""" ============================ Gradient Boosting regression ============================ Demonstrate Gradient Boosting on the boston housing dataset. This example fits a Gradient Boosting model with least squares loss and 500 regression trees of depth 4. """ print(__doc__) # Author: Peter Prettenhofer # # License: BSD 3 clause import numpy as np import matplotlib.pyplot as plt from sklearn import ensemble from sklearn import datasets from sklearn.utils import shuffle from sklearn.metrics import mean_squared_error ############################################################################### # Load data boston = datasets.load_boston() X, y = shuffle(boston.data, boston.target, random_state=13) X = X.astype(np.float32) offset = int(X.shape[0] * 0.9) X_train, y_train = X[:offset], y[:offset] X_test, y_test = X[offset:], y[offset:] ############################################################################### # Fit regression model params = {'n_estimators': 500, 'max_depth': 4, 'min_samples_split': 1, 'learning_rate': 0.01, 'loss': 'ls'} clf = ensemble.GradientBoostingRegressor(**params) clf.fit(X_train, y_train) mse = mean_squared_error(y_test, clf.predict(X_test)) print("MSE: %.4f" % mse) ############################################################################### # Plot training deviance # compute test set deviance test_score = np.zeros((params['n_estimators'],), dtype=np.float64) for i, y_pred in enumerate(clf.staged_decision_function(X_test)): test_score[i] = clf.loss_(y_test, y_pred) plt.figure(figsize=(12, 6)) plt.subplot(1, 2, 1) plt.title('Deviance') plt.plot(np.arange(params['n_estimators']) + 1, clf.train_score_, 'b-', label='Training Set Deviance') plt.plot(np.arange(params['n_estimators']) + 1, test_score, 'r-', label='Test Set Deviance') plt.legend(loc='upper right') plt.xlabel('Boosting Iterations') plt.ylabel('Deviance') ############################################################################### # Plot feature importance feature_importance = clf.feature_importances_ # make importances relative to max importance feature_importance = 100.0 * (feature_importance / feature_importance.max()) sorted_idx = np.argsort(feature_importance) pos = np.arange(sorted_idx.shape[0]) + .5 plt.subplot(1, 2, 2) plt.barh(pos, feature_importance[sorted_idx], align='center') plt.yticks(pos, boston.feature_names[sorted_idx]) plt.xlabel('Relative Importance') plt.title('Variable Importance') plt.show()