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| import torch | |
| import numpy as np | |
| from torch.nn import functional as F | |
| """ | |
| Useful geometric operations, e.g. Perspective projection and a differentiable Rodrigues formula | |
| Parts of the code are taken from https://github.com/MandyMo/pytorch_HMR | |
| """ | |
| def batch_rodrigues(theta): | |
| """Convert axis-angle representation to rotation matrix. | |
| Args: | |
| theta: size = [B, 3] | |
| Returns: | |
| Rotation matrix corresponding to the quaternion -- size = [B, 3, 3] | |
| """ | |
| l1norm = torch.norm(theta + 1e-8, p=2, dim=1) | |
| angle = torch.unsqueeze(l1norm, -1) | |
| normalized = torch.div(theta, angle) | |
| angle = angle * 0.5 | |
| v_cos = torch.cos(angle) | |
| v_sin = torch.sin(angle) | |
| quat = torch.cat([v_cos, v_sin * normalized], dim=1) | |
| return quat_to_rotmat(quat) | |
| def quat_to_rotmat(quat): | |
| """Convert quaternion coefficients to rotation matrix. | |
| Args: | |
| quat: size = [B, 4] 4 <===>(w, x, y, z) | |
| Returns: | |
| Rotation matrix corresponding to the quaternion -- size = [B, 3, 3] | |
| """ | |
| norm_quat = quat | |
| norm_quat = norm_quat / norm_quat.norm(p=2, dim=1, keepdim=True) | |
| w, x, y, z = norm_quat[:, 0], norm_quat[:, 1], norm_quat[:, | |
| 2], norm_quat[:, | |
| 3] | |
| B = quat.size(0) | |
| w2, x2, y2, z2 = w.pow(2), x.pow(2), y.pow(2), z.pow(2) | |
| wx, wy, wz = w * x, w * y, w * z | |
| xy, xz, yz = x * y, x * z, y * z | |
| rotMat = torch.stack([ | |
| w2 + x2 - y2 - z2, 2 * xy - 2 * wz, 2 * wy + 2 * xz, 2 * wz + 2 * xy, | |
| w2 - x2 + y2 - z2, 2 * yz - 2 * wx, 2 * xz - 2 * wy, 2 * wx + 2 * yz, | |
| w2 - x2 - y2 + z2 | |
| ], | |
| dim=1).view(B, 3, 3) | |
| return rotMat | |
| def rotation_matrix_to_angle_axis(rotation_matrix): | |
| """ | |
| This function is borrowed from https://github.com/kornia/kornia | |
| Convert 3x4 rotation matrix to Rodrigues vector | |
| Args: | |
| rotation_matrix (Tensor): rotation matrix. | |
| Returns: | |
| Tensor: Rodrigues vector transformation. | |
| Shape: | |
| - Input: :math:`(N, 3, 4)` | |
| - Output: :math:`(N, 3)` | |
| Example: | |
| >>> input = torch.rand(2, 3, 4) # Nx4x4 | |
| >>> output = tgm.rotation_matrix_to_angle_axis(input) # Nx3 | |
| """ | |
| if rotation_matrix.shape[1:] == (3, 3): | |
| rot_mat = rotation_matrix.reshape(-1, 3, 3) | |
| hom = torch.tensor([0, 0, 1], | |
| dtype=torch.float32, | |
| device=rotation_matrix.device).reshape( | |
| 1, 3, 1).expand(rot_mat.shape[0], -1, -1) | |
| rotation_matrix = torch.cat([rot_mat, hom], dim=-1) | |
| quaternion = rotation_matrix_to_quaternion(rotation_matrix) | |
| aa = quaternion_to_angle_axis(quaternion) | |
| aa[torch.isnan(aa)] = 0.0 | |
| return aa | |
| def quaternion_to_angle_axis(quaternion: torch.Tensor) -> torch.Tensor: | |
| """ | |
| This function is borrowed from https://github.com/kornia/kornia | |
| Convert quaternion vector to angle axis of rotation. | |
