""" ==================================================================== Comparison of the K-Means and MiniBatchKMeans clustering algorithms ==================================================================== We want to compare the performance of the MiniBatchKMeans and KMeans: the MiniBatchKMeans is faster, but gives slightly different results (see :ref:`mini_batch_kmeans`). We will cluster a set of data, first with KMeans and then with MiniBatchKMeans, and plot the results. We will also plot the points that are labelled differently between the two algorithms. """ print(__doc__) import time import numpy as np import matplotlib.pyplot as plt from sklearn.cluster import MiniBatchKMeans, KMeans from sklearn.metrics.pairwise import pairwise_distances_argmin from sklearn.datasets.samples_generator import make_blobs ############################################################################## # Generate sample data np.random.seed(0) batch_size = 45 centers = [[1, 1], [-1, -1], [1, -1]] n_clusters = len(centers) X, labels_true = make_blobs(n_samples=3000, centers=centers, cluster_std=0.7) ############################################################################## # Compute clustering with Means k_means = KMeans(init='k-means++', n_clusters=3, n_init=10) t0 = time.time() k_means.fit(X) t_batch = time.time() - t0 k_means_labels = k_means.labels_ k_means_cluster_centers = k_means.cluster_centers_ k_means_labels_unique = np.unique(k_means_labels) ############################################################################## # Compute clustering with MiniBatchKMeans mbk = MiniBatchKMeans(init='k-means++', n_clusters=3, batch_size=batch_size, n_init=10, max_no_improvement=10, verbose=0) t0 = time.time() mbk.fit(X) t_mini_batch = time.time() - t0 mbk_means_labels = mbk.labels_ mbk_means_cluster_centers = mbk.cluster_centers_ mbk_means_labels_unique = np.unique(mbk_means_labels) ############################################################################## # Plot result fig = plt.figure(figsize=(8, 3)) fig.subplots_adjust(left=0.02, right=0.98, bottom=0.05, top=0.9) colors = ['#4EACC5', '#FF9C34', '#4E9A06'] # We want to have the same colors for the same cluster from the # MiniBatchKMeans and the KMeans algorithm. Let's pair the cluster centers per # closest one. order = pairwise_distances_argmin(k_means_cluster_centers, mbk_means_cluster_centers) # KMeans ax = fig.add_subplot(1, 3, 1) for k, col in zip(range(n_clusters), colors): my_members = k_means_labels == k cluster_center = k_means_cluster_centers[k] ax.plot(X[my_members, 0], X[my_members, 1], 'w', markerfacecolor=col, marker='.') ax.plot(cluster_center[0], cluster_center[1], 'o', markerfacecolor=col, markeredgecolor='k', markersize=6) ax.set_title('KMeans') ax.set_xticks(()) ax.set_yticks(()) plt.text(-3.5, 1.8, 'train time: %.2fs\ninertia: %f' % ( t_batch, k_means.inertia_)) # MiniBatchKMeans ax = fig.add_subplot(1, 3, 2) for k, col in zip(range(n_clusters), colors): my_members = mbk_means_labels == order[k] cluster_center = mbk_means_cluster_centers[order[k]] ax.plot(X[my_members, 0], X[my_members, 1], 'w', markerfacecolor=col, marker='.') ax.plot(cluster_center[0], cluster_center[1], 'o', markerfacecolor=col, markeredgecolor='k', markersize=6) ax.set_title('MiniBatchKMeans') ax.set_xticks(()) ax.set_yticks(()) plt.text(-3.5, 1.8, 'train time: %.2fs\ninertia: %f' % (t_mini_batch, mbk.inertia_)) # Initialise the different array to all False different = (mbk_means_labels == 4) ax = fig.add_subplot(1, 3, 3) for l in range(n_clusters): different += ((k_means_labels == k) != (mbk_means_labels == order[k])) identic = np.logical_not(different) ax.plot(X[identic, 0], X[identic, 1], 'w', markerfacecolor='#bbbbbb', marker='.') ax.plot(X[different, 0], X[different, 1], 'w', markerfacecolor='m', marker='.') ax.set_title('Difference') ax.set_xticks(()) ax.set_yticks(()) plt.show()