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I am looking for a function that takes as input two lists, and returns the Pearson correlation, and the significance of the correlation.

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11 Answers 11

You can have a look at scipy: http://docs.scipy.org/doc/scipy/reference/stats.html

from pydoc import help
from scipy.stats.stats import pearsonr

Help on function pearsonr in module scipy.stats.stats:

pearsonr(x, y)
 Calculates a Pearson correlation coefficient and the p-value for testing

 The Pearson correlation coefficient measures the linear relationship
 between two datasets. Strictly speaking, Pearson's correlation requires
 that each dataset be normally distributed. Like other correlation
 coefficients, this one varies between -1 and +1 with 0 implying no
 correlation. Correlations of -1 or +1 imply an exact linear
 relationship. Positive correlations imply that as x increases, so does
 y. Negative correlations imply that as x increases, y decreases.

 The p-value roughly indicates the probability of an uncorrelated system
 producing datasets that have a Pearson correlation at least as extreme
 as the one computed from these datasets. The p-values are not entirely
 reliable but are probably reasonable for datasets larger than 500 or so.

 x : 1D array
 y : 1D array the same length as x

 (Pearson's correlation coefficient,
  2-tailed p-value)

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How about correlation coefficient of two dictionaries ?! –  user702846 May 22 '13 at 23:49

If you don't feel like installing scipy, I've used this quick hack, slightly modified from Programming Collective Intelligence:

(Edited for correctness.)

from itertools import imap

def pearsonr(x, y):
  # Assume len(x) == len(y)
  n = len(x)
  sum_x = float(sum(x))
  sum_y = float(sum(y))
  sum_x_sq = sum(map(lambda x: pow(x, 2), x))
  sum_y_sq = sum(map(lambda x: pow(x, 2), y))
  psum = sum(imap(lambda x, y: x * y, x, y))
  num = psum - (sum_x * sum_y/n)
  den = pow((sum_x_sq - pow(sum_x, 2) / n) * (sum_y_sq - pow(sum_y, 2) / n), 0.5)
  if den == 0: return 0
  return num / den
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I was surprised to discover this disagrees with Excel, NumPy, and R. See stackoverflow.com/questions/3949226/…. –  dfrankow Oct 29 '11 at 13:48
As another commenter pointed out, this has a float/int bug. I think sum_y/n is integer division for ints. If you use sum_x = float(sum(x)) and sum_y = float(sum(y)), it works. –  dfrankow Oct 30 '11 at 20:05
@dfrankow I think it's because imap cannot handle float. python gives an TypeError: unsupported operand type(s) for -: 'itertools.imap' and 'float' at num = psum - (sum_x * sum_y/n) –  alvas Jan 24 '13 at 14:17
As a style note Python frowns on this unnecessary usage of map (in favor of list comprehensions) –  Maxim Khesin Nov 22 '13 at 20:58
Just as a comment, consider that libraries as scipy et al are developed by people knowing a lot of numerical analysis. This may avoid you a lot of common pitfalls (for instance, having very large and very little numbers in X or Y may result in catastrofic cancellation) –  geekazoid Sep 30 '14 at 22:28

The Pearson correlation can be calculated with numpy.

import numpy
numpy.corrcoef(list1, list2)[0, 1]
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The following code is a straight-up interpretation of the definition:

import math

def average(x):
    assert len(x) > 0
    return float(sum(x)) / len(x)

def pearson_def(x, y):
    assert len(x) == len(y)
    n = len(x)
    assert n > 0
    avg_x = average(x)
    avg_y = average(y)
    diffprod = 0
    xdiff2 = 0
    ydiff2 = 0
    for idx in range(n):
        xdiff = x[idx] - avg_x
        ydiff = y[idx] - avg_y
        diffprod += xdiff * ydiff
        xdiff2 += xdiff * xdiff
        ydiff2 += ydiff * ydiff

    return diffprod / math.sqrt(xdiff2 * ydiff2)


print pearson_def([1,2,3], [1,5,7])



This agrees with Excel, this calculator, SciPy (also NumPy), which return 0.981980506 and 0.9819805060619657, and 0.98198050606196574, respectively.


> cor( c(1,2,3), c(1,5,7))
[1] 0.9819805

EDIT: Fixed a bug pointed out by a commenter.