| Adapted from ceres C++ library: ceres-solver/include/ceres/rotation.h | |
| Args: | |
| quaternion (torch.Tensor): tensor with quaternions. | |
| Return: | |
| torch.Tensor: tensor with angle axis of rotation. | |
| Shape: | |
| - Input: :math:`(*, 4)` where `*` means, any number of dimensions | |
| - Output: :math:`(*, 3)` | |
| Example: | |
| >>> quaternion = torch.rand(2, 4) # Nx4 | |
| >>> angle_axis = tgm.quaternion_to_angle_axis(quaternion) # Nx3 | |
| """ | |
| if not torch.is_tensor(quaternion): | |
| raise TypeError("Input type is not a torch.Tensor. Got {}".format( | |
| type(quaternion))) | |
| if not quaternion.shape[-1] == 4: | |
| raise ValueError( | |
| "Input must be a tensor of shape Nx4 or 4. Got {}".format( | |
| quaternion.shape)) | |
| # unpack input and compute conversion | |
| q1: torch.Tensor = quaternion[..., 1] | |
| q2: torch.Tensor = quaternion[..., 2] | |
| q3: torch.Tensor = quaternion[..., 3] | |
| sin_squared_theta: torch.Tensor = q1 * q1 + q2 * q2 + q3 * q3 | |
| sin_theta: torch.Tensor = torch.sqrt(sin_squared_theta) | |
| cos_theta: torch.Tensor = quaternion[..., 0] | |
| two_theta: torch.Tensor = 2.0 * torch.where( | |
| cos_theta < 0.0, torch.atan2(-sin_theta, -cos_theta), | |
| torch.atan2(sin_theta, cos_theta)) | |
| k_pos: torch.Tensor = two_theta / sin_theta | |
| k_neg: torch.Tensor = 2.0 * torch.ones_like(sin_theta) | |
| k: torch.Tensor = torch.where(sin_squared_theta > 0.0, k_pos, k_neg) | |
| angle_axis: torch.Tensor = torch.zeros_like(quaternion)[..., :3] | |
| angle_axis[..., 0] += q1 * k | |
| angle_axis[..., 1] += q2 * k | |
| angle_axis[..., 2] += q3 * k | |
| return angle_axis | |
| def rotation_matrix_to_quaternion(rotation_matrix, eps=1e-6): | |
| """ | |
| This function is borrowed from https://github.com/kornia/kornia | |
| Convert 3x4 rotation matrix to 4d quaternion vector | |
| This algorithm is based on algorithm described in | |
| https://github.com/KieranWynn/pyquaternion/blob/master/pyquaternion/quaternion.py#L201 | |
| Args: | |
| rotation_matrix (Tensor): the rotation matrix to convert. | |
| Return: | |
| Tensor: the rotation in quaternion | |
| Shape: | |
| - Input: :math:`(N, 3, 4)` | |
| - Output: :math:`(N, 4)` | |
| Example: | |
| >>> input = torch.rand(4, 3, 4) # Nx3x4 | |
| >>> output = tgm.rotation_matrix_to_quaternion(input) # Nx4 | |
| """ | |
| if not torch.is_tensor(rotation_matrix): | |
| raise TypeError("Input type is not a torch.Tensor. Got {}".format( | |
| type(rotation_matrix))) | |
| if len(rotation_matrix.shape) > 3: | |
| raise ValueError( | |
| "Input size must be a three dimensional tensor. Got {}".format( | |
| rotation_matrix.shape)) | |
| if not rotation_matrix.shape[-2:] == (3, 4): | |
| raise ValueError( | |
| "Input size must be a N x 3 x 4 tensor. Got {}".format( | |
| rotation_matrix.shape)) | |
| rmat_t = torch.transpose(rotation_matrix, 1, 2) | |
| mask_d2 = rmat_t[:, 2, 2] < eps | |
