""" =========================================== Spectral clustering for image segmentation =========================================== In this example, an image with connected circles is generated and spectral clustering is used to separate the circles. In these settings, the :ref:`spectral_clustering` approach solves the problem know as 'normalized graph cuts': the image is seen as a graph of connected voxels, and the spectral clustering algorithm amounts to choosing graph cuts defining regions while minimizing the ratio of the gradient along the cut, and the volume of the region. As the algorithm tries to balance the volume (ie balance the region sizes), if we take circles with different sizes, the segmentation fails. In addition, as there is no useful information in the intensity of the image, or its gradient, we choose to perform the spectral clustering on a graph that is only weakly informed by the gradient. This is close to performing a Voronoi partition of the graph. In addition, we use the mask of the objects to restrict the graph to the outline of the objects. In this example, we are interested in separating the objects one from the other, and not from the background. """ print(__doc__) # Authors: Emmanuelle Gouillart # Gael Varoquaux # License: BSD 3 clause import numpy as np import matplotlib.pyplot as plt from sklearn.feature_extraction import image from sklearn.cluster import spectral_clustering ############################################################################### l = 100 x, y = np.indices((l, l)) center1 = (28, 24) center2 = (40, 50) center3 = (67, 58) center4 = (24, 70) radius1, radius2, radius3, radius4 = 16, 14, 15, 14 circle1 = (x - center1[0]) ** 2 + (y - center1[1]) ** 2 < radius1 ** 2 circle2 = (x - center2[0]) ** 2 + (y - center2[1]) ** 2 < radius2 ** 2 circle3 = (x - center3[0]) ** 2 + (y - center3[1]) ** 2 < radius3 ** 2 circle4 = (x - center4[0]) ** 2 + (y - center4[1]) ** 2 < radius4 ** 2 ############################################################################### # 4 circles img = circle1 + circle2 + circle3 + circle4 mask = img.astype(bool) img = img.astype(float) img += 1 + 0.2 * np.random.randn(*img.shape) # Convert the image into a graph with the value of the gradient on the # edges. graph = image.img_to_graph(img, mask=mask) # Take a decreasing function of the gradient: we take it weakly # dependent from the gradient the segmentation is close to a voronoi graph.data = np.exp(-graph.data / graph.data.std()) # Force the solver to be arpack, since amg is numerically # unstable on this example labels = spectral_clustering(graph, n_clusters=4, eigen_solver='arpack') label_im = -np.ones(mask.shape) label_im[mask] = labels plt.matshow(img) plt.matshow(label_im) ############################################################################### # 2 circles img = circle1 + circle2 mask = img.astype(bool) img = img.astype(float) img += 1 + 0.2 * np.random.randn(*img.shape) graph = image.img_to_graph(img, mask=mask) graph.data = np.exp(-graph.data / graph.data.std()) labels = spectral_clustering(graph, n_clusters=2, eigen_solver='arpack') label_im = -np.ones(mask.shape) label_im[mask] = labels plt.matshow(img) plt.matshow(label_im) plt.show()