from abc import ABC, abstractmethod
from collections.abc import Iterable
from math import pi
from numbers import Real
from xml.etree import ElementTree as ET
import numpy as np
import openmc.checkvalue as cv
from .._xml import get_text
from .univariate import Univariate, Uniform
[docs]class UnitSphere(ABC):
"""Distribution of points on the unit sphere.
This abstract class is used for angular distributions, since a direction is
represented as a unit vector (i.e., vector on the unit sphere).
Parameters
----------
reference_uvw : Iterable of float
Direction from which polar angle is measured
Attributes
----------
reference_uvw : Iterable of float
Direction from which polar angle is measured
"""
def __init__(self, reference_uvw=None):
self._reference_uvw = None
if reference_uvw is not None:
self.reference_uvw = reference_uvw
@property
def reference_uvw(self):
return self._reference_uvw
@reference_uvw.setter
def reference_uvw(self, uvw):
cv.check_type('reference direction', uvw, Iterable, Real)
uvw = np.asarray(uvw)
self._reference_uvw = uvw/np.linalg.norm(uvw)
@abstractmethod
def to_xml_element(self):
return ''
@classmethod
@abstractmethod
def from_xml_element(cls, elem):
distribution = get_text(elem, 'type')
if distribution == 'mu-phi':
return PolarAzimuthal.from_xml_element(elem)
elif distribution == 'isotropic':
return Isotropic.from_xml_element(elem)
elif distribution == 'monodirectional':
return Monodirectional.from_xml_element(elem)
[docs]class PolarAzimuthal(UnitSphere):
"""Angular distribution represented by polar and azimuthal angles
This distribution allows one to specify the distribution of the cosine of
the polar angle and the azimuthal angle independently of one another. The
polar angle is measured relative to the reference angle.
Parameters
----------
mu : openmc.stats.Univariate
Distribution of the cosine of the polar angle
phi : openmc.stats.Univariate
Distribution of the azimuthal angle in radians
reference_uvw : Iterable of float
Direction from which polar angle is measured. Defaults to the positive
z-direction.
Attributes
----------
mu : openmc.stats.Univariate
Distribution of the cosine of the polar angle
phi : openmc.stats.Univariate
Distribution of the azimuthal angle in radians
"""
def __init__(self, mu=None, phi=None, reference_uvw=(0., 0., 1.)):
super().__init__(reference_uvw)
if mu is not None:
self.mu = mu
else:
self.mu = Uniform(-1., 1.)
if phi is not None:
self.phi = phi
else:
self.phi = Uniform(0., 2*pi)
@property
def mu(self):
return self._mu
@property
def phi(self):
return self._phi
@mu.setter
def mu(self, mu):
cv.check_type('cosine of polar angle', mu, Univariate)
self._mu = mu
@phi.setter
def phi(self, phi):
cv.check_type('azimuthal angle', phi, Univariate)
self._phi = phi
[docs] def to_xml_element(self):
"""Return XML representation of the angular distribution
Returns
-------
element : xml.etree.ElementTree.Element
XML element containing angular distribution data
"""
element = ET.Element('angle')
element.set("type", "mu-phi")
if self.reference_uvw is not None:
element.set("reference_uvw", ' '.join(map(str, self.reference_uvw)))
element.append(self.mu.to_xml_element('mu'))
element.append(self.phi.to_xml_element('phi'))
return element
[docs] @classmethod
def from_xml_element(cls, elem):
"""Generate angular distribution from an XML element
Parameters
----------
elem : xml.etree.ElementTree.Element
XML element
Returns
-------
openmc.stats.PolarAzimuthal
Angular distribution generated from XML element
"""
mu_phi = cls()
params = get_text(elem, 'parameters')
if params is not None:
mu_phi.reference_uvw = [float(x) for x in params.split()]
mu_phi.mu = Univariate.from_xml_element(elem.find('mu'))
mu_phi.phi = Univariate.from_xml_element(elem.find('phi'))
return mu_phi
[docs]class Isotropic(UnitSphere):
"""Isotropic angular distribution."""
def __init__(self):
super().__init__()
[docs] def to_xml_element(self):
"""Return XML representation of the isotropic distribution
Returns
-------
element : xml.etree.ElementTree.Element
XML element containing isotropic distribution data
"""
element = ET.Element('angle')
element.set("type", "isotropic")
return element
[docs] @classmethod
def from_xml_element(cls, elem):
"""Generate isotropic distribution from an XML element
Parameters
----------
elem : xml.etree.ElementTree.Element
XML element
Returns
-------
openmc.stats.Isotropic
Isotropic distribution generated from XML element
"""
return cls()
[docs]class Monodirectional(UnitSphere):
"""Monodirectional angular distribution.
