""" ================================= Gaussian Mixture Model Sine Curve ================================= This example highlights the advantages of the Dirichlet Process: complexity control and dealing with sparse data. The dataset is formed by 100 points loosely spaced following a noisy sine curve. The fit by the GMM class, using the expectation-maximization algorithm to fit a mixture of 10 Gaussian components, finds too-small components and very little structure. The fits by the Dirichlet process, however, show that the model can either learn a global structure for the data (small alpha) or easily interpolate to finding relevant local structure (large alpha), never falling into the problems shown by the GMM class. """ import itertools import numpy as np from scipy import linalg import matplotlib.pyplot as plt import matplotlib as mpl from sklearn import mixture from sklearn.externals.six.moves import xrange # Number of samples per component n_samples = 100 # Generate random sample following a sine curve np.random.seed(0) X = np.zeros((n_samples, 2)) step = 4 * np.pi / n_samples for i in xrange(X.shape[0]): x = i * step - 6 X[i, 0] = x + np.random.normal(0, 0.1) X[i, 1] = 3 * (np.sin(x) + np.random.normal(0, .2)) color_iter = itertools.cycle(['r', 'g', 'b', 'c', 'm']) for i, (clf, title) in enumerate([ (mixture.GMM(n_components=10, covariance_type='full', n_iter=100), "Expectation-maximization"), (mixture.DPGMM(n_components=10, covariance_type='full', alpha=0.01, n_iter=100), "Dirichlet Process,alpha=0.01"), (mixture.DPGMM(n_components=10, covariance_type='diag', alpha=100., n_iter=100), "Dirichlet Process,alpha=100.")]): clf.fit(X) splot = plt.subplot(3, 1, 1 + i) Y_ = clf.predict(X) for i, (mean, covar, color) in enumerate(zip( clf.means_, clf._get_covars(), color_iter)): v, w = linalg.eigh(covar) u = w[0] / linalg.norm(w[0]) # as the DP will not use every component it has access to # unless it needs it, we shouldn't plot the redundant # components. if not np.any(Y_ == i): continue plt.scatter(X[Y_ == i, 0], X[Y_ == i, 1], .8, color=color) # Plot an ellipse to show the Gaussian component angle = np.arctan(u[1] / u[0]) angle = 180 * angle / np.pi # convert to degrees ell = mpl.patches.Ellipse(mean, v[0], v[1], 180 + angle, color=color) ell.set_clip_box(splot.bbox) ell.set_alpha(0.5) splot.add_artist(ell) plt.xlim(-6, 4 * np.pi - 6) plt.ylim(-5, 5) plt.title(title) plt.xticks(()) plt.yticks(()) plt.show()