Feature/Variable importance after a PCA analysis
Question:
I have performed a PCA analysis over my original dataset and from the compressed dataset transformed by the PCA I have also selected the number of PC I want to keep (they explain almost the 94% of the variance). Now I am struggling with the identification of the original features that are important in the reduced dataset.
How do I find out which feature is important and which is not among the remaining Principal Components after the dimension reduction?
Here is my code:
from sklearn.decomposition import PCA
pca = PCA(n_components=8)
pca.fit(scaledDataset)
projection = pca.transform(scaledDataset)
Furthermore, I tried also to perform a clustering algorithm on the reduced dataset but surprisingly for me, the score is lower than on the original dataset. How is it possible?
Answers:
First of all, I assume that you call features the variables and not the samples/observations. In this case, you could do something like the following by creating a biplot function that shows everything in one plot. In this example, I am using the iris data.
Before the example, please note that the basic idea when using PCA as a tool for feature selection is to select variables according to the magnitude (from largest to smallest in absolute values) of their coefficients (loadings). See my last paragraph after the plot for more details.
Overview:
PART1: I explain how to check the importance of the features and how to plot a biplot.
PART2: I explain how to check the importance of the features and how to save them into a pandas dataframe using the feature names.
PART 1:
import numpy as np
import matplotlib.pyplot as plt
from sklearn import datasets
from sklearn.decomposition import PCA
import pandas as pd
from sklearn.preprocessing import StandardScaler
iris = datasets.load_iris()
X = iris.data
y = iris.target
#In general a good idea is to scale the data
scaler = StandardScaler()
scaler.fit(X)
X=scaler.transform(X)
pca = PCA()
x_new = pca.fit_transform(X)
def myplot(score,coeff,labels=None):
xs = score[:,0]
ys = score[:,1]
n = coeff.shape[0]
scalex = 1.0/(xs.max() - xs.min())
scaley = 1.0/(ys.max() - ys.min())
plt.scatter(xs * scalex,ys * scaley, c = y)
for i in range(n):
plt.arrow(0, 0, coeff[i,0], coeff[i,1],color = 'r',alpha = 0.5)
if labels is None:
plt.text(coeff[i,0]* 1.15, coeff[i,1] * 1.15, "Var"+str(i+1), color = 'g', ha = 'center', va = 'center')
else:
plt.text(coeff[i,0]* 1.15, coeff[i,1] * 1.15, labels[i], color = 'g', ha = 'center', va = 'center')
plt.xlim(-1,1)
plt.ylim(-1,1)
plt.xlabel("PC{}".format(1))
plt.ylabel("PC{}".format(2))
plt.grid()
#Call the function. Use only the 2 PCs.
myplot(x_new[:,0:2],np.transpose(pca.components_[0:2, :]))
plt.show()
Visualize what’s going on using the biplot
Now, the importance of each feature is reflected by the magnitude of the corresponding values in the eigenvectors (higher magnitude – higher importance)
Let’s see first what amount of variance does each PC explain.
pca.explained_variance_ratio_
[0.72770452, 0.23030523, 0.03683832, 0.00515193]
PC1 explains 72% and PC2 23%. Together, if we keep PC1 and PC2 only, they explain 95%.
Now, let’s find the most important features.
print(abs( pca.components_ ))
[[0.52237162 0.26335492 0.58125401 0.56561105]
[0.37231836 0.92555649 0.02109478 0.06541577]
[0.72101681 0.24203288 0.14089226 0.6338014 ]
[0.26199559 0.12413481 0.80115427 0.52354627]]
Here, pca.components_ has shape [n_components, n_features]. Thus, by looking at the PC1 (First Principal Component) which is the first row: [0.52237162 0.26335492 0.58125401 0.56561105]] we can conclude that feature 1, 3 and 4 (or Var 1, 3 and 4 in the biplot) are the most important. This is also clearly visible from the biplot (that’s why we often use this plot to summarize the information in a visual way).
To sum up, look at the absolute values of the Eigenvectors’ components corresponding to the k largest Eigenvalues. In sklearn the components are sorted by explained_variance_. The larger they are these absolute values, the more a specific feature contributes to that principal component.
PART 2:
The important features are the ones that influence more the components and thus, have a large absolute value/score on the component.
