source: sasmodels/doc/guide/orientation/orientation.rst @ dd16e07

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Last change on this file since dd16e07 was 0d5a655, checked in by Paul Kienzle <pkienzle@…>, 7 years ago

make jitter explorer available from sasview app

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[da5536f]1.. _orientation:
2
3Oriented particles
4==================
5
[7e6bc45e]6With two dimensional small angle diffraction data sasmodels will calculate
[e964ab1]7scattering from oriented particles, applicable for example to shear flow
8or orientation in a magnetic field.
[da5536f]9
[3d40839]10In general we first need to define the reference orientation
[7e6bc45e]11of the particle's $a$-$b$-$c$ axes with respect to the incoming
12neutron or X-ray beam. This is done using three angles: $\theta$ and $\phi$
13define the orientation of the $c$-axis of the particle, and angle $\Psi$ is
14defined as the orientation of the major axis of the particle cross section
15with respect to its starting position along the beam direction (or
16equivalently, as rotation about the $c$ axis). There is an unavoidable
17ambiguity when $c$ is aligned with $z$ in that $\phi$ and $\Psi$ both
18serve to rotate the particle about $c$, but this symmetry is destroyed
19when $\theta$ is not a multiple of 180.
20
21The figures below are for an elliptical cross section cylinder, but may
22be applied analogously to other shapes of particle.
[da5536f]23
24.. note::
[e964ab1]25    It is very important to note that these angles, in particular $\theta$
26    and $\phi$, are NOT in general the same as the $\theta$ and $\phi$
27    appearing in equations for the scattering form factor which gives the
28    scattered intensity or indeed in the equation for scattering vector $Q$.
29    The $\theta$ rotation must be applied before the $\phi$ rotation, else
30    there is an ambiguity.
[da5536f]31
32.. figure::
33    orient_img/elliptical_cylinder_angle_definition.png
34
[e964ab1]35    Definition of angles for oriented elliptical cylinder, where axis_ratio
[7e6bc45e]36    b/a is shown >1. Note that rotation $\theta$, initially in the $x$-$z$
[3d40839]37    plane, is carried out first, then rotation $\phi$ about the $z$-axis,
[e964ab1]38    finally rotation $\Psi$ is around the axis of the cylinder. The neutron
[7e6bc45e]39    or X-ray beam is along the $-z$ axis.
[da5536f]40
41.. figure::
42    orient_img/elliptical_cylinder_angle_projection.png
43
[e964ab1]44    Some examples of the orientation angles for an elliptical cylinder,
45    with $\Psi$ = 0.
[da5536f]46
[7e6bc45e]47Having established the mean direction of the particle (the view) we can then
48apply angular orientation distributions (jitter). This is done by a numerical
49integration over a range of angles in a similar way to particle size
50dispersity. The orientation dispersity is defined with respect to the
51$a$-$b$-$c$ axes of the particle, with roll angle $\Psi$ about the $c$-axis,
52yaw angle $\theta$ about the $b$-axis and pitch angle $\phi$ about the
53$a$-axis.
54
[0d5a655]55You can explore the view and jitter angles interactively using
56:func:`sasmodels.jitter.run`.  Enter the following into the python
57interpreter::
58
59    from sasmodels import jitter
60    jitter.run()
61
[7e6bc45e]62More formally, starting with axes $a$-$b$-$c$ of the particle aligned
63with axes $x$-$y$-$z$ of the laboratory frame, the orientation dispersity
64is applied first, using the
65`Tait-Bryan <https://en.wikipedia.org/wiki/Euler_angles#Conventions_2>`_
66$x$-$y'$-$z''$ convention with angles $\Delta\phi$-$\Delta\theta$-$\Delta\Psi$.
