Merge branch 'misc-improvements' into 'development'
Misc improvements See merge request damask/DAMASK!181
This commit is contained in:
commit
17212b27dc
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@ -27,7 +27,7 @@ SolidSolutionStrength 0.0 # Strength due to elements in solid solution
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### Dislocation glide parameters ###
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### Dislocation glide parameters ###
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#per family
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#per family
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Nslip 12 0
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Nslip 12
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slipburgers 2.72e-10 # Burgers vector of slip system [m]
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slipburgers 2.72e-10 # Burgers vector of slip system [m]
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rhoedge0 1.0e12 # Initial edge dislocation density [m/m**3]
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rhoedge0 1.0e12 # Initial edge dislocation density [m/m**3]
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rhoedgedip0 1.0 # Initial edged dipole dislocation density [m/m**3]
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rhoedgedip0 1.0 # Initial edged dipole dislocation density [m/m**3]
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@ -20,8 +20,8 @@ class Rotation:
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when viewing from the end point of the rotation axis towards the origin.
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when viewing from the end point of the rotation axis towards the origin.
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- rotations will be interpreted in the passive sense.
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- rotations will be interpreted in the passive sense.
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- Euler angle triplets are implemented using the Bunge convention,
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- Euler angle triplets are implemented using the Bunge convention,
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with the angular ranges as [0, 2π],[0, π],[0, 2π].
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with the angular ranges as [0,2π], [0,π], [0,2π].
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- the rotation angle ω is limited to the interval [0, π].
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- the rotation angle ω is limited to the interval [0,π].
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- the real part of a quaternion is positive, Re(q) > 0
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- the real part of a quaternion is positive, Re(q) > 0
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- P = -1 (as default).
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- P = -1 (as default).
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@ -49,7 +49,8 @@ class Rotation:
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Parameters
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Parameters
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----------
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----------
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quaternion : numpy.ndarray, optional
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quaternion : numpy.ndarray, optional
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Unit quaternion that follows the conventions. Use .from_quaternion to perform a sanity check.
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Unit quaternion in positive real hemisphere.
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Use .from_quaternion to perform a sanity check.
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"""
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"""
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self.quaternion = quaternion.copy()
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self.quaternion = quaternion.copy()
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@ -73,7 +74,7 @@ class Rotation:
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raise NotImplementedError('Support for multiple rotations missing')
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raise NotImplementedError('Support for multiple rotations missing')
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return '\n'.join([
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return '\n'.join([
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'Quaternion: (real={:.3f}, imag=<{:+.3f}, {:+.3f}, {:+.3f}>)'.format(*(self.quaternion)),
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'Quaternion: (real={:.3f}, imag=<{:+.3f}, {:+.3f}, {:+.3f}>)'.format(*(self.quaternion)),
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'Matrix:\n{}'.format(self.as_matrix()),
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'Matrix:\n{}'.format(np.round(self.as_matrix(),8)),
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'Bunge Eulers / deg: ({:3.2f}, {:3.2f}, {:3.2f})'.format(*self.as_Eulers(degrees=True)),
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'Bunge Eulers / deg: ({:3.2f}, {:3.2f}, {:3.2f})'.format(*self.as_Eulers(degrees=True)),
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])
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])
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@ -87,10 +88,6 @@ class Rotation:
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other : numpy.ndarray or Rotation
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other : numpy.ndarray or Rotation
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Vector, second or fourth order tensor, or rotation object that is rotated.
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Vector, second or fourth order tensor, or rotation object that is rotated.
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Todo
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----
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Check rotation of 4th order tensor
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"""
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"""
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if isinstance(other, Rotation):
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if isinstance(other, Rotation):
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q_m = self.quaternion[...,0:1]
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q_m = self.quaternion[...,0:1]
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@ -99,7 +96,7 @@ class Rotation:
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p_o = other.quaternion[...,1:]
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p_o = other.quaternion[...,1:]
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q = (q_m*q_o - np.einsum('...i,...i',p_m,p_o).reshape(self.shape+(1,)))
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q = (q_m*q_o - np.einsum('...i,...i',p_m,p_o).reshape(self.shape+(1,)))
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p = q_m*p_o + q_o*p_m + _P * np.cross(p_m,p_o)
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p = q_m*p_o + q_o*p_m + _P * np.cross(p_m,p_o)
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return self.__class__(np.block([q,p])).standardize()
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return self.__class__(np.block([q,p]))._standardize()
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elif isinstance(other,np.ndarray):
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elif isinstance(other,np.ndarray):
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if self.shape + (3,) == other.shape:
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if self.shape + (3,) == other.shape:
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@ -124,24 +121,24 @@ class Rotation:
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else:
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else:
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raise TypeError('Cannot rotate {}'.format(type(other)))
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raise TypeError('Cannot rotate {}'.format(type(other)))
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def inverse(self):
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"""In-place inverse rotation/backward rotation."""
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self.quaternion[...,1:] *= -1
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return self
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def inversed(self):
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def _standardize(self):
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"""Inverse rotation/backward rotation."""
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"""Standardize (ensure positive real hemisphere)."""
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return self.copy().inverse()
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def standardize(self):
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"""In-place quaternion representation with positive real part."""
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self.quaternion[self.quaternion[...,0] < 0.0] *= -1
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self.quaternion[self.quaternion[...,0] < 0.0] *= -1
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return self
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return self
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def standardized(self):
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def inverse(self):
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"""Quaternion representation with positive real part."""
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"""In-place inverse rotation (backward rotation)."""
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return self.copy().standardize()
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self.quaternion[...,1:] *= -1
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return self
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def __invert__(self):
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"""Inverse rotation (backward rotation)."""
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return self.copy().inverse()
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def inversed(self):
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"""Inverse rotation (backward rotation)."""
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return ~ self
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def misorientation(self,other):
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def misorientation(self,other):
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@ -154,7 +151,7 @@ class Rotation:
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Rotation to which the misorientation is computed.
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Rotation to which the misorientation is computed.
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"""
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"""
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return other*self.inversed()
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return other@~self
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def broadcast_to(self,shape):
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def broadcast_to(self,shape):
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@ -169,7 +166,7 @@ class Rotation:
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return self.__class__(q)
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return self.__class__(q)
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def average(self,other):
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def average(self,other): #ToDo: discuss calling for vectors
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"""
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"""
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Calculate the average rotation.
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Calculate the average rotation.
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@ -189,25 +186,31 @@ class Rotation:
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def as_quaternion(self):
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def as_quaternion(self):
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"""
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"""
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Unit quaternion [q, p_1, p_2, p_3].
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Represent as unit quaternion.
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Parameters
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Returns
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----------
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-------
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quaternion : bool, optional
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q : numpy.ndarray of shape (...,4)
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return quaternion as DAMASK object.
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Unit quaternion in positive real hemisphere: (q_0, q_1, q_2, q_3), |q|=1, q_0 ≥ 0.
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"""
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"""
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return self.quaternion
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return self.quaternion.copy()
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def as_Eulers(self,
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def as_Eulers(self,
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degrees = False):
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degrees = False):
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"""
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"""
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Bunge-Euler angles: (φ_1, ϕ, φ_2).
