I am reducing the dimensionality of a Spark DataFrame with PCA model with pyspark (using the spark ml library) as follows:

pca = PCA(k=3, inputCol="features", outputCol="pca_features")
model = pca.fit(data)

where data is a Spark DataFrame with one column labeled features which is a DenseVector of 3 dimensions:

Row(features=DenseVector([0.4536,-0.43218, 0.9876]), label=u'class1')

After fitting, I transform the data:

transformed = model.transform(data)
Row(features=DenseVector([0.4536,-0.43218, 0.9876]), label=u'class1', pca_features=DenseVector([-0.33256, 0.8668, 0.625]))

How can I extract the eigenvectors of this PCA? How can I calculate how much variance they are explaining?


[UPDATE: From Spark 2.2 onwards, PCA and SVD are both available in PySpark - see JIRA ticket SPARK-6227 and PCA & PCAModel for Spark ML 2.2; original answer below is still applicable for older Spark versions.]

Well, it seems incredible, but indeed there is not a way to extract such information from a PCA decomposition (at least as of Spark 1.5). But again, there have been many similar "complaints" - see here, for example, for not being able to extract the best parameters from a CrossValidatorModel.

Fortunately, some months ago, I attended the 'Scalable Machine Learning' MOOC by AMPLab (Berkeley) & Databricks, i.e. the creators of Spark, where we implemented a full PCA pipeline 'by hand' as part of the homework assignments. I have modified my functions from back then (rest assured, I got full credit :-), so as to work with dataframes as inputs (instead of RDD's), of the same format as yours (i.e. Rows of DenseVectors containing the numerical features).

We first need to define an intermediate function, estimatedCovariance, as follows:

import numpy as np

def estimateCovariance(df):
    """Compute the covariance matrix for a given dataframe.

        The multi-dimensional covariance array should be calculated using outer products.  Don't
        forget to normalize the data by first subtracting the mean.

        df:  A Spark dataframe with a column named 'features', which (column) consists of DenseVectors.

        np.ndarray: A multi-dimensional array where the number of rows and columns both equal the
            length of the arrays in the input dataframe.
    m = df.select(df['features']).map(lambda x: x[0]).mean()
    dfZeroMean = df.select(df['features']).map(lambda x:   x[0]).map(lambda x: x-m)  # subtract the mean

    return dfZeroMean.map(lambda x: np.outer(x,x)).sum()/df.count()

Then, we can write a main pca function as follows:

from numpy.linalg import eigh

def pca(df, k=2):
    """Computes the top `k` principal components, corresponding scores, and all eigenvalues.

        All eigenvalues should be returned in sorted order (largest to smallest). `eigh` returns
        each eigenvectors as a column.  This function should also return eigenvectors as columns.

        df: A Spark dataframe with a 'features' column, which (column) consists of DenseVectors.
        k (int): The number of principal components to return.

        tuple of (np.ndarray, RDD of np.ndarray, np.ndarray): A tuple of (eigenvectors, `RDD` of
        scores, eigenvalues).  Eigenvectors is a multi-dimensional array where the number of
        rows equals the length of the arrays in the input `RDD` and the number of columns equals
        `k`.  The `RDD` of scores has the same number of rows as `data` and consists of arrays
        of length `k`.  Eigenvalues is an array of length d (the number of features).
    cov = estimateCovariance(df)
    col = cov.shape[1]
    eigVals, eigVecs = eigh(cov)
    inds = np.argsort(eigVals)
    eigVecs = eigVecs.T[inds[-1:-(col+1):-1]]  
    components = eigVecs[0:k]
    eigVals = eigVals[inds[-1:-(col+1):-1]]  # sort eigenvals
    score = df.select(df['features']).map(lambda x: x[0]).map(lambda x: np.dot(x, components.T) )
    # Return the `k` principal components, `k` scores, and all eigenvalues

    return components.T, score, eigVals


Let's see first the results with the existing method, using the example data from the Spark ML PCA documentation (modifying them so as to be all DenseVectors):

 from pyspark.ml.feature import *
 from pyspark.mllib.linalg import Vectors
 data = [(Vectors.dense([0.0, 1.0, 0.0, 7.0, 0.0]),),
         (Vectors.dense([2.0, 0.0, 3.0, 4.0, 5.0]),),
         (Vectors.dense([4.0, 0.0, 0.0, 6.0, 7.0]),)]
 df = sqlContext.createDataFrame(data,["features"])
 pca_extracted = PCA(k=2, inputCol="features", outputCol="pca_features")
 model = pca_extracted.fit(df)

