALS Progress in Metal Physics 1959, 8, 174-202 doi: 10.1016/0502-8205(59)90015-2
B.E. Warren, B.L. Averbach, The Effect of Cold‐Work Distortion on X‐Ray Patterns J. Appl. Phys. 1950, 21, 595 doi: 10.1063/1.1699713
B.E. Warren, B.L. Averbach, The Separation of Cold‐Work Distortion and Particle Size Broadening in X‐Ray Patterns J. Appl. Phys. 1952, 23, 497 doi: 10.1063/1.1702234
B. Crist and J.B. Cohen Fourier Analysis of Polymer X-Ray Diffraction Patterns J. Poly. Sci: Poly. Phys. 1979, 17 (6), 1001-1010 doi: 10.1002/pol.1979.180170609
T.J. Prosa , J. Moulton , A.J. Heeger, and M.J. Winokur, Diffraction Line-Shape Analysis of Poly(3-dodecylthiophene): A Study of Layer Disorder through the Liquid Crystalline Polymer Transition Macromolecules 1999, 32 (12), 4000-4009 doi: 10.1021/ma981059h
Rodrigo Noriega, Jonathan Rivnay, Koen Vandewal, Felix P. V. Koch, Natalie Stingelin, Paul Smith, Michael F. Toney & Alberto Salleo, A general relationship between disorder, aggregation and charge transport in conjugated polymers Nature Materials 2013, 12, 1038-1044 doi: 10.1038/nmat3722; see also Supplementary Information.
Rodrigo Noriega, Jonatahan Rivnay, Alberto Salleo, Michael Toney Warren Averbach analysis of XRD peak shapes: Measuring disorder in soft organic materials

Williamson/Hall

G.K. Williamson, W.H. Hall, X-ray line broadening from filed aluminium and wolfram Acta Metallurgica 1953, 1 (1), 22-31.

@@ Line 2: / Line 2: @@
 The [[peak width]] observed in x-ray scattering can be related to the grain size of the ordered structure giving rise to the scattering peak. More generally, the peak shape also encodes information about the sample order. Thus, peak shape analysis can be used to extract higher-order information.
+One interpretation of peak shape is that encodes the average grain ''shape''. That is, the peak shape function is the [[Fourier transform]] of the grain shape. Specific examples:
+* Gaussian peak in [[reciprocal-space]] implies a Gaussian-like decorrelation in [[realspace]] (i.e. that the ''average'' of grains/correlation-volumes decays with a Gaussian profile).
+* Lorentzian peak in reciprocal-space implies an exponential decorrelation in realspace.
+* Sinc function in reciprocal-space implies a top-hat function in realspace (sharp domain boundaries, with little to no variation in size of domains).
 Note also that [[instrumental resolution]] contributes to peak width, and also to peak shape. Scattering peaks are thus sometimes fit using functions that include two contributes (e.g. a Gaussian, representing material [[grain size]], plus a Lorentzian, representing instrumental resolution).
@@ Line 89: / Line 94: @@
 * R.J. Hill and C.J. Howard, [http://journals.iucr.org/j/issues/1985/03/00/issconts.html Peak shape variation in fixed-wavelength neutron powder diffraction and its effect on structural parameters obtained by Rietveld analysis] ''J. Appl. Cryst.'' '''1985''', 18, 173-180 [http://dx.doi.org/10.1107/S0021889885010068 doi: 10.1107/S0021889885010068]
 * D. Louer and J.I. Langford [http://scripts.iucr.org/cgi-bin/paper?S002188988800411X Peak Shape and Resolution in Conventional Diffractometry with Monochromatic X-rays] ''J. Appl. Cryst.'' '''1988''', 21, 430-437.
+* P. Scardi and M. Leoni [http://scripts.iucr.org/cgi-bin/paper?S0108767301021298 Whole powder pattern modelling] ''Acta Cryst.'' '''2002''', A58, 190-200. [http://dx.doi.org/10.1107/S0108767301021298 doi: 10.1107/S0108767301021298]
 * Gy. Zilahi, T. Ungár and G. Tichy [http://scripts.iucr.org/cgi-bin/paper?po5024 A common theory of line broadening and rocking curves] ''J. Appl. Cryst.'' '''2015''', 48. [http://dx.doi.org/10.1107/S1600576715001466 doi: 10.1107/S1600576715001466]

Difference between revisions of "Peak shape"

Latest revision as of 09:15, 12 October 2016

Contents

Generalized Peak Shape

Source

Literature Examples

Warren/Averbach paracrystal

Williamson/Hall

Grain Size Distribution

Fourier Analysis

Maximum Entropy

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