#!/usr/bin/python # -*- coding: utf-8 -*- """ ========================================================= Ordinary Least Squares and Ridge Regression Variance ========================================================= Due to the few points in each dimension and the straight line that linear regression uses to follow these points as well as it can, noise on the observations will cause great variance as shown in the first plot. Every line's slope can vary quite a bit for each prediction due to the noise induced in the observations. Ridge regression is basically minimizing a penalised version of the least-squared function. The penalising `shrinks` the value of the regression coefficients. Despite the few data points in each dimension, the slope of the prediction is much more stable and the variance in the line itself is greatly reduced, in comparison to that of the standard linear regression """ print(__doc__) # Code source: Gaƫl Varoquaux # Modified for documentation by Jaques Grobler # License: BSD 3 clause import numpy as np import matplotlib.pyplot as plt from sklearn import linear_model X_train = np.c_[.5, 1].T y_train = [.5, 1] X_test = np.c_[0, 2].T np.random.seed(0) classifiers = dict(ols=linear_model.LinearRegression(), ridge=linear_model.Ridge(alpha=.1)) fignum = 1 for name, clf in classifiers.items(): fig = plt.figure(fignum, figsize=(4, 3)) plt.clf() plt.title(name) ax = plt.axes([.12, .12, .8, .8]) for _ in range(6): this_X = .1 * np.random.normal(size=(2, 1)) + X_train clf.fit(this_X, y_train) ax.plot(X_test, clf.predict(X_test), color='.5') ax.scatter(this_X, y_train, s=3, c='.5', marker='o', zorder=10) clf.fit(X_train, y_train) ax.plot(X_test, clf.predict(X_test), linewidth=2, color='blue') ax.scatter(X_train, y_train, s=30, c='r', marker='+', zorder=10) ax.set_xticks(()) ax.set_yticks(()) ax.set_ylim((0, 1.6)) ax.set_xlabel('X') ax.set_ylabel('y') ax.set_xlim(0, 2) fignum += 1 plt.show()