 [Row(features=DenseVector([0.0, 1.0, 0.0, 7.0, 0.0]), pca_features=DenseVector([1.6486, -4.0133])),
  Row(features=DenseVector([2.0, 0.0, 3.0, 4.0, 5.0]), pca_features=DenseVector([-4.6451, -1.1168])),
  Row(features=DenseVector([4.0, 0.0, 0.0, 6.0, 7.0]), pca_features=DenseVector([-6.4289, -5.338]))]

Then, with our method:

 comp, score, eigVals = pca(df)

 [array([ 1.64857282,  4.0132827 ]),
  array([-4.64510433,  1.11679727]),
  array([-6.42888054,  5.33795143])]

Let me stress that we don't use any collect() methods in the functions we have defined - score is an RDD, as it should be.

Notice that the signs of our second column are all opposite from the ones derived by the existing method; but this is not an issue: according to the (freely downloadable) An Introduction to Statistical Learning, co-authored by Hastie & Tibshirani, p. 382

Each principal component loading vector is unique, up to a sign flip. This means that two different software packages will yield the same principal component loading vectors, although the signs of those loading vectors may differ. The signs may differ because each principal component loading vector specifies a direction in p-dimensional space: flipping the sign has no effect as the direction does not change. [...] Similarly, the score vectors are unique up to a sign flip, since the variance of Z is the same as the variance of −Z.

Finally, now that we have the eigenvalues available, it is trivial to write a function for the percentage of the variance explained:

 def varianceExplained(df, k=1):
     """Calculate the fraction of variance explained by the top `k` eigenvectors.

         df: A Spark dataframe with a 'features' column, which (column) consists of DenseVectors.
         k: The number of principal components to consider.

         float: A number between 0 and 1 representing the percentage of variance explained
             by the top `k` eigenvectors.
     components, scores, eigenvalues = pca(df, k)  
     return sum(eigenvalues[0:k])/sum(eigenvalues)

 # 0.79439325322305299

As a test, we also check if the variance explained in our example data is 1.0, for k=5 (since the original data are 5-dimensional):

 # 1.0

[Developed & tested with Spark 1.5.0 & 1.5.1]



PCA and SVD are finally both available in pyspark starting spark 2.2.0 according to this resolved JIRA ticket SPARK-6227.

Original answer:

The answer given by @desertnaut is actually excellent from a theoretical perspective, but I wanted to present another approach on how to compute the SVD and to extract then eigenvectors.

from pyspark.mllib.common import callMLlibFunc, JavaModelWrapper
from pyspark.mllib.linalg.distributed import RowMatrix

class SVD(JavaModelWrapper):
    """Wrapper around the SVD scala case class"""
    def U(self):
        """ Returns a RowMatrix whose columns are the left singular vectors of the SVD if computeU was set to be True."""
        u = self.call("U")
        if u is not None:
        return RowMatrix(u)

    def s(self):
        """Returns a DenseVector with singular values in descending order."""
        return self.call("s")

    def V(self):
        """ Returns a DenseMatrix whose columns are the right singular vectors of the SVD."""
        return self.call("V")

This defines our SVD object. We can define now our computeSVD method using the Java Wrapper.

def computeSVD(row_matrix, k, computeU=False, rCond=1e-9):
    Computes the singular value decomposition of the RowMatrix.
    The given row matrix A of dimension (m X n) is decomposed into U * s * V'T where
    * s: DenseVector consisting of square root of the eigenvalues (singular values) in descending order.
    * U: (m X k) (left singular vectors) is a RowMatrix whose columns are the eigenvectors of (A X A')
    * v: (n X k) (right singular vectors) is a Matrix whose columns are the eigenvectors of (A' X A)
    :param k: number of singular values to keep. We might return less than k if there are numerically zero singular values.
    :param computeU: Whether of not to compute U. If set to be True, then U is computed by A * V * sigma^-1
    :param rCond: the reciprocal condition number. All singular values smaller than rCond * sigma(0) are treated as zero, where sigma(0) is the largest singular value.
    :returns: SVD object
    java_model = row_matrix._java_matrix_wrapper.call("computeSVD", int(k), computeU, float(rCond))
    return SVD(java_model)