A monodirectional angular distribution is one for which the polar and
azimuthal angles are always the same. It is completely specified by the
reference direction vector.
Parameters
----------
reference_uvw : Iterable of float
Direction from which polar angle is measured. Defaults to the positive
x-direction.
"""
def __init__(self, reference_uvw=[1., 0., 0.]):
super().__init__(reference_uvw)
[docs] def to_xml_element(self):
"""Return XML representation of the monodirectional distribution
Returns
-------
element : xml.etree.ElementTree.Element
XML element containing monodirectional distribution data
"""
element = ET.Element('angle')
element.set("type", "monodirectional")
if self.reference_uvw is not None:
element.set("reference_uvw", ' '.join(map(str, self.reference_uvw)))
return element
[docs] @classmethod
def from_xml_element(cls, elem):
"""Generate monodirectional distribution from an XML element
Parameters
----------
elem : xml.etree.ElementTree.Element
XML element
Returns
-------
openmc.stats.Monodirectional
Monodirectional distribution generated from XML element
"""
monodirectional = cls()
params = get_text(elem, 'parameters')
if params is not None:
monodirectional.reference_uvw = [float(x) for x in params.split()]
return monodirectional
[docs]class Spatial(ABC):
"""Distribution of locations in three-dimensional Euclidean space.
Classes derived from this abstract class can be used for spatial
distributions of source sites.
"""
@abstractmethod
def to_xml_element(self):
return ''
@classmethod
@abstractmethod
def from_xml_element(cls, elem):
distribution = get_text(elem, 'type')
if distribution == 'cartesian':
return CartesianIndependent.from_xml_element(elem)
elif distribution == 'cylindrical':
return CylindricalIndependent.from_xml_element(elem)
elif distribution == 'spherical':
return SphericalIndependent.from_xml_element(elem)
elif distribution == 'box' or distribution == 'fission':
return Box.from_xml_element(elem)
elif distribution == 'point':
return Point.from_xml_element(elem)
[docs]class CartesianIndependent(Spatial):
"""Spatial distribution with independent x, y, and z distributions.
This distribution allows one to specify coordinates whose x-, y-, and z-
components are sampled independently from one another.
Parameters
----------
x : openmc.stats.Univariate
Distribution of x-coordinates
y : openmc.stats.Univariate
Distribution of y-coordinates
z : openmc.stats.Univariate
Distribution of z-coordinates
Attributes
----------
x : openmc.stats.Univariate
Distribution of x-coordinates
y : openmc.stats.Univariate
Distribution of y-coordinates
z : openmc.stats.Univariate
Distribution of z-coordinates
"""
def __init__(self, x, y, z):
self.x = x
self.y = y
self.z = z
@property
def x(self):
return self._x
@property
def y(self):
return self._y
@property
def z(self):
return self._z
@x.setter
def x(self, x):
cv.check_type('x coordinate', x, Univariate)
self._x = x
@y.setter
def y(self, y):
cv.check_type('y coordinate', y, Univariate)
self._y = y
@z.setter
def z(self, z):
cv.check_type('z coordinate', z, Univariate)
self._z = z
[docs] def to_xml_element(self):
"""Return XML representation of the spatial distribution
Returns
-------
element : xml.etree.ElementTree.Element
XML element containing spatial distribution data
"""
element = ET.Element('space')
element.set('type', 'cartesian')
element.append(self.x.to_xml_element('x'))
element.append(self.y.to_xml_element('y'))
element.append(self.z.to_xml_element('z'))
return element
[docs] @classmethod
def from_xml_element(cls, elem):
"""Generate spatial distribution from an XML element
Parameters
----------
elem : xml.etree.ElementTree.Element
XML element
Returns
-------
openmc.stats.CartesianIndependent
Spatial distribution generated from XML element
"""
x = Univariate.from_xml_element(elem.find('x'))
y = Univariate.from_xml_element(elem.find('y'))
z = Univariate.from_xml_element(elem.find('z'))
return cls(x, y, z)
[docs]class SphericalIndependent(Spatial):
r"""Spatial distribution represented in spherical coordinates.
This distribution allows one to specify coordinates whose :math:`r`,
:math:`\theta`, and :math:`\phi` components are sampled independently from
one another and centered on the coordinates (x0, y0, z0).
