# Copyright (c) 2021 PaddlePaddle Authors. All Rights Reserved. # # Licensed under the Apache License, Version 2.0 (the "License"); # you may not use this file except in compliance with the License. # You may obtain a copy of the License at # # http://www.apache.org/licenses/LICENSE-2.0 # # Unless required by applicable law or agreed to in writing, software # distributed under the License is distributed on an "AS IS" BASIS, # WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied. # See the License for the specific language governing permissions and # limitations under the License. import cv2 import numpy as np def get_affine_mat_kernel(h, w, s, inv=False): if w < h: w_ = s h_ = int(np.ceil((s / w * h) / 64.) * 64) scale_w = w scale_h = h_ / w_ * w else: h_ = s w_ = int(np.ceil((s / h * w) / 64.) * 64) scale_h = h scale_w = w_ / h_ * h center = np.array([np.round(w / 2.), np.round(h / 2.)]) size_resized = (w_, h_) trans = get_affine_transform( center, np.array([scale_w, scale_h]), 0, size_resized, inv=inv) return trans, size_resized def get_affine_transform(center, input_size, rot, output_size, shift=(0., 0.), inv=False): """Get the affine transform matrix, given the center/scale/rot/output_size. Args: center (np.ndarray[2, ]): Center of the bounding box (x, y). scale (np.ndarray[2, ]): Scale of the bounding box wrt [width, height]. rot (float): Rotation angle (degree). output_size (np.ndarray[2, ]): Size of the destination heatmaps. shift (0-100%): Shift translation ratio wrt the width/height. Default (0., 0.). inv (bool): Option to inverse the affine transform direction. (inv=False: src->dst or inv=True: dst->src) Returns: np.ndarray: The transform matrix. """ assert len(center) == 2 assert len(input_size) == 2 assert len(output_size) == 2 assert len(shift) == 2 scale_tmp = input_size shift = np.array(shift) src_w = scale_tmp[0] dst_w = output_size[0] dst_h = output_size[1] rot_rad = np.pi * rot / 180 src_dir = rotate_point([0., src_w * -0.5], rot_rad) dst_dir = np.array([0., dst_w * -0.5]) src = np.zeros((3, 2), dtype=np.float32) src[0, :] = center + scale_tmp * shift src[1, :] = center + src_dir + scale_tmp * shift src[2, :] = _get_3rd_point(src[0, :], src[1, :]) dst = np.zeros((3, 2), dtype=np.float32) dst[0, :] = [dst_w * 0.5, dst_h * 0.5] dst[1, :] = np.array([dst_w * 0.5, dst_h * 0.5]) + dst_dir dst[2, :] = _get_3rd_point(dst[0, :], dst[1, :]) if inv: trans = cv2.getAffineTransform(np.float32(dst), np.float32(src)) else: trans = cv2.getAffineTransform(np.float32(src), np.float32(dst)) return trans def _get_3rd_point(a, b): """To calculate the affine matrix, three pairs of points are required. This function is used to get the 3rd point, given 2D points a & b. The 3rd point is defined by rotating vector `a - b` by 90 degrees anticlockwise, using b as the rotation center. Args: a (np.ndarray): point(x,y) b (np.ndarray): point(x,y) Returns: np.ndarray: The 3rd point. """ assert len(a) == 2 assert len(b) == 2 direction = a - b third_pt = b + np.array([-direction[1], direction[0]], dtype=np.float32) return third_pt def rotate_point(pt, angle_rad): """Rotate a point by an angle. Args: pt (list[float]): 2 dimensional point to be rotated angle_rad (float): rotation angle by radian Returns: list[float]: Rotated point. """ assert len(pt) == 2 sn, cs = np.sin(angle_rad), np.cos(angle_rad) new_x = pt[0] * cs - pt[1] * sn new_y = pt[0] * sn + pt[1] * cs rotated_pt = [new_x, new_y] return rotated_pt def transpred(kpts, h, w, s): trans, _ = get_affine_mat_kernel(h, w, s, inv=True) return warp_affine_joints(kpts[..., :2].copy(), trans) def warp_affine_joints(joints, mat): """Apply affine transformation defined by the transform matrix on the joints. Args: joints (np.ndarray[..., 2]): Origin coordinate of joints. mat (np.ndarray[3, 2]): The affine matrix. Returns: