Note
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Compare BIRCH and MiniBatchKMeans¶
This example compares the timing of BIRCH (with and without the global clustering step) and MiniBatchKMeans on a synthetic dataset having 25,000 samples and 2 features generated using make_blobs.
Both MiniBatchKMeans
and BIRCH
are very scalable algorithms and could
run efficiently on hundreds of thousands or even millions of datapoints. We
chose to limit the dataset size of this example in the interest of keeping
our Continuous Integration resource usage reasonable but the interested
reader might enjoy editing this script to rerun it with a larger value for
n_samples
.
If n_clusters
is set to None, the data is reduced from 25,000
samples to a set of 158 clusters. This can be viewed as a preprocessing
step before the final (global) clustering step that further reduces these
158 clusters to 100 clusters.
BIRCH without global clustering as the final step took 0.54 seconds
n_clusters : 158
BIRCH with global clustering as the final step took 0.55 seconds
n_clusters : 100
Time taken to run MiniBatchKMeans 0.21 seconds
# Authors: Manoj Kumar <manojkumarsivaraj334@gmail.com
# Alexandre Gramfort <alexandre.gramfort@telecom-paristech.fr>
# License: BSD 3 clause
from itertools import cycle
from time import time
import matplotlib.colors as colors
import matplotlib.pyplot as plt
import numpy as np
from joblib import cpu_count
from sklearn.cluster import Birch, MiniBatchKMeans
from sklearn.datasets import make_blobs
# Generate centers for the blobs so that it forms a 10 X 10 grid.
xx = np.linspace(-22, 22, 10)
yy = np.linspace(-22, 22, 10)
xx, yy = np.meshgrid(xx, yy)
n_centers = np.hstack((np.ravel(xx)[:, np.newaxis], np.ravel(yy)[:, np.newaxis]))
# Generate blobs to do a comparison between MiniBatchKMeans and BIRCH.
X, y = make_blobs(n_samples=25000, centers=n_centers, random_state=0)
# Use all colors that matplotlib provides by default.
colors_ = cycle(colors.cnames.keys())
fig = plt.figure(figsize=(12, 4))
fig.subplots_adjust(left=0.04, right=0.98, bottom=0.1, top=0.9)
# Compute clustering with BIRCH with and without the final clustering step
# and plot.
birch_models = [
Birch(threshold=1.7, n_clusters=None),
Birch(threshold=1.7, n_clusters=100),
]
final_step = ["without global clustering", "with global clustering"]
for ind, (birch_model, info) in enumerate(zip(birch_models, final_step)):
t = time()
birch_model.fit(X)
print("BIRCH %s as the final step took %0.2f seconds" % (info, (time() - t)))
# Plot result
labels = birch_model.labels_
centroids = birch_model.subcluster_centers_
n_clusters = np.unique(labels).size
print("n_clusters : %d" % n_clusters)
ax = fig.add_subplot(1, 3, ind + 1)
for this_centroid, k, col in zip(centroids, range(n_clusters), colors_):
mask = labels == k
ax.scatter(X[mask, 0], X[mask, 1], c="w", edgecolor=col, marker=".", alpha=0.5)
if birch_model.n_clusters is None:
ax.scatter(this_centroid[0], this_centroid[1], marker="+", c="k", s=25)
ax.set_ylim([-25, 25])
ax.set_xlim([-25, 25])
ax.set_autoscaley_on(False)
ax.set_title("BIRCH %s" % info)
# Compute clustering with MiniBatchKMeans.
mbk = MiniBatchKMeans(
init="k-means++",
n_clusters=100,
batch_size=256 * cpu_count(),
n_init=10,
max_no_improvement=10,
verbose=0,
random_state=0,
)
t0 = time()
mbk.fit(X)
t_mini_batch = time() - t0
print("Time taken to run MiniBatchKMeans %0.2f seconds" % t_mini_batch)
mbk_means_labels_unique = np.unique(mbk.labels_)
ax = fig.add_subplot(1, 3, 3)
for this_centroid, k, col in zip(mbk.cluster_centers_, range(n_clusters), colors_):
mask = mbk.labels_ == k
ax.scatter(X[mask, 0], X[mask, 1], marker=".", c="w", edgecolor=col, alpha=0.5)
ax.scatter(this_centroid[0], this_centroid[1], marker="+", c="k", s=25)
ax.set_xlim([-25, 25])
ax.set_ylim([-25, 25])
ax.set_title("MiniBatchKMeans")
ax.set_autoscaley_on(False)
plt.show()
Total running time of the script: (0 minutes 3.642 seconds)
Related examples
Comparison of the K-Means and MiniBatchKMeans clustering algorithms
Empirical evaluation of the impact of k-means initialization
Comparing different clustering algorithms on toy datasets
Agglomerative clustering with different metrics
A demo of structured Ward hierarchical clustering on an image of coins