| mask_d0_d1 = rmat_t[:, 0, 0] > rmat_t[:, 1, 1] | |
| mask_d0_nd1 = rmat_t[:, 0, 0] < -rmat_t[:, 1, 1] | |
| t0 = 1 + rmat_t[:, 0, 0] - rmat_t[:, 1, 1] - rmat_t[:, 2, 2] | |
| q0 = torch.stack([ | |
| rmat_t[:, 1, 2] - rmat_t[:, 2, 1], t0, | |
| rmat_t[:, 0, 1] + rmat_t[:, 1, 0], rmat_t[:, 2, 0] + rmat_t[:, 0, 2] | |
| ], -1) | |
| t0_rep = t0.repeat(4, 1).t() | |
| t1 = 1 - rmat_t[:, 0, 0] + rmat_t[:, 1, 1] - rmat_t[:, 2, 2] | |
| q1 = torch.stack([ | |
| rmat_t[:, 2, 0] - rmat_t[:, 0, 2], rmat_t[:, 0, 1] + rmat_t[:, 1, 0], | |
| t1, rmat_t[:, 1, 2] + rmat_t[:, 2, 1] | |
| ], -1) | |
| t1_rep = t1.repeat(4, 1).t() | |
| t2 = 1 - rmat_t[:, 0, 0] - rmat_t[:, 1, 1] + rmat_t[:, 2, 2] | |
| q2 = torch.stack([ | |
| rmat_t[:, 0, 1] - rmat_t[:, 1, 0], rmat_t[:, 2, 0] + rmat_t[:, 0, 2], | |
| rmat_t[:, 1, 2] + rmat_t[:, 2, 1], t2 | |
| ], -1) | |
| t2_rep = t2.repeat(4, 1).t() | |
| t3 = 1 + rmat_t[:, 0, 0] + rmat_t[:, 1, 1] + rmat_t[:, 2, 2] | |
| q3 = torch.stack([ | |
| t3, rmat_t[:, 1, 2] - rmat_t[:, 2, 1], | |
| rmat_t[:, 2, 0] - rmat_t[:, 0, 2], rmat_t[:, 0, 1] - rmat_t[:, 1, 0] | |
| ], -1) | |
| t3_rep = t3.repeat(4, 1).t() | |
| mask_c0 = mask_d2 * mask_d0_d1 | |
| mask_c1 = mask_d2 * ~mask_d0_d1 | |
| mask_c2 = ~mask_d2 * mask_d0_nd1 | |
| mask_c3 = ~mask_d2 * ~mask_d0_nd1 | |
| mask_c0 = mask_c0.view(-1, 1).type_as(q0) | |
| mask_c1 = mask_c1.view(-1, 1).type_as(q1) | |
| mask_c2 = mask_c2.view(-1, 1).type_as(q2) | |
| mask_c3 = mask_c3.view(-1, 1).type_as(q3) | |
| q = q0 * mask_c0 + q1 * mask_c1 + q2 * mask_c2 + q3 * mask_c3 | |
| q /= torch.sqrt(t0_rep * mask_c0 + t1_rep * mask_c1 + # noqa | |
| t2_rep * mask_c2 + t3_rep * mask_c3) # noqa | |
| q *= 0.5 | |
| return q | |
| def rot6d_to_rotmat(x): | |
| """Convert 6D rotation representation to 3x3 rotation matrix. | |
| Based on Zhou et al., "On the Continuity of Rotation Representations in Neural Networks", CVPR 2019 | |
| Input: | |
| (B,6) Batch of 6-D rotation representations | |
| Output: | |
| (B,3,3) Batch of corresponding rotation matrices | |
| """ | |
| x = x.view(-1, 3, 2) | |
| a1 = x[:, :, 0] | |
| a2 = x[:, :, 1] | |
| b1 = F.normalize(a1) | |
| b2 = F.normalize(a2 - torch.einsum('bi,bi->b', b1, a2).unsqueeze(-1) * b1) | |
| b3 = torch.cross(b1, b2) | |
| return torch.stack((b1, b2, b3), dim=-1) | |
| def projection(pred_joints, pred_camera, retain_z=False): | |
| pred_cam_t = torch.stack([ | |
| pred_camera[:, 1], pred_camera[:, 2], 2 * 5000. / | |
| (224. * pred_camera[:, 0] + 1e-9) | |
| ], | |
| dim=-1) | |
| batch_size = pred_joints.shape[0] | |
| camera_center = torch.zeros(batch_size, 2) | |
| pred_keypoints_2d = perspective_projection( | |
| pred_joints, | |
| rotation=torch.eye(3).unsqueeze(0).expand(batch_size, -1, | |
| -1).to(pred_joints.device), | |
| translation=pred_cam_t, | |
| focal_length=5000., | |
| camera_center=camera_center, | |
| retain_z=retain_z) | |
| # Normalize keypoints to [-1,1] | |