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Represent as Bunge-Euler angles.
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Parameters
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Parameters
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----------
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----------
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degrees : bool, optional
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degrees : bool, optional
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return angles in degrees.
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Return angles in degrees.
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Returns
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-------
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phi : numpy.ndarray of shape (...,3)
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Bunge-Euler angles: (φ_1, ϕ, φ_2), φ_1 ∈ [0,2π], ϕ ∈ [0,π], φ_2 ∈ [0,2π]
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unless degrees == True: φ_1 ∈ [0,360], ϕ ∈ [0,180], φ_2 ∈ [0,360]
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"""
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"""
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eu = Rotation._qu2eu(self.quaternion)
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eu = Rotation._qu2eu(self.quaternion)
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@ -218,14 +221,21 @@ class Rotation:
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degrees = False,
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degrees = False,
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pair = False):
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pair = False):
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"""
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"""
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Axis angle representation [n_1, n_2, n_3, ω] unless pair == True: ([n_1, n_2, n_3], ω).
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Represent as axis angle pair.
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Parameters
|
Parameters
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----------
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----------
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degrees : bool, optional
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degrees : bool, optional
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return rotation angle in degrees.
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Return rotation angle in degrees. Defaults to False.
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pair : bool, optional
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pair : bool, optional
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return tuple of axis and angle.
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Return tuple of axis and angle. Defaults to False.
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Returns
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-------
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axis_angle : numpy.ndarray of shape (...,4) unless pair == True:
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tuple containing numpy.ndarray of shapes (...,3) and (...)
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Axis angle pair: (n_1, n_2, n_3, ω), |n| = 1 and ω ∈ [0,π]
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unless degrees = True: ω ∈ [0,180].
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"""
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"""
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ax = Rotation._qu2ax(self.quaternion)
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ax = Rotation._qu2ax(self.quaternion)
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@ -233,29 +243,60 @@ class Rotation:
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return (ax[...,:3],ax[...,3]) if pair else ax
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return (ax[...,:3],ax[...,3]) if pair else ax
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def as_matrix(self):
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def as_matrix(self):
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"""Rotation matrix."""
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"""
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Represent as rotation matrix.
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Returns
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-------
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R : numpy.ndarray of shape (...,3,3)
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Rotation matrix R, det(R) = 1, R.T∙R=I.
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"""
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return Rotation._qu2om(self.quaternion)
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return Rotation._qu2om(self.quaternion)
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def as_Rodrigues(self,
|
def as_Rodrigues(self,
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vector = False):
|
vector = False):
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"""
|
"""
|
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Rodrigues-Frank vector representation [n_1, n_2, n_3, tan(ω/2)] unless vector == True: [n_1, n_2, n_3] * tan(ω/2).
|
Represent as Rodrigues-Frank vector with separated axis and angle argument.
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|
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Parameters
|
Parameters
|
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----------
|
----------
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vector : bool, optional
|
vector : bool, optional
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return as actual Rodrigues--Frank vector, i.e. rotation axis scaled by tan(ω/2).
|
Return as actual Rodrigues-Frank vector, i.e. axis
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|
and angle argument are not separated.
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|
Returns
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|
-------
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|
rho : numpy.ndarray of shape (...,4) unless vector == True:
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|
numpy.ndarray of shape (...,3)
|
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|
Rodrigues-Frank vector: [n_1, n_2, n_3, tan(ω/2)], |n| = 1 and ω ∈ [0,π].
|
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|
|
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"""
|
"""
|
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ro = Rotation._qu2ro(self.quaternion)
|
ro = Rotation._qu2ro(self.quaternion)
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return ro[...,:3]*ro[...,3] if vector else ro
|
return ro[...,:3]*ro[...,3] if vector else ro
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|
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def as_homochoric(self):
|
def as_homochoric(self):
|
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"""Homochoric vector: (h_1, h_2, h_3)."""
|
"""
|
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|
Represent as homochoric vector.
|
||||||
|
|
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|
Returns
|
||||||
|
-------
|
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|
h : numpy.ndarray of shape (...,3)
|
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|
Homochoric vector: (h_1, h_2, h_3), |h| < 1/2*π^(2/3).
|
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|
|
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|
"""
|
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return Rotation._qu2ho(self.quaternion)
|
return Rotation._qu2ho(self.quaternion)
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|
|
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def as_cubochoric(self):
|
def as_cubochoric(self):
|
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"""Cubochoric vector: (c_1, c_2, c_3)."""
|
"""
|
||||||
|
Represent as cubochoric vector.
|
||||||
|
|
||||||
|
Returns
|
||||||
|
-------
|
||||||
|
c : numpy.ndarray of shape (...,3)
|
||||||
|
Cubochoric vector: (c_1, c_2, c_3), max(c_i) < 1/2*π^(2/3).
|
||||||
|
|
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|
"""
|
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return Rotation._qu2cu(self.quaternion)
|
return Rotation._qu2cu(self.quaternion)
|
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|
|
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def M(self): # ToDo not sure about the name: as_M or M? we do not have a from_M
|
def M(self): # ToDo not sure about the name: as_M or M? we do not have a from_M
|
||||||
|
@ -275,18 +316,34 @@ class Rotation:
|
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# Static constructors. The input data needs to follow the conventions, options allow to
|
# Static constructors. The input data needs to follow the conventions, options allow to
|
||||||
# relax the conventions.
|
# relax the conventions.
|
||||||
@staticmethod
|
@staticmethod
|
||||||
def from_quaternion(quaternion,
|
def from_quaternion(q,
|
||||||
accept_homomorph = False,
|
accept_homomorph = False,
|
||||||
P = -1,
|
P = -1,
|
||||||
acceptHomomorph = None):
|
acceptHomomorph = None): # old name (for compatibility)
|
||||||
|
"""
|
||||||
|
Initialize from quaternion.
|
||||||
|
|
||||||
|
Parameters
|
||||||
|
----------
|
||||||
|
q : numpy.ndarray of shape (...,4)
|
||||||
|
Unit quaternion in positive real hemisphere: (q_0, q_1, q_2, q_3),
|
||||||
|
|q|=1, q_0 ≥ 0.
|
||||||
|
accept_homomorph : boolean, optional
|
||||||
|
Allow homomorphic variants, i.e. q_0 < 0 (negative real hemisphere).
|
||||||
|
Defaults to False.
|
||||||
|
P : integer ∈ {-1,1}, optional
|
||||||
|
Convention used. Defaults to -1.
|
||||||
|
|
||||||
|
"""
|
||||||
if acceptHomomorph is not None:
|
if acceptHomomorph is not None:
|
||||||
accept_homomorph = acceptHomomorph
|
accept_homomorph = acceptHomomorph # for compatibility
|
||||||
qu = np.array(quaternion,dtype=float)
|
qu = np.array(q,dtype=float)
|
||||||
if qu.shape[:-2:-1] != (4,):
|
if qu.shape[:-2:-1] != (4,):
|
||||||
raise ValueError('Invalid shape.')