.. versionadded: 0.12
Parameters
----------
r : openmc.stats.Univariate
Distribution of r-coordinates in a reference frame specified by
the origin parameter
theta : openmc.stats.Univariate
Distribution of theta-coordinates (angle relative to the z-axis) in a
reference frame specified by the origin parameter
phi : openmc.stats.Univariate
Distribution of phi-coordinates (azimuthal angle) in a reference frame
specified by the origin parameter
origin: Iterable of float, optional
coordinates (x0, y0, z0) of the center of the spherical reference frame
for the source. Defaults to (0.0, 0.0, 0.0)
Attributes
----------
r : openmc.stats.Univariate
Distribution of r-coordinates in the local reference frame
theta : openmc.stats.Univariate
Distribution of theta-coordinates (angle relative to the z-axis) in the
local reference frame
phi : openmc.stats.Univariate
Distribution of phi-coordinates (azimuthal angle) in the local
reference frame
origin: Iterable of float, optional
coordinates (x0, y0, z0) of the center of the spherical reference
frame. Defaults to (0.0, 0.0, 0.0)
"""
def __init__(self, r, theta, phi, origin=(0.0, 0.0, 0.0)):
self.r = r
self.theta = theta
self.phi = phi
self.origin = origin
@property
def r(self):
return self._r
@property
def theta(self):
return self._theta
@property
def phi(self):
return self._phi
@property
def origin(self):
return self._origin
@r.setter
def r(self, r):
cv.check_type('r coordinate', r, Univariate)
self._r = r
@theta.setter
def theta(self, theta):
cv.check_type('theta coordinate', theta, Univariate)
self._theta = theta
@phi.setter
def phi(self, phi):
cv.check_type('phi coordinate', phi, Univariate)
self._phi = phi
@origin.setter
def origin(self, origin):
cv.check_type('origin coordinates', origin, Iterable, Real)
origin = np.asarray(origin)
self._origin = origin
[docs] def to_xml_element(self):
"""Return XML representation of the spatial distribution
Returns
-------
element : xml.etree.ElementTree.Element
XML element containing spatial distribution data
"""
element = ET.Element('space')
element.set('type', 'spherical')
element.append(self.r.to_xml_element('r'))
element.append(self.theta.to_xml_element('theta'))
element.append(self.phi.to_xml_element('phi'))
element.set("origin", ' '.join(map(str, self.origin)))
return element
[docs] @classmethod
def from_xml_element(cls, elem):
"""Generate spatial distribution from an XML element
Parameters
----------
elem : xml.etree.ElementTree.Element
XML element
Returns
-------
openmc.stats.SphericalIndependent
Spatial distribution generated from XML element
"""
r = Univariate.from_xml_element(elem.find('r'))
theta = Univariate.from_xml_element(elem.find('theta'))
phi = Univariate.from_xml_element(elem.find('phi'))
origin = [float(x) for x in elem.get('origin').split()]
return cls(r, theta, phi, origin=origin)
[docs]class CylindricalIndependent(Spatial):
r"""Spatial distribution represented in cylindrical coordinates.
This distribution allows one to specify coordinates whose :math:`r`,
:math:`\phi`, and :math:`z` components are sampled independently from
one another and in a reference frame whose origin is specified by the
coordinates (x0, y0, z0).
.. versionadded:: 0.12
Parameters
----------
r : openmc.stats.Univariate
Distribution of r-coordinates in a reference frame specified by the
origin parameter
phi : openmc.stats.Univariate
Distribution of phi-coordinates (azimuthal angle) in a reference frame
specified by the origin parameter
z : openmc.stats.Univariate
Distribution of z-coordinates in a reference frame specified by the
origin parameter
origin: Iterable of float, optional
coordinates (x0, y0, z0) of the center of the cylindrical reference
frame. Defaults to (0.0, 0.0, 0.0)
Attributes
----------
r : openmc.stats.Univariate
Distribution of r-coordinates in the local reference frame
phi : openmc.stats.Univariate
Distribution of phi-coordinates (azimuthal angle) in the local
reference frame
z : openmc.stats.Univariate
Distribution of z-coordinates in the local reference frame
origin: Iterable of float, optional
coordinates (x0, y0, z0) of the center of the cylindrical reference
frame. Defaults to (0.0, 0.0, 0.0)
"""
def __init__(self, r, phi, z, origin=(0.0, 0.0, 0.0)):
self.r = r
self.phi = phi
self.z = z
self.origin = origin
@property
def r(self):
return self._r
@property
def phi(self):
return self._phi
@property
def z(self):
return self._z
@property
def origin(self):
return self._origin
@r.setter
def r(self, r):
cv.check_type('r coordinate', r, Univariate)
self._r = r
@phi.setter
def phi(self, phi):
cv.check_type('phi coordinate', phi, Univariate)
self._phi = phi
@z.setter
def z(self, z):
cv.check_type('z coordinate', z, Univariate)
self._z = z
@origin.setter
def origin(self, origin):
cv.check_type('origin coordinates', origin, Iterable, Real)
origin = np.asarray(origin)
self._origin = origin
[docs] def to_xml_element(self):
"""Return XML representation of the spatial distribution
Returns
-------
element : xml.etree.ElementTree.Element
XML element containing spatial distribution data
"""
element = ET.Element('space')
element.set('type', 'cylindrical')
element.append(self.r.to_xml_element('r'))
element.append(self.phi.to_xml_element('phi'))
element.append(self.z.to_xml_element('z'))
element.set("origin", ' '.join(map(str, self.origin)))
return element
[docs] @classmethod
def from_xml_element(cls, elem):
"""Generate spatial distribution from an XML element
Parameters
----------
elem : xml.etree.ElementTree.Element
XML element
Returns
-------
openmc.stats.CylindricalIndependent
Spatial distribution generated from XML element
"""
r = Univariate.from_xml_element(elem.find('r'))
phi = Univariate.from_xml_element(elem.find('phi'))
z = Univariate.from_xml_element(elem.find('z'))
origin = [float(x) for x in elem.get('origin').split()]
return cls(r, phi, z, origin=origin)
[docs]class Box(Spatial):
"""Uniform distribution of coordinates in a rectangular cuboid.