67The reference orientation then follows, using the
68`Euler angles <https://en.wikipedia.org/wiki/Euler_angles#Conventions>`_
69$z$-$y'$-$z''$ with angles $\phi$-$\theta$-$\Psi$.  This is implemented
70using rotation matrices as
71
72.. math::
73
74    R = R_z(\phi)\, R_y(\theta)\, R_z(\Psi)\,
75        R_x(\Delta\phi)\, R_y(\Delta\theta)\, R_z(\Delta\Psi)
76
77To transform detector $(q_x, q_y)$ values into $(q_a, q_b, q_c)$ for the
78shape in its canonical orientation, use
79
80.. math::
81
82    [q_a, q_b, q_c]^T = R^{-1} \, [q_x, q_y, 0]^T
83
84
85The inverse rotation is easily calculated by rotating the opposite directions
86in the reverse order, so
87
88.. math::
89
90    R^{-1} = R_z(-\Delta\Psi)\, R_y(-\Delta\theta)\, R_x(-\Delta\phi)\,
91             R_z(-\Psi)\, R_y(-\theta)\, R_z(-\phi)
92
[da5536f]93
[3d40839]94The $\theta$ and $\phi$ orientation parameters for the cylinder only appear
[5fb0634]95when fitting 2d data. On introducing "Orientational Distribution" in the
[7e6bc45e]96angles, "distribution of theta" and "distribution of phi" parameters will
[e964ab1]97appear. These are actually rotations about the axes $\delta_1$ and $\delta_2$
[7e6bc45e]98of the cylinder, which correspond to the $b$ and $a$ axes of the cylinder
99cross section. (When $\theta = \phi = 0$ these are parallel to the $Y$ and
100$X$ axes of the instrument.) The third orientation distribution, in $\Psi$,
101is about the $c$ axis of the particle. Some experimentation may be required
102to understand the 2d patterns fully. A number of different shapes of
103distribution are available, as described for size dispersity, see
104:ref:`polydispersityhelp`.
105
106Given that the angular dispersion distribution is defined in cartesian space,
107over a cube defined by
108
109.. math::
110
111    [-\Delta \theta, \Delta \theta] \times
112    [-\Delta \phi, \Delta \phi] \times
113    [-\Delta \Psi, \Delta \Psi]
114
115but the orientation is defined over a sphere, we are left with a
116`map projection <https://en.wikipedia.org/wiki/List_of_map_projections>`_
117problem, with different tradeoffs depending on how values in $\Delta\theta$
118and $\Delta\phi$ are translated into latitude/longitude on the sphere.
119
[06ee63c]120Sasmodels is using the
121`equirectangular projection <https://en.wikipedia.org/wiki/Equirectangular_projection>`_.
122In this projection, square patches in angular dispersity become wedge-shaped
123patches on the sphere. To correct for the changing point density, there is a
124scale factor of $\sin(\Delta\theta)$ that applies to each point in the
125integral. This is not enough, though. Consider a shape which is tumbling
126freely around the $b$ axis, with $\Delta\theta$ uniform in $[-180, 180]$. At
127$\pm 90$, all points in $\Delta\phi$ map to the pole, so the jitter will have
[5fb0634]128a distinct angular preference. If the spin axis is along the beam (which
129will be the case for $\theta=90$ and $\Psi=90$) the scattering pattern
130should be circularly symmetric, but it will go to zero at $q_x = 0$ due to the
[06ee63c]131$\sin(\Delta\theta)$ correction. This problem does not appear for a shape
[7e6bc45e]132that is tumbling freely around the $a$ axis, with $\Delta\phi$ uniform in
133$[-180, 180]$, so swap the $a$ and $b$ axes so $\Delta\theta < \Delta\phi$
[5fb0634]134and adjust $\Psi$ by 90. This works with the current sasmodels shapes due to
[06ee63c]135symmetry.
136
[8cfb486]137Alternative projections were considered.