|
raise ValueError('Invalid shape.')
|
||||||
|
if abs(P) != 1:
|
||||||
|
raise ValueError('P ∉ {-1,1}')
|
||||||
|
|
||||||
if P > 0: qu[...,1:4] *= -1 # convert from P=1 to P=-1
|
if P == 1: qu[...,1:4] *= -1
|
||||||
if accept_homomorph:
|
if accept_homomorph:
|
||||||
qu[qu[...,0] < 0.0] *= -1
|
qu[qu[...,0] < 0.0] *= -1
|
||||||
else:
|
else:
|
||||||
|
@ -298,10 +355,21 @@ class Rotation:
|
||||||
return Rotation(qu)
|
return Rotation(qu)
|
||||||
|
|
||||||
@staticmethod
|
@staticmethod
|
||||||
def from_Eulers(eulers,
|
def from_Eulers(phi,
|
||||||
degrees = False):
|
degrees = False):
|
||||||
|
"""
|
||||||
|
Initialize from Bunge-Euler angles.
|
||||||
|
|
||||||
eu = np.array(eulers,dtype=float)
|
Parameters
|
||||||
|
----------
|
||||||
|
phi : numpy.ndarray of shape (...,3)
|
||||||
|
Bunge-Euler angles: (φ_1, ϕ, φ_2), φ_1 ∈ [0,2π], ϕ ∈ [0,π], φ_2 ∈ [0,2π]
|
||||||
|
unless degrees == True: φ_1 ∈ [0,360], ϕ ∈ [0,180], φ_2 ∈ [0,360].
|
||||||
|
degrees : boolean, optional
|
||||||
|
Bunge-Euler angles are given in degrees. Defaults to False.
|
||||||
|
|
||||||
|
"""
|
||||||
|
eu = np.array(phi,dtype=float)
|
||||||
if eu.shape[:-2:-1] != (3,):
|
if eu.shape[:-2:-1] != (3,):
|
||||||
raise ValueError('Invalid shape.')
|
raise ValueError('Invalid shape.')
|
||||||
|
|
||||||
|
@ -316,12 +384,29 @@ class Rotation:
|
||||||
degrees = False,
|
degrees = False,
|
||||||
normalise = False,
|
normalise = False,
|
||||||
P = -1):
|
P = -1):
|
||||||
|
"""
|
||||||
|
Initialize from Axis angle pair.
|
||||||
|
|
||||||
|
Parameters
|
||||||
|
----------
|
||||||
|
axis_angle : numpy.ndarray of shape (...,4)
|
||||||
|
Axis angle pair: [n_1, n_2, n_3, ω], |n| = 1 and ω ∈ [0,π]
|
||||||
|
unless degrees = True: ω ∈ [0,180].
|
||||||
|
degrees : boolean, optional
|
||||||
|
Angle ω is given in degrees. Defaults to False.
|
||||||
|
normalize: boolean, optional
|
||||||
|
Allow |n| ≠ 1. Defaults to False.
|
||||||
|
P : integer ∈ {-1,1}, optional
|
||||||
|
Convention used. Defaults to -1.
|
||||||
|
|
||||||
|
"""
|
||||||
ax = np.array(axis_angle,dtype=float)
|
ax = np.array(axis_angle,dtype=float)
|
||||||
if ax.shape[:-2:-1] != (4,):
|
if ax.shape[:-2:-1] != (4,):
|
||||||
raise ValueError('Invalid shape.')
|
raise ValueError('Invalid shape.')
|
||||||
|
if abs(P) != 1:
|
||||||
|
raise ValueError('P ∉ {-1,1}')
|
||||||
|
|
||||||
if P > 0: ax[...,0:3] *= -1 # convert from P=1 to P=-1
|
if P == 1: ax[...,0:3] *= -1
|
||||||
if degrees: ax[..., 3] = np.radians(ax[...,3])
|
if degrees: ax[..., 3] = np.radians(ax[...,3])
|
||||||
if normalise: ax[...,0:3] /= np.linalg.norm(ax[...,0:3],axis=-1)
|
if normalise: ax[...,0:3] /= np.linalg.norm(ax[...,0:3],axis=-1)
|
||||||
if np.any(ax[...,3] < 0.0) or np.any(ax[...,3] > np.pi):
|
if np.any(ax[...,3] < 0.0) or np.any(ax[...,3] > np.pi):
|
||||||
|
@ -335,7 +420,19 @@ class Rotation:
|
||||||
def from_basis(basis,
|
def from_basis(basis,
|
||||||
orthonormal = True,
|
orthonormal = True,
|
||||||
reciprocal = False):
|
reciprocal = False):
|
||||||
|
"""
|
||||||
|
Initialize from lattice basis vectors.
|
||||||
|
|
||||||
|
Parameters
|
||||||
|
----------
|
||||||
|
basis : numpy.ndarray of shape (...,3,3)
|
||||||
|
Three lattice basis vectors in three dimensions.
|
||||||
|
orthonormal : boolean, optional
|
||||||
|
Basis is strictly orthonormal, i.e. is free of stretch components. Defaults to True.
|
||||||
|
reciprocal : boolean, optional
|
||||||
|
Basis vectors are given in reciprocal (instead of real) space. Defaults to False.
|
||||||
|
|
||||||
|
"""
|
||||||
om = np.array(basis,dtype=float)
|
om = np.array(basis,dtype=float)
|
||||||
if om.shape[:-3:-1] != (3,3):
|
if om.shape[:-3:-1] != (3,3):
|
||||||
raise ValueError('Invalid shape.')
|
raise ValueError('Invalid shape.')
|
||||||
|
@ -356,20 +453,43 @@ class Rotation:
|
||||||
return Rotation(Rotation._om2qu(om))
|
return Rotation(Rotation._om2qu(om))
|
||||||
|
|
||||||
@staticmethod
|
@staticmethod
|
||||||
def from_matrix(om):
|
def from_matrix(R):
|
||||||
|
"""
|
||||||
|
Initialize from rotation matrix.
|
||||||
|
|
||||||
return Rotation.from_basis(om)
|
Parameters
|
||||||
|
----------
|
||||||
|
R : numpy.ndarray of shape (...,3,3)
|
||||||
|
Rotation matrix: det(R) = 1, R.T∙R=I.
|
||||||
|
|
||||||
|
"""
|
||||||
|
return Rotation.from_basis(R)
|
||||||
|
|
||||||
@staticmethod
|
@staticmethod
|
||||||
def from_Rodrigues(rodrigues,
|
def from_Rodrigues(rho,
|
||||||
normalise = False,
|
normalise = False,
|
||||||
P = -1):
|
P = -1):
|
||||||
|
"""
|
||||||
|
Initialize from Rodrigues-Frank vector.
|
||||||
|
|
||||||
ro = np.array(rodrigues,dtype=float)
|
Parameters
|
||||||
|
----------
|
||||||
|
rho : numpy.ndarray of shape (...,4)
|
||||||
|
Rodrigues-Frank vector (angle separated from axis).
