sklearn/examples/ensemble/plot_gradient_boosting_regr...

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"""
============================
Gradient Boosting regression
============================
This example demonstrates Gradient Boosting to produce a predictive
model from an ensemble of weak predictive models. Gradient boosting can be used
for regression and classification problems. Here, we will train a model to
tackle a diabetes regression task. We will obtain the results from
:class:`~sklearn.ensemble.GradientBoostingRegressor` with least squares loss
and 500 regression trees of depth 4.
Note: For larger datasets (n_samples >= 10000), please refer to
:class:`~sklearn.ensemble.HistGradientBoostingRegressor`. See
:ref:`sphx_glr_auto_examples_ensemble_plot_hgbt_regression.py` for an example
showcasing some other advantages of
:class:`~ensemble.HistGradientBoostingRegressor`.
"""
# Author: Peter Prettenhofer <peter.prettenhofer@gmail.com>
# Maria Telenczuk <https://github.com/maikia>
# Katrina Ni <https://github.com/nilichen>
#
# License: BSD 3 clause
import matplotlib.pyplot as plt
import numpy as np
from sklearn import datasets, ensemble
from sklearn.inspection import permutation_importance
from sklearn.metrics import mean_squared_error
from sklearn.model_selection import train_test_split
# %%
# Load the data
# -------------------------------------
#
# First we need to load the data.
diabetes = datasets.load_diabetes()
X, y = diabetes.data, diabetes.target
# %%
# Data preprocessing
# -------------------------------------
#
# Next, we will split our dataset to use 90% for training and leave the rest
# for testing. We will also set the regression model parameters. You can play
# with these parameters to see how the results change.
#
# `n_estimators` : the number of boosting stages that will be performed.
# Later, we will plot deviance against boosting iterations.
#
# `max_depth` : limits the number of nodes in the tree.
# The best value depends on the interaction of the input variables.
#
# `min_samples_split` : the minimum number of samples required to split an
# internal node.
#
# `learning_rate` : how much the contribution of each tree will shrink.
#
# `loss` : loss function to optimize. The least squares function is used in
# this case however, there are many other options (see
# :class:`~sklearn.ensemble.GradientBoostingRegressor` ).
X_train, X_test, y_train, y_test = train_test_split(
X, y, test_size=0.1, random_state=13
)
params = {
"n_estimators": 500,
"max_depth": 4,
"min_samples_split": 5,
"learning_rate": 0.01,
"loss": "squared_error",
}
# %%
# Fit regression model
# --------------------
#
# Now we will initiate the gradient boosting regressors and fit it with our
# training data. Let's also look and the mean squared error on the test data.
reg = ensemble.GradientBoostingRegressor(**params)
reg.fit(X_train, y_train)
mse = mean_squared_error(y_test, reg.predict(X_test))
print("The mean squared error (MSE) on test set: {:.4f}".format(mse))
# %%
# Plot training deviance
# ----------------------
#
# Finally, we will visualize the results. To do that we will first compute the
# test set deviance and then plot it against boosting iterations.
test_score = np.zeros((params["n_estimators"],), dtype=np.float64)
for i, y_pred in enumerate(reg.staged_predict(X_test)):
test_score[i] = mean_squared_error(y_test, y_pred)
fig = plt.figure(figsize=(6, 6))
plt.subplot(1, 1, 1)
plt.title("Deviance")
plt.plot(
np.arange(params["n_estimators"]) + 1,
reg.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")
fig.tight_layout()
plt.show()
# %%
# Plot feature importance
# -----------------------
#
# .. warning::
# Careful, impurity-based feature importances can be misleading for
# **high cardinality** features (many unique values). As an alternative,
# the permutation importances of ``reg`` can be computed on a
# held out test set. See :ref:`permutation_importance` for more details.
#
# For this example, the impurity-based and permutation methods identify the
# same 2 strongly predictive features but not in the same order. The third most
# predictive feature, "bp", is also the same for the 2 methods. The remaining
# features are less predictive and the error bars of the permutation plot
# show that they overlap with 0.
feature_importance = reg.feature_importances_
sorted_idx = np.argsort(feature_importance)
pos = np.arange(sorted_idx.shape[0]) + 0.5
fig = plt.figure(figsize=(12, 6))
plt.subplot(1, 2, 1)
plt.barh(pos, feature_importance[sorted_idx], align="center")
plt.yticks(pos, np.array(diabetes.feature_names)[sorted_idx])
plt.title("Feature Importance (MDI)")
result = permutation_importance(
reg, X_test, y_test, n_repeats=10, random_state=42, n_jobs=2
)
sorted_idx = result.importances_mean.argsort()
plt.subplot(1, 2, 2)
plt.boxplot(
result.importances[sorted_idx].T,
vert=False,
labels=np.array(diabetes.feature_names)[sorted_idx],
)
plt.title("Permutation Importance (test set)")
fig.tight_layout()
plt.show()