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| import os | |
| import logging | |
| import random | |
| import h5py | |
| import numpy as np | |
| import pickle | |
| import math | |
| import numbers | |
| import torch | |
| import torch.nn as nn | |
| import torch.nn.functional as F | |
| from torch.optim.lr_scheduler import StepLR | |
| from torch.distributions import Normal | |
| def _index_from_letter(letter: str) -> int: | |
| if letter == "X": | |
| return 0 | |
| if letter == "Y": | |
| return 1 | |
| if letter == "Z": | |
| return 2 | |
| raise ValueError("letter must be either X, Y or Z.") | |
| def _angle_from_tan( | |
| axis: str, other_axis: str, data, horizontal: bool, tait_bryan: bool | |
| ) -> torch.Tensor: | |
| """ | |
| Extract the first or third Euler angle from the two members of | |
| the matrix which are positive constant times its sine and cosine. | |
| Args: | |
| axis: Axis label "X" or "Y or "Z" for the angle we are finding. | |
| other_axis: Axis label "X" or "Y or "Z" for the middle axis in the | |
| convention. | |
| data: Rotation matrices as tensor of shape (..., 3, 3). | |
| horizontal: Whether we are looking for the angle for the third axis, | |
| which means the relevant entries are in the same row of the | |
| rotation matrix. If not, they are in the same column. | |
| tait_bryan: Whether the first and third axes in the convention differ. | |
| Returns: | |
| Euler Angles in radians for each matrix in data as a tensor | |
| of shape (...). | |
| """ | |
| i1, i2 = {"X": (2, 1), "Y": (0, 2), "Z": (1, 0)}[axis] | |
| if horizontal: | |
| i2, i1 = i1, i2 | |
| even = (axis + other_axis) in ["XY", "YZ", "ZX"] | |
| if horizontal == even: | |
| return torch.atan2(data[..., i1], data[..., i2]) | |
| if tait_bryan: | |
| return torch.atan2(-data[..., i2], data[..., i1]) | |
| return torch.atan2(data[..., i2], -data[..., i1]) | |
| def _axis_angle_rotation(axis: str, angle: torch.Tensor) -> torch.Tensor: | |
| """ | |
| Return the rotation matrices for one of the rotations about an axis | |
| of which Euler angles describe, for each value of the angle given. | |
| Args: | |
| axis: Axis label "X" or "Y or "Z". | |
| angle: any shape tensor of Euler angles in radians | |
| Returns: | |
| Rotation matrices as tensor of shape (..., 3, 3). | |
| """ | |
| cos = torch.cos(angle) | |
| sin = torch.sin(angle) | |
| one = torch.ones_like(angle) | |
| zero = torch.zeros_like(angle) | |
| if axis == "X": | |
| R_flat = (one, zero, zero, zero, cos, -sin, zero, sin, cos) | |
| elif axis == "Y": | |
| R_flat = (cos, zero, sin, zero, one, zero, -sin, zero, cos) | |
| elif axis == "Z": | |
| R_flat = (cos, -sin, zero, sin, cos, zero, zero, zero, one) | |
| else: | |
| raise ValueError("letter must be either X, Y or Z.") | |
| return torch.stack(R_flat, -1).reshape(angle.shape + (3, 3)) | |
| def euler_angles_to_matrix(euler_angles: torch.Tensor, convention: str) -> torch.Tensor: | |
| """ | |
| Convert rotations given as Euler angles in radians to rotation matrices. | |
| Args: | |
| euler_angles: Euler angles in radians as tensor of shape (..., 3). | |
| convention: Convention string of three uppercase letters from | |
| {"X", "Y", and "Z"}. | |
| Returns: | |
| Rotation matrices as tensor of shape (..., 3, 3). | |
| """ | |
| if euler_angles.dim() == 0 or euler_angles.shape[-1] != 3: | |
| raise ValueError("Invalid input euler angles.") | |
| if len(convention) != 3: | |
| raise ValueError("Convention must have 3 letters.") | |
| if convention[1] in (convention[0], convention[2]): | |