To get the most important features on the PCs with names and save them into a pandas dataframe use this:
from sklearn.decomposition import PCA
import pandas as pd
import numpy as np
np.random.seed(0)
# 10 samples with 5 features
train_features = np.random.rand(10,5)
model = PCA(n_components=2).fit(train_features)
X_pc = model.transform(train_features)
# number of components
n_pcs= model.components_.shape[0]
# get the index of the most important feature on EACH component
# LIST COMPREHENSION HERE
most_important = [np.abs(model.components_[i]).argmax() for i in range(n_pcs)]
initial_feature_names = ['a','b','c','d','e']
# get the names
most_important_names = [initial_feature_names[most_important[i]] for i in range(n_pcs)]
# LIST COMPREHENSION HERE AGAIN
dic = {'PC{}'.format(i): most_important_names[i] for i in range(n_pcs)}
# build the dataframe
df = pd.DataFrame(dic.items())
This prints:
0 1
0 PC0 e
1 PC1 d
So on the PC1 the feature named e is the most important and on PC2 the d.
Nice article as well here: https://towardsdatascience.com/pca-clearly-explained-how-when-why-to-use-it-and-feature-importance-a-guide-in-python-7c274582c37e?source=friends_link&sk=65bf5440e444c24aff192fedf9f8b64f
# original_num_df the original numeric dataframe
# pca is the model
def create_importance_dataframe(pca, original_num_df):
# Change pcs components ndarray to a dataframe
importance_df = pd.DataFrame(pca.components_)
# Assign columns
importance_df.columns = original_num_df.columns
# Change to absolute values
importance_df =importance_df.apply(np.abs)
# Transpose
importance_df=importance_df.transpose()
# Change column names again
## First get number of pcs
num_pcs = importance_df.shape[1]
## Generate the new column names
new_columns = [f'PC{i}' for i in range(1, num_pcs + 1)]
## Now rename
importance_df.columns =new_columns
# Return importance df
return importance_df
# Call function to create importance df
importance_df =create_importance_dataframe(pca, original_num_df)
# Show first few rows
display(importance_df.head())
# Sort depending on PC of interest
## PC1 top 10 important features
pc1_top_10_features = importance_df['PC1'].sort_values(ascending = False)[:10]
print(), print(f'PC1 top 10 feautres are n')
display(pc1_top_10_features )
## PC2 top 10 important features
pc2_top_10_features = importance_df['PC2'].sort_values(ascending = False)[:10]
print(), print(f'PC2 top 10 feautres are n')
display(pc2_top_10_features )
the pca library contains this functionality.
pip install pca
A demonstration to extract the feature importance is as following:
# Import libraries
import numpy as np
import pandas as pd
from pca import pca
# Lets create a dataset with features that have decreasing variance.
# We want to extract feature f1 as most important, followed by f2 etc
f1=np.random.randint(0,100,250)
f2=np.random.randint(0,50,250)
f3=np.random.randint(0,25,250)
f4=np.random.randint(0,10,250)
f5=np.random.randint(0,5,250)
f6=np.random.randint(0,4,250)
f7=np.random.randint(0,3,250)
f8=np.random.randint(0,2,250)
f9=np.random.randint(0,1,250)
# Combine into dataframe
X = np.c_[f1,f2,f3,f4,f5,f6,f7,f8,f9]
X = pd.DataFrame(data=X, columns=['f1','f2','f3','f4','f5','f6','f7','f8','f9'])
# Initialize
model = pca()
# Fit transform
out = model.fit_transform(X)
# Print the top features. The results show that f1 is best, followed by f2 etc
print(out['topfeat'])
# PC feature
# 0 PC1 f1
# 1 PC2 f2
# 2 PC3 f3
# 3 PC4 f4
# 4 PC5 f5
# 5 PC6 f6
# 6 PC7 f7
# 7 PC8 f8
# 8 PC9 f9
Plot the explained variance
model.plot()
Make the biplot. It can be nicely seen that the first feature with most variance (f1), is almost horizontal in the plot, whereas the second most variance (f2) is almost vertical. This is expected because most of the variance is in f1, followed by f2 etc.
ax = model.biplot(n_feat=10, legend=False)
Biplot in 3d. Here we see the nice addition of the expected f3 in the plot in the z-direction.
ax = model.biplot3d(n_feat=10, legend=False)
I have performed a PCA analysis over my original dataset and from the compressed dataset transformed by the PCA I have also selected the number of PC I want to keep (they explain almost the 94% of the variance). Now I am struggling with the identification of the original features that are important in the reduced dataset.