matrix (np.ndarray[..., 2]): Result coordinate of joints. """ joints = np.array(joints) shape = joints.shape joints = joints.reshape(-1, 2) return np.dot(np.concatenate( (joints, joints[:, 0:1] * 0 + 1), axis=1), mat.T).reshape(shape) def affine_transform(pt, t): new_pt = np.array([pt[0], pt[1], 1.]).T new_pt = np.dot(t, new_pt) return new_pt[:2] def transform_preds(coords, center, scale, output_size): target_coords = np.zeros(coords.shape) trans = get_affine_transform(center, scale * 200, 0, output_size, inv=1) for p in range(coords.shape[0]): target_coords[p, 0:2] = affine_transform(coords[p, 0:2], trans) return target_coords def oks_iou(g, d, a_g, a_d, sigmas=None, in_vis_thre=None): if not isinstance(sigmas, np.ndarray): sigmas = np.array([ .26, .25, .25, .35, .35, .79, .79, .72, .72, .62, .62, 1.07, 1.07, .87, .87, .89, .89 ]) / 10.0 vars = (sigmas * 2)**2 xg = g[0::3] yg = g[1::3] vg = g[2::3] ious = np.zeros((d.shape[0])) for n_d in range(0, d.shape[0]): xd = d[n_d, 0::3] yd = d[n_d, 1::3] vd = d[n_d, 2::3] dx = xd - xg dy = yd - yg e = (dx**2 + dy**2) / vars / ((a_g + a_d[n_d]) / 2 + np.spacing(1)) / 2 if in_vis_thre is not None: ind = list(vg > in_vis_thre) and list(vd > in_vis_thre) e = e[ind] ious[n_d] = np.sum(np.exp(-e)) / e.shape[0] if e.shape[0] != 0 else 0.0 return ious def oks_nms(kpts_db, thresh, sigmas=None, in_vis_thre=None): """greedily select boxes with high confidence and overlap with current maximum <= thresh rule out overlap >= thresh Args: kpts_db (list): The predicted keypoints within the image thresh (float): The threshold to select the boxes sigmas (np.array): The variance to calculate the oks iou Default: None in_vis_thre (float): The threshold to select the high confidence boxes Default: None Return: keep (list): indexes to keep """ if len(kpts_db) == 0: return [] scores = np.array([kpts_db[i]['score'] for i in range(len(kpts_db))]) kpts = np.array( [kpts_db[i]['keypoints'].flatten() for i in range(len(kpts_db))]) areas = np.array([kpts_db[i]['area'] for i in range(len(kpts_db))]) order = scores.argsort()[::-1] keep = [] while order.size > 0: i = order[0] keep.append(i) oks_ovr = oks_iou(kpts[i], kpts[order[1:]], areas[i], areas[order[1:]], sigmas, in_vis_thre) inds = np.where(oks_ovr <= thresh)[0] order = order[inds + 1] return keep def rescore(overlap, scores, thresh, type='gaussian'): assert overlap.shape[0] == scores.shape[0] if type == 'linear': inds = np.where(overlap >= thresh)[0] scores[inds] = scores[inds] * (1 - overlap[inds]) else: scores = scores * np.exp(-overlap**2 / thresh) return scores def soft_oks_nms(kpts_db, thresh, sigmas=None, in_vis_thre=None): """greedily select boxes with high confidence and overlap with current maximum <= thresh rule out overlap >= thresh Args: kpts_db (list): The predicted keypoints within the image thresh (float): The threshold to select the boxes sigmas (np.array): The variance to calculate the oks iou Default: None in_vis_thre (float): The threshold to select the high confidence boxes Default: None Return: keep (list): indexes to keep """ if len(kpts_db) == 0: return [] scores = np.array([kpts_db[i]['score'] for i in range(len(kpts_db))]) kpts = np.array( [kpts_db[i]['keypoints'].flatten() for i in range(len(kpts_db))]) areas = np.array([kpts_db[i]['area'] for i in range(len(kpts_db))]) order = scores.argsort()[::-1] scores = scores[order] # max_dets = order.size max_dets = 20 keep = np.zeros(max_dets, dtype=np.intp) keep_cnt = 0 while order.size > 0 and keep_cnt < max_dets: i = order[0] oks_ovr = oks_iou(kpts[i], kpts[order[1:]], areas[i], areas[order[1:]], sigmas, in_vis_thre) order = order[1:] scores = rescore(oks_ovr, scores[1:], thresh) tmp = scores.argsort()[::-1] order = order[tmp] scores = scores[tmp] keep[keep_cnt] = i keep_cnt += 1 keep = keep[:keep_cnt] return keep