| pred_keypoints_2d = pred_keypoints_2d / (224. / 2.) | |
| return pred_keypoints_2d | |
| def perspective_projection(points, | |
| rotation, | |
| translation, | |
| focal_length, | |
| camera_center, | |
| retain_z=False): | |
| """ | |
| This function computes the perspective projection of a set of points. | |
| Input: | |
| points (bs, N, 3): 3D points | |
| rotation (bs, 3, 3): Camera rotation | |
| translation (bs, 3): Camera translation | |
| focal_length (bs,) or scalar: Focal length | |
| camera_center (bs, 2): Camera center | |
| """ | |
| batch_size = points.shape[0] | |
| K = torch.zeros([batch_size, 3, 3], device=points.device) | |
| K[:, 0, 0] = focal_length | |
| K[:, 1, 1] = focal_length | |
| K[:, 2, 2] = 1. | |
| K[:, :-1, -1] = camera_center | |
| # Transform points | |
| points = torch.einsum('bij,bkj->bki', rotation, points) | |
| points = points + translation.unsqueeze(1) | |
| # Apply perspective distortion | |
| projected_points = points / points[:, :, -1].unsqueeze(-1) | |
| # Apply camera intrinsics | |
| projected_points = torch.einsum('bij,bkj->bki', K, projected_points) | |
| if retain_z: | |
| return projected_points | |
| else: | |
| return projected_points[:, :, :-1] | |
| def estimate_translation_np(S, | |
| joints_2d, | |
| joints_conf, | |
| focal_length=5000, | |
| img_size=224): | |
| """Find camera translation that brings 3D joints S closest to 2D the corresponding joints_2d. | |
| Input: | |
| S: (25, 3) 3D joint locations | |
| joints: (25, 3) 2D joint locations and confidence | |
| Returns: | |
| (3,) camera translation vector | |
| """ | |
| num_joints = S.shape[0] | |
| # focal length | |
| f = np.array([focal_length, focal_length]) | |
| # optical center | |
| center = np.array([img_size / 2., img_size / 2.]) | |
| # transformations | |
| Z = np.reshape(np.tile(S[:, 2], (2, 1)).T, -1) | |
| XY = np.reshape(S[:, 0:2], -1) | |
| O = np.tile(center, num_joints) | |
| F = np.tile(f, num_joints) | |
| weight2 = np.reshape(np.tile(np.sqrt(joints_conf), (2, 1)).T, -1) | |
| # least squares | |
| Q = np.array([ | |
| F * np.tile(np.array([1, 0]), num_joints), | |
| F * np.tile(np.array([0, 1]), num_joints), | |
| O - np.reshape(joints_2d, -1) | |
| ]).T | |
| c = (np.reshape(joints_2d, -1) - O) * Z - F * XY | |
| # weighted least squares | |
| W = np.diagflat(weight2) | |
| Q = np.dot(W, Q) | |
| c = np.dot(W, c) | |
| # square matrix | |
| A = np.dot(Q.T, Q) | |
| b = np.dot(Q.T, c) | |
| # solution | |
| trans = np.linalg.solve(A, b) | |
| return trans | |
| def estimate_translation(S, joints_2d, focal_length=5000., img_size=224.): | |
| """Find camera translation that brings 3D joints S closest to 2D the corresponding joints_2d. | |
| Input: | |
| S: (B, 49, 3) 3D joint locations | |
| joints: (B, 49, 3) 2D joint locations and confidence | |
| Returns: | |
| (B, 3) camera translation vectors | |
| """ | |
| device = S.device | |
| # Use only joints 25:49 (GT joints) | |
