Note
Go to the end to download the full example code or to run this example in your browser via JupyterLite or Binder
Blind source separation using FastICA#
An example of estimating sources from noisy data.
Independent component analysis (ICA) is used to estimate sources given noisy measurements.
Imagine 3 instruments playing simultaneously and 3 microphones
recording the mixed signals. ICA is used to recover the sources
ie. what is played by each instrument. Importantly, PCA fails
at recovering our instruments
since the related signals reflect
non-Gaussian processes.
Generate sample data#
import numpy as np
from scipy import signal
np.random.seed(0)
n_samples = 2000
time = np.linspace(0, 8, n_samples)
s1 = np.sin(2 * time) # Signal 1 : sinusoidal signal
s2 = np.sign(np.sin(3 * time)) # Signal 2 : square signal
s3 = signal.sawtooth(2 * np.pi * time) # Signal 3: saw tooth signal
S = np.c_[s1, s2, s3]
S += 0.2 * np.random.normal(size=S.shape) # Add noise
S /= S.std(axis=0) # Standardize data
# Mix data
A = np.array([[1, 1, 1], [0.5, 2, 1.0], [1.5, 1.0, 2.0]]) # Mixing matrix
X = np.dot(S, A.T) # Generate observations
Fit ICA and PCA models#
from sklearn.decomposition import PCA, FastICA
# Compute ICA
ica = FastICA(n_components=3, whiten="arbitrary-variance")
S_ = ica.fit_transform(X) # Reconstruct signals
A_ = ica.mixing_ # Get estimated mixing matrix
# We can `prove` that the ICA model applies by reverting the unmixing.
assert np.allclose(X, np.dot(S_, A_.T) + ica.mean_)
# For comparison, compute PCA
pca = PCA(n_components=3)
H = pca.fit_transform(X) # Reconstruct signals based on orthogonal components
Plot results#
import matplotlib.pyplot as plt
plt.figure()
models = [X, S, S_, H]
names = [
"Observations (mixed signal)",
"True Sources",
"ICA recovered signals",
"PCA recovered signals",
]
colors = ["red", "steelblue", "orange"]
for ii, (model, name) in enumerate(zip(models, names), 1):
plt.subplot(4, 1, ii)
plt.title(name)
for sig, color in zip(model.T, colors):
plt.plot(sig, color=color)
plt.tight_layout()
plt.show()
Total running time of the script: (0 minutes 0.325 seconds)
Related examples
Comparison of kernel ridge and Gaussian process regression
Sparse coding with a precomputed dictionary
Ability of Gaussian process regression (GPR) to estimate data noise-level