How do I find out which feature is important and which is not among the remaining Principal Components after the dimension reduction?
Here is my code:
from sklearn.decomposition import PCA
pca = PCA(n_components=8)
pca.fit(scaledDataset)
projection = pca.transform(scaledDataset)
Furthermore, I tried also to perform a clustering algorithm on the reduced dataset but surprisingly for me, the score is lower than on the original dataset. How is it possible?
First of all, I assume that you call features the variables and not the samples/observations. In this case, you could do something like the following by creating a biplot function that shows everything in one plot. In this example, I am using the iris data.
Before the example, please note that the basic idea when using PCA as a tool for feature selection is to select variables according to the magnitude (from largest to smallest in absolute values) of their coefficients (loadings). See my last paragraph after the plot for more details.
Overview:
PART1: I explain how to check the importance of the features and how to plot a biplot.
PART2: I explain how to check the importance of the features and how to save them into a pandas dataframe using the feature names.
PART 1:
import numpy as np
import matplotlib.pyplot as plt
from sklearn import datasets
from sklearn.decomposition import PCA
import pandas as pd
from sklearn.preprocessing import StandardScaler
iris = datasets.load_iris()
X = iris.data
y = iris.target
#In general a good idea is to scale the data
scaler = StandardScaler()
scaler.fit(X)
X=scaler.transform(X)
pca = PCA()
x_new = pca.fit_transform(X)
def myplot(score,coeff,labels=None):
xs = score[:,0]
ys = score[:,1]
n = coeff.shape[0]
scalex = 1.0/(xs.max() - xs.min())
scaley = 1.0/(ys.max() - ys.min())
plt.scatter(xs * scalex,ys * scaley, c = y)
for i in range(n):
plt.arrow(0, 0, coeff[i,0], coeff[i,1],color = 'r',alpha = 0.5)
if labels is None:
plt.text(coeff[i,0]* 1.15, coeff[i,1] * 1.15, "Var"+str(i+1), color = 'g', ha = 'center', va = 'center')
else:
plt.text(coeff[i,0]* 1.15, coeff[i,1] * 1.15, labels[i], color = 'g', ha = 'center', va = 'center')
plt.xlim(-1,1)
plt.ylim(-1,1)
plt.xlabel("PC{}".format(1))
plt.ylabel("PC{}".format(2))
plt.grid()
#Call the function. Use only the 2 PCs.
myplot(x_new[:,0:2],np.transpose(pca.components_[0:2, :]))
plt.show()
Visualize what’s going on using the biplot
Now, the importance of each feature is reflected by the magnitude of the corresponding values in the eigenvectors (higher magnitude – higher importance)
Let’s see first what amount of variance does each PC explain.
pca.explained_variance_ratio_
[0.72770452, 0.23030523, 0.03683832, 0.00515193]
PC1 explains 72% and PC2 23%. Together, if we keep PC1 and PC2 only, they explain 95%.
Now, let’s find the most important features.
print(abs( pca.components_ ))
[[0.52237162 0.26335492 0.58125401 0.56561105]
[0.37231836 0.92555649 0.02109478 0.06541577]
[0.72101681 0.24203288 0.14089226 0.6338014 ]
[0.26199559 0.12413481 0.80115427 0.52354627]]
Here, pca.components_ has shape [n_components, n_features]. Thus, by looking at the PC1 (First Principal Component) which is the first row: [0.52237162 0.26335492 0.58125401 0.56561105]] we can conclude that feature 1, 3 and 4 (or Var 1, 3 and 4 in the biplot) are the most important. This is also clearly visible from the biplot (that’s why we often use this plot to summarize the information in a visual way).
To sum up, look at the absolute values of the Eigenvectors’ components corresponding to the k largest Eigenvalues. In sklearn the components are sorted by explained_variance_. The larger they are these absolute values, the more a specific feature contributes to that principal component.
PART 2:
The important features are the ones that influence more the components and thus, have a large absolute value/score on the component.
