python/rwsims/motions.py

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from __future__ import annotations
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from abc import ABC, abstractmethod
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import numpy as np
from numpy.random import Generator
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class BaseMotion(ABC):
def __init__(self, delta: float, eta: float, rng: Generator):
self._delta = delta
self._eta = eta
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self._rng = rng
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@abstractmethod
def __repr__(self):
pass
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@classmethod
def name(cls) -> str:
"""
:return: Name of the actual class
"""
return cls.__class__.__name__
def header(self) -> str:
return ''
def start(self) -> None:
"""
Function that should be called at the beginning of a trajectory.
"""
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pass
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@abstractmethod
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def jump(self, size: int = 1) -> 'ArrayLike':
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"""
Array of omega_q for trajectory of length `size`.
Implementation is done in subclasses.
:param size: number of jumps that are processed in one go
:return: Array of omega_q of length `size`
"""
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pass
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class RandomJump(BaseMotion):
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def __repr__(self):
return 'Random Jump'
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def jump(self, size: int = 1) -> 'ArrayLike':
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return omega_q(self._delta, self._eta, *draw_orientation(self._rng, size=size))
class TetrahedralJump(BaseMotion):
def __init__(self, delta: float, eta: float, rng: Generator):
super().__init__(delta, eta, rng)
self._orientation = None
self._start = None
def __repr__(self):
return 'Tetrahedral Jump'
def start(self):
self._orientation = self._make_tetrahedron()
self._start = self._rng.choice([0, 1, 2, 3])
def _make_tetrahedron(self) -> np.ndarray:
beta = np.arccos(-1/3) # tetrahedral angle 109.5 degrees
sin_beta = np.sin(beta)
cos_beta = np.cos(beta)
# corners of a tetrahedron
alpha = 2 * np.pi * self._rng.random()
corners = np.array([
[0, 0, 1],
[sin_beta * np.cos(alpha), sin_beta * np.sin(alpha), cos_beta],
[sin_beta * np.cos(alpha+2*np.pi/3), sin_beta * np.sin(alpha+2*np.pi/3), cos_beta],
[sin_beta * np.cos(alpha+4*np.pi/3), sin_beta * np.sin(alpha+4*np.pi/3), cos_beta]
])
# orientation in lab system
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cos_theta0, phi0 = draw_orientation(self._rng)
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rot = get_rotation_matrix(
corners[0],
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np.array(spherical_to_xyz(1., np.arccos(cos_theta0), phi0)),
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)
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orientations = np.zeros(4)
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c = []
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for i in range(4):
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corner_lab = np.dot(rot, corners[i])
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_, theta_i, phi_i = xyz_to_spherical(*corner_lab)
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c.append(corner_lab)
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orientations[i] = omega_q(self._delta, self._eta, theta_i, phi_i)
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return orientations
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def jump(self, size: int = 1) -> 'ArrayLike':
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jumps = self._rng.choice([1, 2, 3], size=size)
jumps = np.cumsum(jumps) + self._start
jumps %= 4
self._start = jumps[-1]
return self._orientation[jumps]
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# Helper functions
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def xyz_to_spherical(x_in: float, y_in: float, z_in: float) -> tuple[float, float, float]:
r: float = np.linalg.norm([x_in, y_in, z_in])
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theta: float = np.arccos(z_in)
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theta += 2*np.pi
theta %= 2*np.pi
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phi: float = np.arctan2(y_in, x_in)
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phi += 2*np.pi
phi %= 2*np.pi
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return r, theta, phi
def spherical_to_xyz(r: float, theta: float, phi: float) -> tuple[float, float, float]:
sin_theta = np.sin(theta)
return r*np.cos(phi)*sin_theta, r*np.sin(phi)*sin_theta, r*np.cos(theta)
def get_rotation_matrix(vec_in: np.ndarray, vec_out: np.ndarray):
rotation = np.eye(3)
# rotation by angle around given axis
cos_angle = np.dot(vec_in, vec_out)
# check for parallel / anti-parallel vectors
if cos_angle == 1:
return rotation
elif cos_angle == -1:
return -rotation
else:
axis = np.cross(vec_in, vec_out)
scale = np.linalg.norm(axis)
axis /= scale
sin_angle = scale / np.linalg.norm(vec_in) / np.linalg.norm(vec_out)
v_cross = np.array([
[0, -axis[2], axis[1]],
[axis[2], 0, -axis[0]],
[-axis[1], axis[0], 0],
])
rotation += sin_angle * v_cross
rotation += (1-cos_angle) * v_cross @ v_cross
return rotation
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def omega_q(delta: float, eta: float, cos_theta: 'ArrayLike', phi: 'ArrayLike') -> 'ArrayLike':
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# sin_theta = np.sin(cos_theta)
# cos_theta = np.cos(cos_theta)
sin_theta_sq = 1 - cos_theta**2
return np.pi * delta * (3 * cos_theta**2 - 1 + eta * sin_theta_sq * np.cos(2*phi))
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def draw_orientation(rng: Generator, size: int | None = None) -> tuple['ArrayLike', 'ArrayLike']:
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if size is not None:
z_theta, z_phi = rng.random((2, size))
else:
z_theta, z_phi = rng.random(2)
cos_theta = 1 - 2 * z_theta
phi = 2 * np.pi * z_phi
return cos_theta, phi