Now, let's apply that to an example :

from pyspark.ml.feature import *
from pyspark.mllib.linalg import Vectors

data = [(Vectors.dense([0.0, 1.0, 0.0, 7.0, 0.0]),), (Vectors.dense([2.0, 0.0, 3.0, 4.0, 5.0]),), (Vectors.dense([4.0, 0.0, 0.0, 6.0, 7.0]),)]
df = sqlContext.createDataFrame(data,["features"])

pca_extracted = PCA(k=2, inputCol="features", outputCol="pca_features")

model = pca_extracted.fit(df)
features = model.transform(df) # this create a DataFrame with the regular features and pca_features

# We can now extract the pca_features to prepare our RowMatrix.
pca_features = features.select("pca_features").rdd.map(lambda row : row[0])
mat = RowMatrix(pca_features)

# Once the RowMatrix is ready we can compute our Singular Value Decomposition
svd = computeSVD(mat,2,True)
# DenseVector([9.491, 4.6253])
# [DenseVector([0.1129, -0.909]), DenseVector([0.463, 0.4055]), DenseVector([0.8792, -0.0968])]
# DenseMatrix(2, 2, [-0.8025, -0.5967, -0.5967, 0.8025], 0)
  • 1
    Have you thought about PR?
    – zero323
    Feb 13 '16 at 1:08
  • @zero323 Yes, but there seems to be already a PR on it if I'm not mistaken.
    – eliasah
    Feb 13 '16 at 6:39
  • 1
    @zero323 Have a look at this issue I opened based on the question, and the related PR issues.apache.org/jira/browse/SPARK-11530
    – desertnaut
    Feb 21 '16 at 0:33

In spark 2.2+ you can now easily get the explained variance as:

from pyspark.ml.feature import VectorAssembler
assembler = VectorAssembler(inputCols=<columns of your original dataframe>, outputCol="features")
df = assembler.transform(<your original dataframe>).select("features")
from pyspark.ml.feature import PCA
pca = PCA(k=10, inputCol="features", outputCol="pcaFeatures")
model = pca.fit(df)
  • Sorry on down voting, the question is more on how to identify the columns with their explainedVariance than extracting the explainedVariance alone; it's not something which is straight forward from the question, but I'm pretty sure that that's the purpose. Feb 7 '20 at 23:35

The easiest answer to your question is to input an identity matrix to your model.

identity_input = [(Vectors.dense([1.0, .0, 0.0, .0, 0.0]),),(Vectors.dense([.0, 1.0, .0, .0, .0]),), \
              (Vectors.dense([.0, 0.0, 1.0, .0, .0]),),(Vectors.dense([.0, 0.0, .0, 1.0, .0]),),
              (Vectors.dense([.0, 0.0, .0, .0, 1.0]),)]
df_identity = sqlContext.createDataFrame(identity_input,["features"])
identity_features = model.transform(df_identity)

This should give you principle components.

I think eliasah's answer is better in terms of Spark framework because desertnaut is solving the problem by using numpy's functions instead of Spark's actions. However, eliasah's answer is missing normalizing the data. So, I'd add the following lines to eliasah's answer:

from pyspark.ml.feature import StandardScaler
standardizer = StandardScaler(withMean=True, withStd=False,
model = standardizer.fit(df)
output = model.transform(df)
pca_features = output.select("std_features").rdd.map(lambda row : row[0])
mat = RowMatrix(pca_features)
svd = computeSVD(mat,5,True)

Evantually, svd.V and identity_features.select("pca_features").collect() should have identical values.

I have summarized PCA and its use in Spark and sklearn in this blog post.

  • Thank you for not mentioning me in your paper ! I believe that is the code from my answer.
    – eliasah
    Aug 19 '16 at 14:30
  • I cited your code giving the link in the comment. Plus I don't know your name. If you want me to put another type of acknowledgement, let me know. Also, this is not a paper. This is just a write up I prepared with a friend to help people understand things. Aug 20 '16 at 20:49
  • Still I'd rather be cited when my work is involved. I'd do the same if I'd use yours. It's part of the community collaboration rules and also StackOverflow Licence. You can also see my contact details in my SO profile. I'm usually very friendly ;-)
    – eliasah
    Aug 20 '16 at 20:53
  • Alright. I'll update the write-up and re-share. thanks for heads up. Aug 21 '16 at 21:51

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