To get the most important features on the PCs with names and save them into a pandas dataframe use this:
from sklearn.decomposition import PCA
import pandas as pd
import numpy as np
np.random.seed(0)
# 10 samples with 5 features
train_features = np.random.rand(10,5)
model = PCA(n_components=2).fit(train_features)
X_pc = model.transform(train_features)
# number of components
n_pcs= model.components_.shape[0]
# get the index of the most important feature on EACH component
# LIST COMPREHENSION HERE
most_important = [np.abs(model.components_[i]).argmax() for i in range(n_pcs)]
initial_feature_names = ['a','b','c','d','e']
# get the names
most_important_names = [initial_feature_names[most_important[i]] for i in range(n_pcs)]
# LIST COMPREHENSION HERE AGAIN
dic = {'PC{}'.format(i): most_important_names[i] for i in range(n_pcs)}
# build the dataframe
df = pd.DataFrame(dic.items())
This prints:
0 1
0 PC0 e
1 PC1 d
So on the PC1 the feature named e is the most important and on PC2 the d.
Nice article as well here: https://towardsdatascience.com/pca-clearly-explained-how-when-why-to-use-it-and-feature-importance-a-guide-in-python-7c274582c37e?source=friends_link&sk=65bf5440e444c24aff192fedf9f8b64f
# original_num_df the original numeric dataframe
# pca is the model
def create_importance_dataframe(pca, original_num_df):
# Change pcs components ndarray to a dataframe
importance_df = pd.DataFrame(pca.components_)
# Assign columns
importance_df.columns = original_num_df.columns
# Change to absolute values
importance_df =importance_df.apply(np.abs)
# Transpose
importance_df=importance_df.transpose()
# Change column names again
## First get number of pcs
num_pcs = importance_df.shape[1]
## Generate the new column names
new_columns = [f'PC{i}' for i in range(1, num_pcs + 1)]
## Now rename
importance_df.columns =new_columns
# Return importance df
return importance_df
# Call function to create importance df
importance_df =create_importance_dataframe(pca, original_num_df)
# Show first few rows
display(importance_df.head())
# Sort depending on PC of interest
## PC1 top 10 important features
pc1_top_10_features = importance_df['PC1'].sort_values(ascending = False)[:10]
print(), print(f'PC1 top 10 feautres are n')
display(pc1_top_10_features )
## PC2 top 10 important features
pc2_top_10_features = importance_df['PC2'].sort_values(ascending = False)[:10]
print(), print(f'PC2 top 10 feautres are n')
display(pc2_top_10_features )
the pca library contains this functionality.
pip install pca
A demonstration to extract the feature importance is as following:
# Import libraries
import numpy as np
import pandas as pd
from pca import pca
# Lets create a dataset with features that have decreasing variance.
# We want to extract feature f1 as most important, followed by f2 etc
f1=np.random.randint(0,100,250)
f2=np.random.randint(0,50,250)
f3=np.random.randint(0,25,250)
f4=np.random.randint(0,10,250)
f5=np.random.randint(0,5,250)
f6=np.random.randint(0,4,250)
f7=np.random.randint(0,3,250)
f8=np.random.randint(0,2,250)
f9=np.random.randint(0,1,250)
# Combine into dataframe
X = np.c_[f1,f2,f3,f4,f5,f6,f7,f8,f9]
X = pd.DataFrame(data=X, columns=['f1','f2','f3','f4','f5','f6','f7','f8','f9'])
# Initialize
model = pca()
# Fit transform
out = model.fit_transform(X)
# Print the top features. The results show that f1 is best, followed by f2 etc
print(out['topfeat'])
# PC feature
# 0 PC1 f1
# 1 PC2 f2
# 2 PC3 f3
# 3 PC4 f4
# 4 PC5 f5
# 5 PC6 f6
# 6 PC7 f7
# 7 PC8 f8
# 8 PC9 f9
Plot the explained variance
model.plot()
Make the biplot. It can be nicely seen that the first feature with most variance (f1), is almost horizontal in the plot, whereas the second most variance (f2) is almost vertical. This is expected because most of the variance is in f1, followed by f2 etc.
ax = model.biplot(n_feat=10, legend=False)
Biplot in 3d. Here we see the nice addition of the expected f3 in the plot in the z-direction.
ax = model.biplot3d(n_feat=10, legend=False)