|
||||||
|
(n_1, n_2, n_3, tan(ω/2)), |n| = 1 and ω ∈ [0,π].
|
||||||
|
normalize : boolean, optional
|
||||||
|
Allow |n| ≠ 1. Defaults to False.
|
||||||
|
P : integer ∈ {-1,1}, optional
|
||||||
|
Convention used. Defaults to -1.
|
||||||
|
|
||||||
|
"""
|
||||||
|
ro = np.array(rho,dtype=float)
|
||||||
if ro.shape[:-2:-1] != (4,):
|
if ro.shape[:-2:-1] != (4,):
|
||||||
raise ValueError('Invalid shape.')
|
raise ValueError('Invalid shape.')
|
||||||
|
if abs(P) != 1:
|
||||||
|
raise ValueError('P ∉ {-1,1}')
|
||||||
|
|
||||||
if P > 0: ro[...,0:3] *= -1 # convert from P=1 to P=-1
|
if P == 1: ro[...,0:3] *= -1
|
||||||
if normalise: ro[...,0:3] /= np.linalg.norm(ro[...,0:3],axis=-1)
|
if normalise: ro[...,0:3] /= np.linalg.norm(ro[...,0:3],axis=-1)
|
||||||
if np.any(ro[...,3] < 0.0):
|
if np.any(ro[...,3] < 0.0):
|
||||||
raise ValueError('Rodrigues vector rotation angle not positive.')
|
raise ValueError('Rodrigues vector rotation angle not positive.')
|
||||||
|
@ -379,14 +499,26 @@ class Rotation:
|
||||||
return Rotation(Rotation._ro2qu(ro))
|
return Rotation(Rotation._ro2qu(ro))
|
||||||
|
|
||||||
@staticmethod
|
@staticmethod
|
||||||
def from_homochoric(homochoric,
|
def from_homochoric(h,
|
||||||
P = -1):
|
P = -1):
|
||||||
|
"""
|
||||||
|
Initialize from homochoric vector.
|
||||||
|
|
||||||
ho = np.array(homochoric,dtype=float)
|
Parameters
|
||||||
|
----------
|
||||||
|
h : numpy.ndarray of shape (...,3)
|
||||||
|
Homochoric vector: (h_1, h_2, h_3), |h| < (3/4*π)^(1/3).
|
||||||
|
P : integer ∈ {-1,1}, optional
|
||||||
|
Convention used. Defaults to -1.
|
||||||
|
|
||||||
|
"""
|
||||||
|
ho = np.array(h,dtype=float)
|
||||||
if ho.shape[:-2:-1] != (3,):
|
if ho.shape[:-2:-1] != (3,):
|
||||||
raise ValueError('Invalid shape.')
|
raise ValueError('Invalid shape.')
|
||||||
|
if abs(P) != 1:
|
||||||
|
raise ValueError('P ∉ {-1,1}')
|
||||||
|
|
||||||
if P > 0: ho *= -1 # convert from P=1 to P=-1
|
if P == 1: ho *= -1
|
||||||
|
|
||||||
if np.any(np.linalg.norm(ho,axis=-1) >_R1+1e-9):
|
if np.any(np.linalg.norm(ho,axis=-1) >_R1+1e-9):
|
||||||
raise ValueError('Homochoric coordinate outside of the sphere.')
|
raise ValueError('Homochoric coordinate outside of the sphere.')
|
||||||
|
@ -394,18 +526,30 @@ class Rotation:
|
||||||
return Rotation(Rotation._ho2qu(ho))
|
return Rotation(Rotation._ho2qu(ho))
|
||||||
|
|
||||||
@staticmethod
|
@staticmethod
|
||||||
def from_cubochoric(cubochoric,
|
def from_cubochoric(c,
|
||||||
P = -1):
|
P = -1):
|
||||||
|
"""
|
||||||
|
Initialize from cubochoric vector.
|
||||||
|
|
||||||
cu = np.array(cubochoric,dtype=float)
|
Parameters
|
||||||
|
----------
|
||||||
|
c : numpy.ndarray of shape (...,3)
|
||||||
|
Cubochoric vector: (c_1, c_2, c_3), max(c_i) < 1/2*π^(2/3).
|
||||||
|
P : integer ∈ {-1,1}, optional
|
||||||
|
Convention used. Defaults to -1.
|
||||||
|
|
||||||
|
"""
|
||||||
|
cu = np.array(c,dtype=float)
|
||||||
if cu.shape[:-2:-1] != (3,):
|
if cu.shape[:-2:-1] != (3,):
|
||||||
raise ValueError('Invalid shape.')
|
raise ValueError('Invalid shape.')
|
||||||
|
if abs(P) != 1:
|
||||||
|
raise ValueError('P ∉ {-1,1}')
|
||||||
|
|
||||||
if np.abs(np.max(cu))>np.pi**(2./3.) * 0.5+1e-9:
|
if np.abs(np.max(cu)) > np.pi**(2./3.) * 0.5+1e-9:
|
||||||
raise ValueError('Cubochoric coordinate outside of the cube: {} {} {}.'.format(*cu))
|
raise ValueError('Cubochoric coordinate outside of the cube.')
|
||||||
|
|
||||||
ho = Rotation._cu2ho(cu)
|
ho = Rotation._cu2ho(cu)
|
||||||
if P > 0: ho *= -1 # convert from P=1 to P=-1
|
if P == 1: ho *= -1
|
||||||
|
|
||||||
return Rotation(Rotation._ho2qu(ho))
|
return Rotation(Rotation._ho2qu(ho))
|
||||||
|
|
||||||
|
@ -458,7 +602,7 @@ class Rotation:
|
||||||
np.cos(2.0*np.pi*r[...,1])*B,
|
np.cos(2.0*np.pi*r[...,1])*B,
|
||||||
np.sin(2.0*np.pi*r[...,0])*A],axis=-1)
|
np.sin(2.0*np.pi*r[...,0])*A],axis=-1)
|
||||||
|
|
||||||
return Rotation(q.reshape(r.shape[:-1]+(4,)) if shape is not None else q).standardize()
|
return Rotation(q.reshape(r.shape[:-1]+(4,)) if shape is not None else q)._standardize()
|
||||||
|
|
||||||
|
|
||||||
# for compatibility (old names do not follow convention)
|
# for compatibility (old names do not follow convention)
|
||||||
|
@ -471,7 +615,7 @@ class Rotation:
|
||||||
####################################################################################################
|
####################################################################################################
|
||||||
# Code below available according to the following conditions on https://github.com/MarDiehl/3Drotations
|
# Code below available according to the following conditions on https://github.com/MarDiehl/3Drotations
|
||||||
####################################################################################################
|
####################################################################################################
