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# Copyright 2014 by Forschungszentrum Juelich GmbH
# Author: J. Caron
#
"""Create simple magnetic distributions.
The :mod:`~.magcreator` module is responsible for the creation of simple distributions of
magnetic moments. In the :class:`~.Shapes` class, you can find several general shapes for the
3-dimensional volume that should be magnetized (e.g. slabs, spheres, discs or single pixels).
These magnetic shapes are then used as input for the creating functions (or you could specify the
volume yourself as a 3-dimensional boolean matrix or a matrix with values in the range from 0 to 1,
which modifies the magnetization amplitude). The specified volume can either be magnetized
homogeneously with the :func:`~.create_mag_dist_homog` function by specifying the magnetization
direction, or in a vortex state with the :func:`~.create_mag_dist_vortex` by specifying the vortex
center.
"""
from __future__ import division
from numpy import pi
import abc
import logging
__all__ = ['Shapes', 'create_mag_dist_homog', 'create_mag_dist_vortex']
_log = logging.getLogger(__name__)
class Shapes(object):
'''Abstract class containing functions for generating magnetic shapes.
The :class:`~.Shapes` class is a collection of some methods that return a 3-dimensional
matrix that represents the magnetized volume and consists of values between 0 and 1.
This matrix is used in the functions of the :mod:`~.magcreator` module to create
:class:`~pyramid.magdata.MagData` objects which store the magnetic informations.
__metaclass__ = abc.ABCMeta
@classmethod
def slab(cls, dim, center, width):
'''Create the shape of a slab.
Parameters
----------
dim : tuple (N=3)
The dimensions of the grid `(z, y, x)`.
center : tuple (N=3)
The center of the slab in pixel coordinates `(z, y, x)`.
width : tuple (N=3)
The width of the slab in pixel coordinates `(z, y, x)`.
Returns
-------
mag_shape : :class:`~numpy.ndarray` (N=3)
The magnetic shape as a 3D-array with values between 1 and 0.
assert np.shape(dim) == (3,), 'Parameter dim has to be a tuple of length 3!'
assert np.shape(center) == (3,), 'Parameter center has to be a tuple of length 3!'
assert np.shape(width) == (3,), 'Parameter width has to be a tuple of length 3!'
zz, yy, xx = np.indices(dim) + 0.5
xx_shape = np.where(abs(xx-center[2]) <= width[2]/2, True, False)
yy_shape = np.where(abs(yy-center[1]) <= width[1]/2, True, False)
zz_shape = np.where(abs(zz-center[0]) <= width[0]/2, True, False)
return np.logical_and.reduce((xx_shape, yy_shape, zz_shape))
@classmethod
def disc(cls, dim, center, radius, height, axis='z'):
'''Create the shape of a cylindrical disc in x-, y-, or z-direction.
Parameters
----------
dim : tuple (N=3)
The dimensions of the grid `(z, y, x)`.
center : tuple (N=3)
The center of the disc in pixel coordinates `(z, y, x)`.
radius : float
The radius of the disc in pixel coordinates.
height : float
The height of the disc in pixel coordinates.
axis : {'z', 'y', 'x'}, optional
The orientation of the disc axis. The default is 'z'.
Returns
-------
mag_shape : :class:`~numpy.ndarray` (N=3)
The magnetic shape as a 3D-array with values between 1 and 0.
assert np.shape(dim) == (3,), 'Parameter dim has to be a a tuple of length 3!'
assert np.shape(center) == (3,), 'Parameter center has to be a a tuple of length 3!'
assert radius > 0 and np.shape(radius) == (), 'Radius has to be a positive scalar value!'
assert height > 0 and np.shape(height) == (), 'Height has to be a positive scalar value!'
assert axis in {'z', 'y', 'x'}, 'Axis has to be x, y or z (as a string)!'
zz, yy, xx = np.indices(dim) + 0.5
xx -= center[2]
yy -= center[1]
zz -= center[0]
uu, vv, ww = xx, yy, zz
uu, vv, ww = zz, xx, yy
uu, vv, ww = yy, zz, xx
return np.logical_and(np.where(np.hypot(uu, vv) <= radius, True, False),
np.where(abs(ww) <= height/2, True, False))
@classmethod
def ellipse(cls, dim, center, width, height, axis='z'):
'''Create the shape of an elliptical cylinder in x-, y-, or z-direction.
Parameters
----------
dim : tuple (N=3)
The dimensions of the grid `(z, y, x)`.
center : tuple (N=3)
The center of the ellipse in pixel coordinates `(z, y, x)`.
width : tuple (N=2)
Length of the two axes of the ellipse.
height : float
The height of the ellipse in pixel coordinates.
axis : {'z', 'y', 'x'}, optional
The orientation of the ellipse axis. The default is 'z'.
Returns
-------
mag_shape : :class:`~numpy.ndarray` (N=3)
The magnetic shape as a 3D-array with values between 1 and 0.
