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近似和细分多边形#
本示例展示了如何近似(Douglas-Peucker 算法)和细分(B-Splines)多边形链。
Number of coordinates: 22 704 26
Number of coordinates: 1173 32 9
Number of coordinates: 701 21 5
import numpy as np
import matplotlib.pyplot as plt
from skimage.draw import ellipse
from skimage.measure import find_contours, approximate_polygon, subdivide_polygon
hand = np.array(
[
[1.64516129, 1.16145833],
[1.64516129, 1.59375],
[1.35080645, 1.921875],
[1.375, 2.18229167],
[1.68548387, 1.9375],
[1.60887097, 2.55208333],
[1.68548387, 2.69791667],
[1.76209677, 2.56770833],
[1.83064516, 1.97395833],
[1.89516129, 2.75],
[1.9516129, 2.84895833],
[2.01209677, 2.76041667],
[1.99193548, 1.99479167],
[2.11290323, 2.63020833],
[2.2016129, 2.734375],
[2.25403226, 2.60416667],
[2.14919355, 1.953125],
[2.30645161, 2.36979167],
[2.39112903, 2.36979167],
[2.41532258, 2.1875],
[2.1733871, 1.703125],
[2.07782258, 1.16666667],
]
)
# subdivide polygon using 2nd degree B-Splines
new_hand = hand.copy()
for _ in range(5):
new_hand = subdivide_polygon(new_hand, degree=2, preserve_ends=True)
# approximate subdivided polygon with Douglas-Peucker algorithm
appr_hand = approximate_polygon(new_hand, tolerance=0.02)
print("Number of coordinates:", len(hand), len(new_hand), len(appr_hand))
fig, (ax1, ax2) = plt.subplots(ncols=2, figsize=(9, 4))
ax1.plot(hand[:, 0], hand[:, 1])
ax1.plot(new_hand[:, 0], new_hand[:, 1])
ax1.plot(appr_hand[:, 0], appr_hand[:, 1])
# create two ellipses in image
img = np.zeros((800, 800), 'int32')
rr, cc = ellipse(250, 250, 180, 230, img.shape)
img[rr, cc] = 1
rr, cc = ellipse(600, 600, 150, 90, img.shape)
img[rr, cc] = 1
plt.gray()
ax2.imshow(img)
# approximate / simplify coordinates of the two ellipses
for contour in find_contours(img, 0):
coords = approximate_polygon(contour, tolerance=2.5)
ax2.plot(coords[:, 1], coords[:, 0], '-r', linewidth=2)
coords2 = approximate_polygon(contour, tolerance=39.5)
ax2.plot(coords2[:, 1], coords2[:, 0], '-g', linewidth=2)
print("Number of coordinates:", len(contour), len(coords), len(coords2))
ax2.axis((0, 800, 0, 800))
plt.show()
脚本总运行时间: (0 分钟 0.103 秒)