|
||||||
# Copyright (c) 2017-2019, Martin Diehl/Max-Planck-Institut für Eisenforschung GmbH
|
# Copyright (c) 2017-2020, Martin Diehl/Max-Planck-Institut für Eisenforschung GmbH
|
||||||
# Copyright (c) 2013-2014, Marc De Graef/Carnegie Mellon University
|
# Copyright (c) 2013-2014, Marc De Graef/Carnegie Mellon University
|
||||||
# All rights reserved.
|
# All rights reserved.
|
||||||
#
|
#
|
||||||
|
@ -530,7 +674,7 @@ class Rotation:
|
||||||
np.zeros(qu.shape[:-1]+(2,))]),
|
np.zeros(qu.shape[:-1]+(2,))]),
|
||||||
np.where(np.abs(q03_s) < 1.0e-8,
|
np.where(np.abs(q03_s) < 1.0e-8,
|
||||||
np.block([np.arctan2( 2.0*qu[...,1:2]*qu[...,2:3],qu[...,1:2]**2-qu[...,2:3]**2),
|
np.block([np.arctan2( 2.0*qu[...,1:2]*qu[...,2:3],qu[...,1:2]**2-qu[...,2:3]**2),
|
||||||
np.broadcast_to(np.pi,qu.shape[:-1]+(1,)),
|
np.broadcast_to(np.pi,qu[...,0:1].shape),
|
||||||
np.zeros(qu.shape[:-1]+(1,))]),
|
np.zeros(qu.shape[:-1]+(1,))]),
|
||||||
np.block([np.arctan2((-_P*q02+q13)*chi, (-_P*q01-q23)*chi),
|
np.block([np.arctan2((-_P*q02+q13)*chi, (-_P*q01-q23)*chi),
|
||||||
np.arctan2( 2.0*chi, q03_s-q12_s ),
|
np.arctan2( 2.0*chi, q03_s-q12_s ),
|
||||||
|
@ -553,7 +697,7 @@ class Rotation:
|
||||||
s = np.sign(qu[...,0:1])/np.sqrt(qu[...,1:2]**2+qu[...,2:3]**2+qu[...,3:4]**2)
|
s = np.sign(qu[...,0:1])/np.sqrt(qu[...,1:2]**2+qu[...,2:3]**2+qu[...,3:4]**2)
|
||||||
omega = 2.0 * np.arccos(np.clip(qu[...,0:1],-1.0,1.0))
|
omega = 2.0 * np.arccos(np.clip(qu[...,0:1],-1.0,1.0))
|
||||||
ax = np.where(np.broadcast_to(qu[...,0:1] < 1.0e-8,qu.shape),
|
ax = np.where(np.broadcast_to(qu[...,0:1] < 1.0e-8,qu.shape),
|
||||||
np.block([qu[...,1:4],np.broadcast_to(np.pi,qu.shape[:-1]+(1,))]),
|
np.block([qu[...,1:4],np.broadcast_to(np.pi,qu[...,0:1].shape)]),
|
||||||
np.block([qu[...,1:4]*s,omega]))
|
np.block([qu[...,1:4]*s,omega]))
|
||||||
ax[np.isclose(qu[...,0],1.,rtol=0.0)] = [0.0, 0.0, 1.0, 0.0]
|
ax[np.isclose(qu[...,0],1.,rtol=0.0)] = [0.0, 0.0, 1.0, 0.0]
|
||||||
return ax
|
return ax
|
||||||
|
@ -564,7 +708,7 @@ class Rotation:
|
||||||
with np.errstate(invalid='ignore',divide='ignore'):
|
with np.errstate(invalid='ignore',divide='ignore'):
|
||||||
s = np.linalg.norm(qu[...,1:4],axis=-1,keepdims=True)
|
s = np.linalg.norm(qu[...,1:4],axis=-1,keepdims=True)
|
||||||
ro = np.where(np.broadcast_to(np.abs(qu[...,0:1]) < 1.0e-12,qu.shape),
|
ro = np.where(np.broadcast_to(np.abs(qu[...,0:1]) < 1.0e-12,qu.shape),
|
||||||
np.block([qu[...,1:2], qu[...,2:3], qu[...,3:4], np.broadcast_to(np.inf,qu.shape[:-1]+(1,))]),
|
np.block([qu[...,1:2], qu[...,2:3], qu[...,3:4], np.broadcast_to(np.inf,qu[...,0:1].shape)]),
|
||||||
np.block([qu[...,1:2]/s,qu[...,2:3]/s,qu[...,3:4]/s,
|
np.block([qu[...,1:2]/s,qu[...,2:3]/s,qu[...,3:4]/s,
|
||||||
np.tan(np.arccos(np.clip(qu[...,0:1],-1.0,1.0)))
|
np.tan(np.arccos(np.clip(qu[...,0:1],-1.0,1.0)))
|
||||||
])
|
])
|
||||||
|
|
|
@ -93,7 +93,7 @@ def strikeout(what):
|
||||||
|
|
||||||
|
|
||||||
def execute(cmd,
|
def execute(cmd,
|
||||||
streamIn = None,
|
stream_in = None,
|
||||||
wd = './',
|
wd = './',
|
||||||
env = None):
|
env = None):
|
||||||
"""
|
"""
|
||||||
|
@ -103,7 +103,7 @@ def execute(cmd,
|
||||||
----------
|
----------
|
||||||
cmd : str
|
cmd : str
|
||||||
Command to be executed.
|
Command to be executed.
|
||||||
streanIn :, optional
|
stream_in : file object, optional
|
||||||
Input (via pipe) for executed process.
|
Input (via pipe) for executed process.
|
||||||
wd : str, optional
|
wd : str, optional
|
||||||
Working directory of process. Defaults to ./ .
|
Working directory of process. Defaults to ./ .
|
||||||
|
@ -119,14 +119,14 @@ def execute(cmd,
|
||||||
stderr = subprocess.PIPE,
|
stderr = subprocess.PIPE,
|
||||||
stdin = subprocess.PIPE,
|
stdin = subprocess.PIPE,
|
||||||
env = myEnv)
|
env = myEnv)
|
||||||
out,error = [i for i in (process.communicate() if streamIn is None
|
stdout, stderr = [i for i in (process.communicate() if stream_in is None
|
||||||
else process.communicate(streamIn.read().encode('utf-8')))]
|
else process.communicate(stream_in.read().encode('utf-8')))]
|
||||||
os.chdir(initialPath)
|
os.chdir(initialPath)
|
||||||
out = out.decode('utf-8').replace('\x08','')
|
stdout = stdout.decode('utf-8').replace('\x08','')
|
||||||
error = error.decode('utf-8').replace('\x08','')
|
stderr = stderr.decode('utf-8').replace('\x08','')
|
||||||
if process.returncode != 0:
|
if process.returncode != 0:
|
||||||
raise RuntimeError('{} failed with returncode {}'.format(cmd,process.returncode))
|
raise RuntimeError('{} failed with returncode {}'.format(cmd,process.returncode))
|
||||||
return out,error
|
return stdout, stderr
|
||||||
|
|
||||||
|
|
||||||
def show_progress(iterable,N_iter=None,prefix='',bar_length=50):
|
def show_progress(iterable,N_iter=None,prefix='',bar_length=50):
|
||||||
|
|
|
@ -302,8 +302,8 @@ class TestResult:
|
||||||
|
|
||||||
@pytest.mark.parametrize('allowed',['off','on'])
|
@pytest.mark.parametrize('allowed',['off','on'])
|
||||||
def test_rename(self,default,allowed):
|
def test_rename(self,default,allowed):
|
||||||
F = default.read_dataset(default.get_dataset_location('F'))
|
|
||||||
if allowed == 'on':
|
if allowed == 'on':
|
||||||
|
F = default.read_dataset(default.get_dataset_location('F'))
|
||||||
default.allow_modification()
|
default.allow_modification()
|
||||||
default.rename('F','new_name')
|
default.rename('F','new_name')
|
||||||
assert np.all(F == default.read_dataset(default.get_dataset_location('new_name')))
|
assert np.all(F == default.read_dataset(default.get_dataset_location('new_name')))
|
||||||
|
|
|
@ -14,7 +14,7 @@ scatter=1.e-2
|
||||||
|
|
||||||
@pytest.fixture
|
@pytest.fixture
|
||||||
def default():
|
def default():
|
||||||
"""A set of n random rotations."""