'''
assert np.shape(dim) == (3,), 'Parameter dim has to be a a tuple of length 3!'
assert np.shape(center) == (3,), 'Parameter center has to be a a tuple of length 3!'
assert np.shape(width) == (2,), 'Parameter width has to be a a tuple of length 2!'
assert height > 0 and np.shape(height) == (), 'Height has to be a positive scalar value!'
assert axis in {'z', 'y', 'x'}, 'Axis has to be x, y or z (as a string)!'
zz, yy, xx = np.indices(dim) + 0.5
xx -= center[2]
yy -= center[1]
zz -= center[0]
uu, vv, ww = xx, yy, zz
uu, vv, ww = xx, zz, yy
uu, vv, ww = yy, zz, xx
distance = np.hypot(uu/(width[1]/2), vv/(width[0]/2))
return np.logical_and(np.where(distance <= 1, True, False),
np.where(abs(ww) <= height/2, True, False))
@classmethod
def sphere(cls, dim, center, radius):
'''Create the shape of a sphere.
Parameters
----------
dim : tuple (N=3)
The dimensions of the grid `(z, y, x)`.
center : tuple (N=3)
The center of the sphere in pixel coordinates `(z, y, x)`.
radius : float
The radius of the sphere in pixel coordinates.
Returns
-------
mag_shape : :class:`~numpy.ndarray` (N=3)
The magnetic shape as a 3D-array with values between 1 and 0.
assert np.shape(dim) == (3,), 'Parameter dim has to be a a tuple of length 3!'
assert np.shape(center) == (3,), 'Parameter center has to be a a tuple of length 3!'
assert radius > 0 and np.shape(radius) == (), 'Radius has to be a positive scalar value!'
zz, yy, xx = np.indices(dim) + 0.5
distance = np.sqrt((xx-center[2])**2 + (yy-center[1])**2 + (zz-center[0])**2)
return np.where(distance <= radius, True, False)
@classmethod
def ellipsoid(cls, dim, center, width):
'''Create the shape of an ellipsoid.
Parameters
----------
dim : tuple (N=3)
The dimensions of the grid `(z, y, x)`.
center : tuple (N=3)
The center of the ellipsoid in pixel coordinates `(z, y, x)`.
width : tuple (N=3)
The width of the ellipsoid `(z, y, x)`.
Returns
-------
mag_shape : :class:`~numpy.ndarray` (N=3)
The magnetic shape as a 3D-array with values between 1 and 0.
'''
assert np.shape(dim) == (3,), 'Parameter dim has to be a a tuple of length 3!'
assert np.shape(center) == (3,), 'Parameter center has to be a a tuple of length 3!'
assert np.shape(width) == (3,), 'Parameter width has to be a a tuple of length 3!'
zz, yy, xx = np.indices(dim) + 0.5
distance = np.sqrt(((xx-center[2]) / (width[2]/2))**2
+ ((yy-center[1]) / (width[1]/2))**2
+ ((zz-center[0]) / (width[0]/2))**2)
return np.where(distance <= 1, True, False)
@classmethod
def filament(cls, dim, pos, axis='y'):
'''Create the shape of a filament.
Parameters
----------
dim : tuple (N=3)
The dimensions of the grid `(z, y, x)`.
pos : tuple (N=2)
The position of the filament in pixel coordinates `(coord1, coord2)`.
`coord1` and `coord2` stand for the two axes, which are perpendicular to `axis`. For
the default case (`axis = y`), it is `(coord1, coord2) = (z, x)`.
axis : {'y', 'x', 'z'}, optional
The orientation of the filament axis. The default is 'y'.
Returns
-------
mag_shape : :class:`~numpy.ndarray` (N=3)
The magnetic shape as a 3D-array with values between 1 and 0.
assert np.shape(dim) == (3,), 'Parameter dim has to be a tuple of length 3!'
assert np.shape(pos) == (2,), 'Parameter pos has to be a tuple of length 2!'
assert axis in {'z', 'y', 'x'}, 'Axis has to be x, y or z (as a string)!'
if axis == 'z':
mag_shape[:, pos[0], pos[1]] = 1
elif axis == 'y':
mag_shape[pos[0], :, pos[1]] = 1
elif axis == 'x':
mag_shape[pos[0], pos[1], :] = 1
return mag_shape
@classmethod
'''Create the shape of a single pixel.
Parameters
----------
dim : tuple (N=3)
The dimensions of the grid `(z, y, x)`.
pixel : tuple (N=3)
The coordinates of the pixel `(z, y, x)`.
Returns
-------
mag_shape : :class:`~numpy.ndarray` (N=3)
The magnetic shape as a 3D-array with values between 1 and 0.
assert np.shape(dim) == (3,), 'Parameter dim has to be a tuple of length 3!'
assert np.shape(pixel) == (3,), 'Parameter pixel has to be a tuple of length 3!'
mag_shape = np.zeros(dim)
mag_shape[pixel] = 1
return mag_shape
def create_mag_dist_homog(mag_shape, phi, theta=pi/2, magnitude=1):
'''Create a 3-dimensional magnetic distribution of a homogeneously magnetized object.
