import numpy as np from scipy.interpolate import interp1d def compute_path_from_wp(start_xp, start_yp, step=0.1): """ Args: start_xp (array-like): 1D array of x-positions start_yp (array-like): 1D array of y-positions step (float): intepolation step Returns: ndarray of shape (3,N) representing the path as x,y,heading """ final_xp = [] final_yp = [] delta = step # [m] for idx in range(len(start_xp) - 1): section_len = np.sum( np.sqrt( np.power(np.diff(start_xp[idx : idx + 2]), 2) + np.power(np.diff(start_yp[idx : idx + 2]), 2) ) ) interp_range = np.linspace(0, 1, np.floor(section_len / delta).astype(int)) fx = interp1d(np.linspace(0, 1, 2), start_xp[idx : idx + 2], kind=1) fy = interp1d(np.linspace(0, 1, 2), start_yp[idx : idx + 2], kind=1) # watch out to duplicate points! final_xp = np.append(final_xp, fx(interp_range)[1:]) final_yp = np.append(final_yp, fy(interp_range)[1:]) dx = np.append(0, np.diff(final_xp)) dy = np.append(0, np.diff(final_yp)) theta = np.arctan2(dy, dx) return np.vstack((final_xp, final_yp, theta)) def get_nn_idx(state, path): """ Finds the index of the closest element Args: state (array-like): 1D array whose first two elements are x-pos and y-pos path (ndarray): 2D array of shape (2,N) of x,y points Returns: int: the index of the closest element """ dx = state[0] - path[0, :] dy = state[1] - path[1, :] dist = np.hypot(dx, dy) nn_idx = np.argmin(dist) try: v = [ path[0, nn_idx + 1] - path[0, nn_idx], path[1, nn_idx + 1] - path[1, nn_idx], ] v /= np.linalg.norm(v) d = [path[0, nn_idx] - state[0], path[1, nn_idx] - state[1]] if np.dot(d, v) > 0: target_idx = nn_idx else: target_idx = nn_idx + 1 except IndexError as e: target_idx = nn_idx return target_idx def get_ref_trajectory(state, path, target_v, T, DT): """ Args: state (array-like): state of the vehicle in world frame path (ndarray): 2D array representing the path as x,y,heading points in world frame target_v (float): reference speed T (float): trajectory duration DT (float): trajectory time-step Returns: ndarray: 2D array representing state space reference trajectory expressed w.r.t ego state """ K = int(T / DT) xref = np.zeros((4, K)) ind = get_nn_idx(state, path) cdist = np.append( [0.0], np.cumsum(np.hypot(np.diff(path[0, :].T), np.diff(path[1, :]).T)) ) cdist = np.clip(cdist, cdist[0], cdist[-1]) start_dist = cdist[ind] interp_points = [d * DT * target_v + start_dist for d in range(1, K + 1)] xref[0, :] = np.interp(interp_points, cdist, path[0, :]) xref[1, :] = np.interp(interp_points, cdist, path[1, :]) xref[2, :] = target_v xref[3, :] = np.interp(interp_points, cdist, path[2, :]) # points where the vehicle is at the end of trajectory xref_cdist = np.interp(interp_points, cdist, cdist) stop_idx = np.where(xref_cdist == cdist[-1]) xref[2, stop_idx] = 0.0 # transform in car ego frame dx = xref[0, :] - state[0] dy = xref[1, :] - state[1] xref[0, :] = dx * np.cos(-state[3]) - dy * np.sin(-state[3]) # X xref[1, :] = dy * np.cos(-state[3]) + dx * np.sin(-state[3]) # Y xref[3, :] = path[2, ind] - state[3] # Theta def fix_angle_reference(angle_ref, angle_init): """ Removes jumps greater than 2PI Args: angle_ref (array-like): angle_init (float): Returns: array-like: """ diff_angle = angle_ref - angle_init diff_angle = np.unwrap(diff_angle) return angle_init + diff_angle xref[3, :] = (xref[3, :] + np.pi) % (2.0 * np.pi) - np.pi xref[3, :] = fix_angle_reference(xref[3, :], xref[3, 0]) return xref