|
"""A set of n rotations (corner cases and random)."""
|
||||||
specials = np.array([
|
specials = np.array([
|
||||||
[1.0, 0.0, 0.0, 0.0],
|
[1.0, 0.0, 0.0, 0.0],
|
||||||
#----------------------
|
#----------------------
|
||||||
|
@ -534,7 +534,7 @@ def mul(me, other):
|
||||||
other_p = other.quaternion[1:]
|
other_p = other.quaternion[1:]
|
||||||
R = me.__class__(np.append(me_q*other_q - np.dot(me_p,other_p),
|
R = me.__class__(np.append(me_q*other_q - np.dot(me_p,other_p),
|
||||||
me_q*other_p + other_q*me_p + _P * np.cross(me_p,other_p)))
|
me_q*other_p + other_q*me_p + _P * np.cross(me_p,other_p)))
|
||||||
return R.standardize()
|
return R._standardize()
|
||||||
elif isinstance(other, np.ndarray):
|
elif isinstance(other, np.ndarray):
|
||||||
if other.shape == (3,):
|
if other.shape == (3,):
|
||||||
A = me.quaternion[0]**2.0 - np.dot(me.quaternion[1:],me.quaternion[1:])
|
A = me.quaternion[0]**2.0 - np.dot(me.quaternion[1:],me.quaternion[1:])
|
||||||
|
@ -554,7 +554,7 @@ def mul(me, other):
|
||||||
axes = ((0, 2, 4, 6), (0, 1, 2, 3))
|
axes = ((0, 2, 4, 6), (0, 1, 2, 3))
|
||||||
return np.tensordot(RRRR, other, axes)
|
return np.tensordot(RRRR, other, axes)
|
||||||
else:
|
else:
|
||||||
raise ValueError('Can only rotate vectors, 2nd order ternsors, and 4th order tensors')
|
raise ValueError('Can only rotate vectors, 2nd order tensors, and 4th order tensors')
|
||||||
else:
|
else:
|
||||||
raise TypeError('Cannot rotate {}'.format(type(other)))
|
raise TypeError('Cannot rotate {}'.format(type(other)))
|
||||||
|
|
||||||
|
@ -854,6 +854,10 @@ class TestRotation:
|
||||||
rot = Rotation.from_basis(om,False,reciprocal=reciprocal)
|
rot = Rotation.from_basis(om,False,reciprocal=reciprocal)
|
||||||
assert np.isclose(np.linalg.det(rot.as_matrix()),1.0)
|
assert np.isclose(np.linalg.det(rot.as_matrix()),1.0)
|
||||||
|
|
||||||
|
@pytest.mark.parametrize('shape',[None,1,(4,4)])
|
||||||
|
def test_random(self,shape):
|
||||||
|
Rotation.from_random(shape)
|
||||||
|
|
||||||
@pytest.mark.parametrize('function',[Rotation.from_quaternion,
|
@pytest.mark.parametrize('function',[Rotation.from_quaternion,
|
||||||
Rotation.from_Eulers,
|
Rotation.from_Eulers,
|
||||||
Rotation.from_axis_angle,
|
Rotation.from_axis_angle,
|
||||||
|
@ -866,6 +870,16 @@ class TestRotation:
|
||||||
with pytest.raises(ValueError):
|
with pytest.raises(ValueError):
|
||||||
function(invalid_shape)
|
function(invalid_shape)
|
||||||
|
|
||||||
|
@pytest.mark.parametrize('fr,to',[(Rotation.from_quaternion,'as_quaternion'),
|
||||||
|
(Rotation.from_axis_angle,'as_axis_angle'),
|
||||||
|
(Rotation.from_Rodrigues, 'as_Rodrigues'),
|
||||||
|
(Rotation.from_homochoric,'as_homochoric'),
|
||||||
|
(Rotation.from_cubochoric,'as_cubochoric')])
|
||||||
|
def test_invalid_P(self,fr,to):
|
||||||
|
R = Rotation.from_random(np.random.randint(8,32,(3))) # noqa
|
||||||
|
with pytest.raises(ValueError):
|
||||||
|
fr(eval('R.{}()'.format(to)),P=-30)
|
||||||
|
|
||||||
@pytest.mark.parametrize('shape',[None,(3,),(4,2)])
|
@pytest.mark.parametrize('shape',[None,(3,),(4,2)])
|
||||||
def test_broadcast(self,shape):
|
def test_broadcast(self,shape):
|
||||||
rot = Rotation.from_random(shape)
|
rot = Rotation.from_random(shape)
|
||||||
|
@ -932,14 +946,18 @@ class TestRotation:
|
||||||
phi_2 = 2*np.pi - phi_1
|
phi_2 = 2*np.pi - phi_1
|
||||||
R_1 = Rotation.from_Eulers(np.array([phi_1,0.,0.]))
|
R_1 = Rotation.from_Eulers(np.array([phi_1,0.,0.]))
