"""
================================
Gaussian Mixture Model Selection
================================
This example shows that model selection can be performed with Gaussian Mixture
Models (GMM) using :ref:`information-theory criteria `. Model selection
concerns both the covariance type and the number of components in the model.
In this case, both the Akaike Information Criterion (AIC) and the Bayes
Information Criterion (BIC) provide the right result, but we only demo the
latter as BIC is better suited to identify the true model among a set of
candidates. Unlike Bayesian procedures, such inferences are prior-free.
"""
# %%
# Data generation
# ---------------
#
# We generate two components (each one containing `n_samples`) by randomly
# sampling the standard normal distribution as returned by `numpy.random.randn`.
# One component is kept spherical yet shifted and re-scaled. The other one is
# deformed to have a more general covariance matrix.
import numpy as np
n_samples = 500
np.random.seed(0)
C = np.array([[0.0, -0.1], [1.7, 0.4]])
component_1 = np.dot(np.random.randn(n_samples, 2), C) # general
component_2 = 0.7 * np.random.randn(n_samples, 2) + np.array([-4, 1]) # spherical
X = np.concatenate([component_1, component_2])
# %%
# We can visualize the different components:
import matplotlib.pyplot as plt
plt.scatter(component_1[:, 0], component_1[:, 1], s=0.8)
plt.scatter(component_2[:, 0], component_2[:, 1], s=0.8)
plt.title("Gaussian Mixture components")
plt.axis("equal")
plt.show()
# %%
# Model training and selection
# ----------------------------
#
# We vary the number of components from 1 to 6 and the type of covariance
# parameters to use:
#
# - `"full"`: each component has its own general covariance matrix.
# - `"tied"`: all components share the same general covariance matrix.
# - `"diag"`: each component has its own diagonal covariance matrix.
# - `"spherical"`: each component has its own single variance.
#
# We score the different models and keep the best model (the lowest BIC). This
# is done by using :class:`~sklearn.model_selection.GridSearchCV` and a
# user-defined score function which returns the negative BIC score, as
# :class:`~sklearn.model_selection.GridSearchCV` is designed to **maximize** a
# score (maximizing the negative BIC is equivalent to minimizing the BIC).
#
# The best set of parameters and estimator are stored in `best_parameters_` and
# `best_estimator_`, respectively.
from sklearn.mixture import GaussianMixture
from sklearn.model_selection import GridSearchCV
def gmm_bic_score(estimator, X):
"""Callable to pass to GridSearchCV that will use the BIC score."""
# Make it negative since GridSearchCV expects a score to maximize
return -estimator.bic(X)
param_grid = {
"n_components": range(1, 7),
"covariance_type": ["spherical", "tied", "diag", "full"],
}
grid_search = GridSearchCV(
GaussianMixture(), param_grid=param_grid, scoring=gmm_bic_score
)
grid_search.fit(X)
# %%
# Plot the BIC scores
# -------------------
#
# To ease the plotting we can create a `pandas.DataFrame` from the results of
# the cross-validation done by the grid search. We re-inverse the sign of the
# BIC score to show the effect of minimizing it.
import pandas as pd
df = pd.DataFrame(grid_search.cv_results_)[
["param_n_components", "param_covariance_type", "mean_test_score"]
]
df["mean_test_score"] = -df["mean_test_score"]
df = df.rename(
columns={
"param_n_components": "Number of components",
"param_covariance_type": "Type of covariance",
"mean_test_score": "BIC score",
}
)
df.sort_values(by="BIC score").head()
# %%
import seaborn as sns
sns.catplot(
data=df,
kind="bar",
x="Number of components",
y="BIC score",
hue="Type of covariance",
)
plt.show()
# %%
# In the present case, the model with 2 components and full covariance (which
# corresponds to the true generative model) has the lowest BIC score and is
# therefore selected by the grid search.
#
# Plot the best model
# -------------------
#
# We plot an ellipse to show each Gaussian component of the selected model. For
# such purpose, one needs to find the eigenvalues of the covariance matrices as
# returned by the `covariances_` attribute. The shape of such matrices depends
# on the `covariance_type`:
#
# - `"full"`: (`n_components`, `n_features`, `n_features`)
# - `"tied"`: (`n_features`, `n_features`)
# - `"diag"`: (`n_components`, `n_features`)
# - `"spherical"`: (`n_components`,)
from matplotlib.patches import Ellipse
from scipy import linalg
color_iter = sns.color_palette("tab10", 2)[::-1]
Y_ = grid_search.predict(X)
fig, ax = plt.subplots()
for i, (mean, cov, color) in enumerate(
zip(
grid_search.best_estimator_.means_,
grid_search.best_estimator_.covariances_,
color_iter,
)
):
v, w = linalg.eigh(cov)
if not np.any(Y_ == i):
continue
plt.scatter(X[Y_ == i, 0], X[Y_ == i, 1], 0.8, color=color)
angle = np.arctan2(w[0][1], w[0][0])
angle = 180.0 * angle / np.pi # convert to degrees
v = 2.0 * np.sqrt(2.0) * np.sqrt(v)
ellipse = Ellipse(mean, v[0], v[1], angle=180.0 + angle, color=color)
ellipse.set_clip_box(fig.bbox)
ellipse.set_alpha(0.5)
ax.add_artist(ellipse)
plt.title(
f"Selected GMM: {grid_search.best_params_['covariance_type']} model, "
f"{grid_search.best_params_['n_components']} components"
)
plt.axis("equal")
plt.show()