Parameters
----------
lower_left : Iterable of float
Lower-left coordinates of cuboid
upper_right : Iterable of float
Upper-right coordinates of cuboid
only_fissionable : bool, optional
Whether spatial sites should only be accepted if they occur in
fissionable materials
Attributes
----------
lower_left : Iterable of float
Lower-left coordinates of cuboid
upper_right : Iterable of float
Upper-right coordinates of cuboid
only_fissionable : bool, optional
Whether spatial sites should only be accepted if they occur in
fissionable materials
"""
def __init__(self, lower_left, upper_right, only_fissionable=False):
self.lower_left = lower_left
self.upper_right = upper_right
self.only_fissionable = only_fissionable
@property
def lower_left(self):
return self._lower_left
@property
def upper_right(self):
return self._upper_right
@property
def only_fissionable(self):
return self._only_fissionable
@lower_left.setter
def lower_left(self, lower_left):
cv.check_type('lower left coordinate', lower_left, Iterable, Real)
cv.check_length('lower left coordinate', lower_left, 3)
self._lower_left = lower_left
@upper_right.setter
def upper_right(self, upper_right):
cv.check_type('upper right coordinate', upper_right, Iterable, Real)
cv.check_length('upper right coordinate', upper_right, 3)
self._upper_right = upper_right
@only_fissionable.setter
def only_fissionable(self, only_fissionable):
cv.check_type('only fissionable', only_fissionable, bool)
self._only_fissionable = only_fissionable
[docs] def to_xml_element(self):
"""Return XML representation of the box distribution
Returns
-------
element : xml.etree.ElementTree.Element
XML element containing box distribution data
"""
element = ET.Element('space')
if self.only_fissionable:
element.set("type", "fission")
else:
element.set("type", "box")
params = ET.SubElement(element, "parameters")
params.text = ' '.join(map(str, self.lower_left)) + ' ' + \
' '.join(map(str, self.upper_right))
return element
[docs] @classmethod
def from_xml_element(cls, elem):
"""Generate box distribution from an XML element
Parameters
----------
elem : xml.etree.ElementTree.Element
XML element
Returns
-------
openmc.stats.Box
Box distribution generated from XML element
"""
only_fissionable = get_text(elem, 'type') == 'fission'
params = [float(x) for x in get_text(elem, 'parameters').split()]
lower_left = params[:len(params)//2]
upper_right = params[len(params)//2:]
return cls(lower_left, upper_right, only_fissionable)
[docs]class Point(Spatial):
"""Delta function in three dimensions.
This spatial distribution can be used for a point source where sites are
emitted at a specific location given by its Cartesian coordinates.
Parameters
----------
xyz : Iterable of float, optional
Cartesian coordinates of location. Defaults to (0., 0., 0.).
Attributes
----------
xyz : Iterable of float
Cartesian coordinates of location
"""
def __init__(self, xyz=(0., 0., 0.)):
self.xyz = xyz
@property
def xyz(self):
return self._xyz
@xyz.setter
def xyz(self, xyz):
cv.check_type('coordinate', xyz, Iterable, Real)
cv.check_length('coordinate', xyz, 3)
self._xyz = xyz
[docs] def to_xml_element(self):
"""Return XML representation of the point distribution
Returns
-------
element : xml.etree.ElementTree.Element
XML element containing point distribution location
"""
element = ET.Element('space')
element.set("type", "point")
params = ET.SubElement(element, "parameters")
params.text = ' '.join(map(str, self.xyz))
return element
[docs] @classmethod
def from_xml_element(cls, elem):
"""Generate point distribution from an XML element
Parameters
----------
elem : xml.etree.ElementTree.Element
XML element
Returns
-------
openmc.stats.Point
Point distribution generated from XML element
"""
xyz = [float(x) for x in get_text(elem, 'parameters').split()]
return cls(xyz)