138The `sinusoidal projection <https://en.wikipedia.org/wiki/Sinusoidal_projection>`_
[06ee63c]139works by scaling $\Delta\phi$ as $\Delta\theta$ increases, and dropping those
140points outside $[-180, 180]$. The distortions are a little less for middle
141ranges of $\Delta\theta$, but they are still severe for large $\Delta\theta$
[8cfb486]142and the model is much harder to explain.
143The `azimuthal equidistance projection <https://en.wikipedia.org/wiki/Azimuthal_equidistant_projection>`_
144also improves on the equirectangular projection by extending the range of
145reasonable values for the $\Delta\theta$ range, with $\Delta\phi$ forming a
146wedge that cuts to the opposite side of the sphere rather than cutting to the
147pole. This projection has the nice property that distance from the center are
148preserved, and that $\Delta\theta$ and $\Delta\phi$ act the same.
149The `azimuthal equal area projection <https://en.wikipedia.org/wiki/Lambert_azimuthal_equal-area_projection>`_
150is like the azimuthal equidistance projection, but it preserves area instead
151of distance. It also has the same behaviour for $\Delta\theta$ and $\Delta\phi$.
152The `Guyou projection <https://en.wikipedia.org/wiki/Guyou_hemisphere-in-a-square_projection>`_
[06ee63c]153has an excellent balance with reasonable distortion in both $\Delta\theta$
[5fb0634]154and $\Delta\phi$, as well as preserving small patches. However, it requires
155considerably more computational overhead, and we have not yet derived the
156formula for the distortion correction, measuring the degree of stretch at
157the point $(\Delta\theta, \Delta\phi)$ on the map.
[da5536f]158
[82592da]159.. note::
[7e6bc45e]160    Note that the form factors for oriented particles are performing
161    numerical integrations over one or more variables, so care should be
162    taken, especially with very large particles or more extreme aspect
163    ratios. In such cases results may not be accurate, particularly at very
164    high Q, unless the model has been specifically coded to use limiting
165    forms of the scattering equations.
166
167    For best numerical results keep the $\theta$ distribution narrower than
168    the $\phi$ distribution. Thus for asymmetric particles, such as
169    elliptical_cylinder, you may need to reorder the sizes of the three axes
170    to acheive the desired result. This is due to the issues of mapping a
171    rectanglar distribution onto the surface of a sphere.
172
173Users can experiment with the values of *Npts* and *Nsigs*, the number of steps
174used in the integration and the range spanned in number of standard deviations.
175The standard deviation is entered in units of degrees. For a "rectangular"
176distribution the full width should be $\pm \sqrt(3)$ ~ 1.73 standard deviations.
177The new "uniform" distribution avoids this by letting you directly specify the
[82592da]178half width.
179
[7e6bc45e]180The angular distributions may be truncated outside of the range -180 to +180
181degrees, so beware of using saying a broad Gaussian distribution with large
182value of *Nsigs*, as the array of *Npts* may be truncated to many fewer
183points than would give a good integration,as well as becoming rather
184meaningless. (At some point in the future the actual dispersion arrays may be
185made available to the user for inspection.)
[e964ab1]186
187Some more detailed technical notes are provided in the developer section of
188this manual :ref:`orientation_developer` .
[da5536f]189
[7e6bc45e]190This definition of orientation is new to SasView 4.2.  In earlier versions,
191the orientation distribution appeared as a distribution of view angles.
192This led to strange effects when $c$ was aligned with $z$, where changes
193to the $\phi$ angle served only to rotate the shape about $c$, rather than
194having a consistent interpretation as the pitch of the shape relative to
195the flow field defining the reference orientation.  Prior to SasView 4.1,
196the reference orientation was defined using a Tait-Bryan convention, making
197it difficult to control.  Now, rotation in $\theta$ modifies the spacings
198in the refraction pattern, and rotation in $\phi$ rotates it in the detector
199plane.
200
201
[da5536f]202*Document History*
203
[7e6bc45e]204| 2017-11-06 Richard Heenan
205| 2017-12-20 Paul Kienzle
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