| S = S[:, 25:, :].cpu().numpy() | |
| joints_2d = joints_2d[:, 25:, :].cpu().numpy() | |
| joints_conf = joints_2d[:, :, -1] | |
| joints_2d = joints_2d[:, :, :-1] | |
| trans = np.zeros((S.shape[0], 3), dtype=np.float32) | |
| # Find the translation for each example in the batch | |
| for i in range(S.shape[0]): | |
| S_i = S[i] | |
| joints_i = joints_2d[i] | |
| conf_i = joints_conf[i] | |
| trans[i] = estimate_translation_np(S_i, | |
| joints_i, | |
| conf_i, | |
| focal_length=focal_length, | |
| img_size=img_size) | |
| return torch.from_numpy(trans).to(device) | |
| def Rot_y(angle, category='torch', prepend_dim=True, device=None): | |
| '''Rotate around y-axis by angle | |
| Args: | |
| category: 'torch' or 'numpy' | |
| prepend_dim: prepend an extra dimension | |
| Return: Rotation matrix with shape [1, 3, 3] (prepend_dim=True) | |
| ''' | |
| m = np.array([[np.cos(angle), 0., np.sin(angle)], [0., 1., 0.], | |
| [-np.sin(angle), 0., np.cos(angle)]]) | |
| if category == 'torch': | |
| if prepend_dim: | |
| return torch.tensor(m, dtype=torch.float, | |
| device=device).unsqueeze(0) | |
| else: | |
| return torch.tensor(m, dtype=torch.float, device=device) | |
| elif category == 'numpy': | |
| if prepend_dim: | |
| return np.expand_dims(m, 0) | |
| else: | |
| return m | |
| else: | |
| raise ValueError("category must be 'torch' or 'numpy'") | |
| def Rot_x(angle, category='torch', prepend_dim=True, device=None): | |
| '''Rotate around x-axis by angle | |
| Args: | |
| category: 'torch' or 'numpy' | |
| prepend_dim: prepend an extra dimension | |
| Return: Rotation matrix with shape [1, 3, 3] (prepend_dim=True) | |
| ''' | |
| m = np.array([[1., 0., 0.], [0., np.cos(angle), -np.sin(angle)], | |
| [0., np.sin(angle), np.cos(angle)]]) | |
| if category == 'torch': | |
| if prepend_dim: | |
| return torch.tensor(m, dtype=torch.float, | |
| device=device).unsqueeze(0) | |
| else: | |
| return torch.tensor(m, dtype=torch.float, device=device) | |
| elif category == 'numpy': | |
| if prepend_dim: | |
| return np.expand_dims(m, 0) | |
| else: | |
| return m | |
| else: | |
| raise ValueError("category must be 'torch' or 'numpy'") | |
| def Rot_z(angle, category='torch', prepend_dim=True, device=None): | |
| '''Rotate around z-axis by angle | |
| Args: | |
| category: 'torch' or 'numpy' | |
| prepend_dim: prepend an extra dimension | |
| Return: Rotation matrix with shape [1, 3, 3] (prepend_dim=True) | |
| ''' | |
| m = np.array([[np.cos(angle), -np.sin(angle), 0.], | |
| [np.sin(angle), np.cos(angle), 0.], [0., 0., 1.]]) | |
| if category == 'torch': | |
| if prepend_dim: | |
| return torch.tensor(m, dtype=torch.float, | |
| device=device).unsqueeze(0) | |
| else: | |
| return torch.tensor(m, dtype=torch.float, device=device) | |
| elif category == 'numpy': | |
| if prepend_dim: | |
| return np.expand_dims(m, 0) | |
| else: | |
| return m | |
| else: | |
| raise ValueError("category must be 'torch' or 'numpy'") | |