Parameters
----------
mag_shape : :class:`~numpy.ndarray` (N=3)
The magnetic shapes (see Shapes.* for examples).
phi : float
The azimuthal angle, describing the direction of the magnetized object.
theta : float, optional
The polar angle, describing the direction of the magnetized object.
The default is pi/2, which means, the z-component is zero.
magnitude : float, optional
The relative magnitude for the magnetic shape. The default is 1.
Returns
-------
magnitude : tuple (N=3) of :class:`~numpy.ndarray` (N=3)
The magnetic distribution as a tuple of the 3 components in
`x`-, `y`- and `z`-direction on the 3-dimensional grid.
dim = np.shape(mag_shape)
assert len(dim) == 3, 'Magnetic shapes must describe 3-dimensional distributions!'
z_mag = np.ones(dim) * np.cos(theta) * mag_shape * magnitude
y_mag = np.ones(dim) * np.sin(theta) * np.sin(phi) * mag_shape * magnitude
x_mag = np.ones(dim) * np.sin(theta) * np.cos(phi) * mag_shape * magnitude
return np.array([x_mag, y_mag, z_mag])
def create_mag_dist_vortex(mag_shape, center=None, axis='z', magnitude=1):
'''Create a 3-dimensional magnetic distribution of a homogeneous magnetized object.
Parameters
----------
mag_shape : :class:`~numpy.ndarray` (N=3)
The magnetic shapes (see :class:`.~Shapes` for examples).
center : tuple (N=2 or N=3), optional
The vortex center, given in 2D `(v, u)` or 3D `(z, y, x)`, where the perpendicular axis
is is discarded. Is set to the center of the field of view if not specified. The vortex
center has to be between two pixels.
magnitude : float, optional
The relative magnitude for the magnetic shape. The default is 1. Negative signs reverse
the vortex direction (left-handed instead of right-handed).
axis : {'z', 'y', 'x'}, optional
The orientation of the vortex axis. The default is 'z'.
Returns
-------
magnitude : tuple (N=3) of :class:`~numpy.ndarray` (N=3)
The magnetic distribution as a tuple of the 3 components in
`x`-, `y`- and `z`-direction on the 3-dimensional grid.
Notes
-----
To avoid singularities, the vortex center should lie between the pixel centers (which
reside at coordinates with _.5 at the end), i.e. integer values should be used as center
coordinates (e.g. coordinate 1 lies between the first and the second pixel).
'''
dim = np.shape(mag_shape)
assert len(dim) == 3, 'Magnetic shapes must describe 3-dimensional distributions!'
assert axis in {'z', 'y', 'x'}, 'Axis has to be x, y or z (as a string)!'
assert center is None or len(center) in {2, 3}, \
'Vortex center has to be defined in 3D or 2D or not at all!'
if center is None:
center = (dim[1]/2, dim[2]/2)
if axis == 'z':
if len(center) == 3: # if a 3D-center is given, just take the x and y components
center = (center[1], center[2])
u = np.linspace(-center[1], dim[2]-1-center[1], dim[2]) + 0.5 # pixel center!
v = np.linspace(-center[0], dim[1]-1-center[0], dim[1]) + 0.5 # pixel center!
uu, vv = np.meshgrid(u, v)
phi = np.expand_dims(np.arctan2(vv, uu)-pi/2, axis=0)
phi = np.tile(phi, (dim[0], 1, 1))
z_mag = np.zeros(dim)
y_mag = -np.ones(dim) * np.sin(phi) * mag_shape * magnitude
x_mag = -np.ones(dim) * np.cos(phi) * mag_shape * magnitude
elif axis == 'y':
if len(center) == 3: # if a 3D-center is given, just take the x and z components
center = (center[0], center[2])
u = np.linspace(-center[1], dim[2]-1-center[1], dim[2]) + 0.5 # pixel center!
v = np.linspace(-center[0], dim[0]-1-center[0], dim[0]) + 0.5 # pixel center!
uu, vv = np.meshgrid(u, v)
phi = np.expand_dims(np.arctan2(vv, uu)-pi/2, axis=1)
phi = np.tile(phi, (1, dim[1], 1))
z_mag = np.ones(dim) * np.sin(phi) * mag_shape * magnitude
y_mag = np.zeros(dim)
x_mag = np.ones(dim) * np.cos(phi) * mag_shape * magnitude
elif axis == 'x':
if len(center) == 3: # if a 3D-center is given, just take the z and y components
center = (center[0], center[1])
u = np.linspace(-center[1], dim[1]-1-center[1], dim[1]) + 0.5 # pixel center!
v = np.linspace(-center[0], dim[0]-1-center[0], dim[0]) + 0.5 # pixel center!
uu, vv = np.meshgrid(u, v)
phi = np.expand_dims(np.arctan2(vv, uu)-pi/2, axis=2)
phi = np.tile(phi, (1, 1, dim[2]))
z_mag = -np.ones(dim) * np.sin(phi) * mag_shape * magnitude
y_mag = -np.ones(dim) * np.cos(phi) * mag_shape * magnitude
x_mag = np.zeros(dim)
return np.array([x_mag, y_mag, z_mag])