| raise ValueError(f"Invalid convention {convention}.") | |
| for letter in convention: | |
| if letter not in ("X", "Y", "Z"): | |
| raise ValueError(f"Invalid letter {letter} in convention string.") | |
| matrices = [ | |
| _axis_angle_rotation(c, e) | |
| for c, e in zip(convention, torch.unbind(euler_angles, -1)) | |
| ] | |
| # return functools.reduce(torch.matmul, matrices) | |
| return torch.matmul(torch.matmul(matrices[0], matrices[1]), matrices[2]) | |
| def matrix_to_rotation_6d(matrix: torch.Tensor) -> torch.Tensor: | |
| """ | |
| Converts rotation matrices to 6D rotation representation by Zhou et al. [1] | |
| by dropping the last row. Note that 6D representation is not unique. | |
| Args: | |
| matrix: batch of rotation matrices of size (*, 3, 3) | |
| Returns: | |
| 6D rotation representation, of size (*, 6) | |
| [1] Zhou, Y., Barnes, C., Lu, J., Yang, J., & Li, H. | |
| On the Continuity of Rotation Representations in Neural Networks. | |
| IEEE Conference on Computer Vision and Pattern Recognition, 2019. | |
| Retrieved from http://arxiv.org/abs/1812.07035 | |
| """ | |
| return matrix[..., :2, :].clone().reshape(*matrix.size()[:-2], 6) | |
| def rotation_6d_to_matrix(d6: torch.Tensor) -> torch.Tensor: | |
| """ | |
| Args: | |
| d6: 6D rotation representation, of size (*, 6) | |
| Returns: | |
| batch of rotation matrices of size (*, 3, 3) | |
| """ | |
| a1, a2 = d6[..., :3], d6[..., 3:] | |
| b1 = F.normalize(a1, dim=-1) | |
| b2 = a2 - (b1 * a2).sum(-1, keepdim=True) * b1 | |
| b2 = F.normalize(b2, dim=-1) | |
| b3 = torch.cross(b1, b2, dim=-1) | |
| return torch.stack((b1, b2, b3), dim=-2) | |
| def matrix_to_euler_angles(matrix: torch.Tensor, convention: str) -> torch.Tensor: | |
| """ | |
| Convert rotations given as rotation matrices to Euler angles in radians. | |
| Args: | |
| matrix: Rotation matrices as tensor of shape (..., 3, 3). | |
| convention: Convention string of three uppercase letters. | |
| Returns: | |
| Euler angles in radians as tensor of shape (..., 3). | |
| """ | |
| if len(convention) != 3: | |
| raise ValueError("Convention must have 3 letters.") | |
| if convention[1] in (convention[0], convention[2]): | |
| raise ValueError(f"Invalid convention {convention}.") | |
| for letter in convention: | |
| if letter not in ("X", "Y", "Z"): | |
| raise ValueError(f"Invalid letter {letter} in convention string.") | |
| if matrix.size(-1) != 3 or matrix.size(-2) != 3: | |
| raise ValueError(f"Invalid rotation matrix shape {matrix.shape}.") | |
| i0 = _index_from_letter(convention[0]) | |
| i2 = _index_from_letter(convention[2]) | |
| tait_bryan = i0 != i2 | |
| if tait_bryan: | |
| central_angle = torch.asin( | |
| matrix[..., i0, i2] * (-1.0 if i0 - i2 in [-1, 2] else 1.0) | |
| ) | |
| else: | |
| central_angle = torch.acos(matrix[..., i0, i0]) | |
| o = ( | |
| _angle_from_tan( | |
| convention[0], convention[1], matrix[..., i2], False, tait_bryan | |
| ), | |
| central_angle, | |
| _angle_from_tan( | |
| convention[2], convention[1], matrix[..., i0, :], True, tait_bryan | |
| ), | |
| ) | |
| return torch.stack(o, -1) | |
| def so3_relative_angle(m1, m2): | |
| m1 = m1.reshape(-1, 3, 3) | |
| m2 = m2.reshape(-1, 3, 3) | |
| #print(m2.shape) | |
| m = torch.bmm(m1, m2.transpose(1, 2)) # batch*3*3 | |
| #print(m.shape) | |
| cos = (m[:, 0, 0] + m[:, 1, 1] + m[:, 2, 2] - 1) / 2 | |
| #print(cos.shape) | |
| cos = torch.clamp(cos, min=-1 + 1E-6, max=1-1E-6) | |
| #print(cos.shape) | |
| theta = torch.acos(cos) | |
| #print(theta.shape) | |
| return torch.mean(theta) | |