|
||||||
R_2 = Rotation.from_Eulers(np.array([0.,0.,phi_2]))
|
R_2 = Rotation.from_Eulers(np.array([0.,0.,phi_2]))
|
||||||
assert np.allclose(data,R_2*(R_1*data))
|
assert np.allclose(data,R_2@(R_1@data))
|
||||||
|
|
||||||
|
def test_rotate_inverse(self):
|
||||||
|
R = Rotation.from_random()
|
||||||
|
assert np.allclose(np.eye(3),(~R@R).as_matrix())
|
||||||
|
|
||||||
@pytest.mark.parametrize('data',[np.random.rand(3),
|
@pytest.mark.parametrize('data',[np.random.rand(3),
|
||||||
np.random.rand(3,3),
|
np.random.rand(3,3),
|
||||||
np.random.rand(3,3,3,3)])
|
np.random.rand(3,3,3,3)])
|
||||||
def test_rotate_inverse(self,data):
|
def test_rotate_inverse_array(self,data):
|
||||||
R = Rotation.from_random()
|
R = Rotation.from_random()
|
||||||
assert np.allclose(data,R.inversed()*(R*data))
|
assert np.allclose(data,~R@(R@data))
|
||||||
|
|
||||||
@pytest.mark.parametrize('data',[np.random.rand(4),
|
@pytest.mark.parametrize('data',[np.random.rand(4),
|
||||||
np.random.rand(3,2),
|
np.random.rand(3,2),
|
||||||
|
@ -956,3 +974,7 @@ class TestRotation:
|
||||||
R = Rotation.from_random()
|
R = Rotation.from_random()
|
||||||
with pytest.raises(TypeError):
|
with pytest.raises(TypeError):
|
||||||
R*data
|
R*data
|
||||||
|
|
||||||
|
def test_misorientation(self):
|
||||||
|
R = Rotation.from_random()
|
||||||
|
assert np.allclose(R.misorientation(R).as_matrix(),np.eye(3))
|
||||||
|
|
|
@ -0,0 +1,11 @@
|
||||||
|
from damask import util
|
||||||
|
|
||||||
|
class TestUtil:
|
||||||
|
|
||||||
|
def test_execute_direct(self):
|
||||||
|
out,err = util.execute('echo test')
|
||||||
|
assert out=='test\n' and err==''
|
||||||
|
|
||||||
|
def test_execute_env(self):
|
||||||
|
out,err = util.execute('sh -c "echo $test_for_execute"',env={'test_for_execute':'test'})
|
||||||
|
assert out=='test\n' and err==''
|
|
@ -830,7 +830,7 @@ module subroutine plastic_dislotwin_results(instance,group)
|
||||||
'mobile dislocation density','1/m²')
|
'mobile dislocation density','1/m²')
|
||||||
case('rho_dip')
|
case('rho_dip')
|
||||||
if(prm%sum_N_sl>0) call results_writeDataset(group,stt%rho_dip,'rho_dip',&
|
if(prm%sum_N_sl>0) call results_writeDataset(group,stt%rho_dip,'rho_dip',&
|
||||||
'dislocation dipole density''1/m²')
|
'dislocation dipole density','1/m²')
|
||||||
case('gamma_sl')
|
case('gamma_sl')
|
||||||
if(prm%sum_N_sl>0) call results_writeDataset(group,stt%gamma_sl,'gamma_sl',&
|
if(prm%sum_N_sl>0) call results_writeDataset(group,stt%gamma_sl,'gamma_sl',&
|
||||||
'plastic shear','1')
|
'plastic shear','1')
|
||||||
|
|
|
@ -284,11 +284,9 @@ end subroutine crystallite_init
|
||||||
!--------------------------------------------------------------------------------------------------
|
!--------------------------------------------------------------------------------------------------
|
||||||
!> @brief calculate stress (P)
|
!> @brief calculate stress (P)
|
||||||
!--------------------------------------------------------------------------------------------------
|
!--------------------------------------------------------------------------------------------------
|
||||||
function crystallite_stress(dummyArgumentToPreventInternalCompilerErrorWithGCC)
|
function crystallite_stress()
|
||||||
|
|
||||||
logical, dimension(discretization_nIP,discretization_nElem) :: crystallite_stress
|
logical, dimension(discretization_nIP,discretization_nElem) :: crystallite_stress
|
||||||
real(pReal), intent(in), optional :: &
|
|
||||||
dummyArgumentToPreventInternalCompilerErrorWithGCC
|
|
||||||
real(pReal) :: &
|
real(pReal) :: &
|
||||||
formerSubStep
|
formerSubStep
|
||||||
integer :: &
|
integer :: &
|
||||||
|
|
|
@ -49,7 +49,7 @@ subroutine discretization_init(homogenizationAt,microstructureAt,&
|
||||||
IPcoords0, &
|
IPcoords0, &
|
||||||
NodeCoords0
|
NodeCoords0
|
||||||
integer, optional, intent(in) :: &
|
integer, optional, intent(in) :: &
|
||||||
sharedNodesBegin
|
sharedNodesBegin !< index of first node shared among different processes (MPI)
|
||||||
|
|
||||||
write(6,'(/,a)') ' <<<+- discretization init -+>>>'; flush(6)
|
write(6,'(/,a)') ' <<<+- discretization init -+>>>'; flush(6)
|
||||||
|
|
||||||
|
|
|
@ -36,9 +36,6 @@ module discretization_mesh
|
||||||
mesh_maxNips !< max number of IPs in any CP element
|
mesh_maxNips !< max number of IPs in any CP element
|
||||||
!!!! BEGIN DEPRECATED !!!!!
|
!!!! BEGIN DEPRECATED !!!!!
|
||||||
|
|
||||||
integer, dimension(:,:), allocatable :: &
|
|
||||||
mesh_element !DEPRECATED
|
|
||||||
|
|
||||||
real(pReal), dimension(:,:), allocatable :: &
|
real(pReal), dimension(:,:), allocatable :: &
|
||||||
mesh_ipVolume, & !< volume associated with IP (initially!)
|
mesh_ipVolume, & !< volume associated with IP (initially!)
|
||||||
mesh_node0 !< node x,y,z coordinates (initially!)
|
mesh_node0 !< node x,y,z coordinates (initially!)
|
||||||
|
@ -67,15 +64,10 @@ subroutine discretization_mesh_init(restart)
|
||||||
|
|
||||||
logical, intent(in) :: restart
|
logical, intent(in) :: restart
|
||||||
|
|
||||||
integer, dimension(1), parameter:: FE_geomtype = [1] !< geometry type of particular element type
|
|
||||||
integer, dimension(1) :: FE_Nips !< number of IPs in a specific type of element
|
|
||||||
|
|
||||||
integer, allocatable, dimension(:) :: chunkPos
|
integer, allocatable, dimension(:) :: chunkPos
|
||||||
integer :: dimPlex, &
|
integer :: dimPlex, &
|
||||||
mesh_Nnodes, & !< total number of nodes in mesh
|
mesh_Nnodes, & !< total number of nodes in mesh
|
||||||
j, l
|
j, l
|
||||||
integer, parameter :: &
|
|
||||||
mesh_ElemType=1 !< Element type of the mesh (only support homogeneous meshes)
|
|
||||||
PetscSF :: sf
|
PetscSF :: sf
|
||||||
DM :: globalMesh
|
DM :: globalMesh
|
||||||
PetscInt :: nFaceSets
|
PetscInt :: nFaceSets
|
||||||
|
@ -83,23 +75,22 @@ subroutine discretization_mesh_init(restart)
|
||||||
character(len=pStringLen), dimension(:), allocatable :: fileContent
|
character(len=pStringLen), dimension(:), allocatable :: fileContent
|
||||||
IS :: faceSetIS
|
IS :: faceSetIS
|
||||||
PetscErrorCode :: ierr
|
PetscErrorCode :: ierr
|
||||||
|
integer, dimension(:), allocatable :: &
|
||||||
|
homogenizationAt, &
|
||||||
|
microstructureAt
|
||||||
|
|
||||||
|
|
||||||
write(6,'(/,a)') ' <<<+- mesh init -+>>>'
|
write(6,'(/,a)') ' <<<+- mesh init -+>>>'
|
||||||
|
|
||||||
! read in file
|
|
||||||
call DMPlexCreateFromFile(PETSC_COMM_WORLD,geometryFile,PETSC_TRUE,globalMesh,ierr)
|
call DMPlexCreateFromFile(PETSC_COMM_WORLD,geometryFile,PETSC_TRUE,globalMesh,ierr)
|
||||||
CHKERRQ(ierr)
|
CHKERRQ(ierr)
|
||||||
! get spatial dimension (2 or 3?)
|
|
||||||
call DMGetDimension(globalMesh,dimPlex,ierr)
|
call DMGetDimension(globalMesh,dimPlex,ierr)
|
||||||
CHKERRQ(ierr)
|
CHKERRQ(ierr)
|
||||||
write(6,*) 'dimension',dimPlex;flush(6)
|
|
||||||
call DMGetStratumSize(globalMesh,'depth',dimPlex,mesh_NcpElemsGlobal,ierr)
|
call DMGetStratumSize(globalMesh,'depth',dimPlex,mesh_NcpElemsGlobal,ierr)
|
||||||
CHKERRQ(ierr)
|
CHKERRQ(ierr)
|
||||||
! get number of IDs in face sets (for boundary conditions?)
|
! get number of IDs in face sets (for boundary conditions?)
|
||||||
call DMGetLabelSize(globalMesh,'Face Sets',mesh_Nboundaries,ierr)
|
call DMGetLabelSize(globalMesh,'Face Sets',mesh_Nboundaries,ierr)
|
||||||
CHKERRQ(ierr)
|
CHKERRQ(ierr)
|
||||||
write(6,*) 'number of "Face Sets"',mesh_Nboundaries;flush(6)
|
|
||||||
call MPI_Bcast(mesh_Nboundaries,1,MPI_INTEGER,0,PETSC_COMM_WORLD,ierr)
|
call MPI_Bcast(mesh_Nboundaries,1,MPI_INTEGER,0,PETSC_COMM_WORLD,ierr)
|
||||||
call MPI_Bcast(mesh_NcpElemsGlobal,1,MPI_INTEGER,0,PETSC_COMM_WORLD,ierr)
|
call MPI_Bcast(mesh_NcpElemsGlobal,1,MPI_INTEGER,0,PETSC_COMM_WORLD,ierr)
|
||||||
call MPI_Bcast(dimPlex,1,MPI_INTEGER,0,PETSC_COMM_WORLD,ierr)
|
call MPI_Bcast(dimPlex,1,MPI_INTEGER,0,PETSC_COMM_WORLD,ierr)
|
||||||
|
@ -154,33 +145,27 @@ subroutine discretization_mesh_init(restart)
|
||||||
call DMGetStratumSize(geomMesh,'depth',0,mesh_Nnodes,ierr)
|
call DMGetStratumSize(geomMesh,'depth',0,mesh_Nnodes,ierr)
|
||||||
CHKERRQ(ierr)
|
CHKERRQ(ierr)
|
||||||
|
|
||||||
FE_Nips(FE_geomtype(1)) = FEM_nQuadrature(dimPlex,integrationOrder)
|
mesh_maxNips = FEM_nQuadrature(dimPlex,integrationOrder)
|
||||||
mesh_maxNips = FE_Nips(1)
|
|
||||||
|
|
||||||
write(6,*) 'mesh_maxNips',mesh_maxNips
|
|
||||||
call mesh_FEM_build_ipCoordinates(dimPlex,FEM_quadrature_points(dimPlex,integrationOrder)%p)
|
call mesh_FEM_build_ipCoordinates(dimPlex,FEM_quadrature_points(dimPlex,integrationOrder)%p)
|
||||||
call mesh_FEM_build_ipVolumes(dimPlex)
|
call mesh_FEM_build_ipVolumes(dimPlex)
|
||||||
|
|
||||||
allocate (mesh_element (4,mesh_NcpElems)); mesh_element = 0
|
allocate(microstructureAt(mesh_NcpElems))
|
||||||
|
allocate(homogenizationAt(mesh_NcpElems),source=1)
|
||||||
do j = 1, mesh_NcpElems
|
do j = 1, mesh_NcpElems
|
||||||
mesh_element( 1,j) = -1 ! DEPRECATED
|
call DMGetLabelValue(geomMesh,'material',j-1,microstructureAt(j),ierr)
|
||||||
mesh_element( 2,j) = mesh_elemType ! elem type
|
|
||||||
mesh_element( 3,j) = 1 ! homogenization
|
|
||||||
call DMGetLabelValue(geomMesh,'material',j-1,mesh_element(4,j),ierr)
|
|
||||||
CHKERRQ(ierr)
|
CHKERRQ(ierr)
|
||||||
end do
|
end do
|
||||||
|
|
||||||
if (debug_e < 1 .or. debug_e > mesh_NcpElems) &
|
if (debug_e < 1 .or. debug_e > mesh_NcpElems) call IO_error(602,ext_msg='element')
|
||||||
call IO_error(602,ext_msg='element') ! selected element does not exist
|
if (debug_i < 1 .or. debug_i > mesh_maxNips) call IO_error(602,ext_msg='IP')
|
||||||
if (debug_i < 1 .or. debug_i > FE_Nips(FE_geomtype(mesh_element(2,debug_e)))) &
|
|
||||||
call IO_error(602,ext_msg='IP') ! selected element does not have requested IP
|
|
||||||
|
|
||||||
FEsolving_execElem = [ 1,mesh_NcpElems ] ! parallel loop bounds set to comprise all DAMASK elements
|
FEsolving_execElem = [1,mesh_NcpElems] ! parallel loop bounds set to comprise all DAMASK elements
|
||||||
FEsolving_execIP = [1,FE_Nips(FE_geomtype(mesh_element(2,1)))]
|
FEsolving_execIP = [1,mesh_maxNips]
|
||||||
|
|
||||||
allocate(mesh_node0(3,mesh_Nnodes),source=0.0_pReal)
|
allocate(mesh_node0(3,mesh_Nnodes),source=0.0_pReal)
|
||||||
|
|
||||||
call discretization_init(mesh_element(3,:),mesh_element(4,:),&
|
call discretization_init(microstructureAt,homogenizationAt,&
|
||||||
reshape(mesh_ipCoordinates,[3,mesh_maxNips*mesh_NcpElems]), &
|
reshape(mesh_ipCoordinates,[3,mesh_maxNips*mesh_NcpElems]), &
|
||||||
mesh_node0)
|
mesh_node0)
|
||||||
|
|
||||||
|
|
|
@ -101,6 +101,8 @@ module quaternions
|
||||||
assignment(=), &
|
assignment(=), &
|
||||||
conjg, aimag, &
|
conjg, aimag, &
|
||||||
log, exp, &
|
log, exp, &
|
||||||
|
abs, dot_product, &
|
||||||
|
inverse, &
|
||||||
real
|
real
|
||||||
|
|
||||||
contains
|
contains
|
||||||
|
|
Loading…
Reference in New Issue