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Beware of the type of the variables! You have encountered an int/float problem. In sum(x) / len(x) you divide ints, not floats. So sum([1,5,7]) / len([1,5,7]) = 13 / 3 = 4, according to integer division (whereas you want 13. / 3. = 4.33...). To fix it rewrite this line as float(sum(x)) / float(len(x)) (one float suffices, as Python converts it automatically). –  Piotr Migdal Oct 30 '11 at 19:46
Thanks! Fixed.. –  dfrankow Oct 30 '11 at 20:05
Your code won't work for cases like: [10,10,10],[0,0,0] or [10,10],[10,0]. or even [10,10],[10,10] –  madCode May 18 '12 at 16:56
The correlation coefficient is not defined for any of those cases. Putting them into R returns "NA" for all three. –  dfrankow May 18 '12 at 17:55

Just for completeness, you can call R's statistical functions from Python using the rpy Python package. Probably overkill if all you want is the Pearson stat, but if you then want to go on and do lots of stats things that you can't find in the Python packages in other answers here, rpy might be the way to go.



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I'd recommend SciPy as mentioned in the other answers. But if you want stand-alone code, see How to compute correlation accurately.

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While this link may answer the question, it is better to include the essential parts of the answer here and provide the link for reference. Link-only answers can become invalid if the linked page changes. –  IanAuld Nov 22 '14 at 7:20

Here is an implementation for pearson correlation based on sparse vector. The vectors here are expressed as a list of tuples expressed as (index, value). The two sparse vectors can be of different length but over all vector size will have to be same. This is useful for text mining applications where the vector size is extremely large due to most features being bag of words and hence calculations are usually performed using sparse vectors.

def get_pearson_corelation(self, first_feature_vector=[], second_feature_vector=[], length_of_featureset=0):
    indexed_feature_dict = {}
    if first_feature_vector == [] or second_feature_vector == [] or length_of_featureset == 0:
        raise ValueError("Empty feature vectors or zero length of featureset in get_pearson_corelation")

    sum_a = sum(value for index, value in first_feature_vector)
    sum_b = sum(value for index, value in second_feature_vector)

    avg_a = float(sum_a) / length_of_featureset
    avg_b = float(sum_b) / length_of_featureset

    mean_sq_error_a = sqrt((sum((value - avg_a) ** 2 for index, value in first_feature_vector)) + ((
        length_of_featureset - len(first_feature_vector)) * ((0 - avg_a) ** 2)))
    mean_sq_error_b = sqrt((sum((value - avg_b) ** 2 for index, value in second_feature_vector)) + ((
        length_of_featureset - len(second_feature_vector)) * ((0 - avg_b) ** 2)))

    covariance_a_b = 0

    #calculate covariance for the sparse vectors
    for tuple in first_feature_vector:
        if len(tuple) != 2:
            raise ValueError("Invalid feature frequency tuple in featureVector: %s") % (tuple,)
        indexed_feature_dict[tuple[0]] = tuple[1]
    count_of_features = 0
    for tuple in second_feature_vector:
        count_of_features += 1
        if len(tuple) != 2:
            raise ValueError("Invalid feature frequency tuple in featureVector: %s") % (tuple,)
        if tuple[0] in indexed_feature_dict:
            covariance_a_b += ((indexed_feature_dict[tuple[0]] - avg_a) * (tuple[1] - avg_b))
            del (indexed_feature_dict[tuple[0]])
            covariance_a_b += (0 - avg_a) * (tuple[1] - avg_b)

    for index in indexed_feature_dict:
        count_of_features += 1
        covariance_a_b += (indexed_feature_dict[index] - avg_a) * (0 - avg_b)

    #adjust covariance with rest of vector with 0 value
    covariance_a_b += (length_of_featureset - count_of_features) * -avg_a * -avg_b

    if mean_sq_error_a == 0 or mean_sq_error_b == 0:
        return -1
        return float(covariance_a_b) / (mean_sq_error_a * mean_sq_error_b)

Unit tests:

def test_get_get_pearson_corelation(self):
    vector_a = [(1, 1), (2, 2), (3, 3)]
    vector_b = [(1, 1), (2, 5), (3, 7)]
    self.assertAlmostEquals(self.sim_calculator.get_pearson_corelation(vector_a, vector_b, 3), 0.981980506062, 3, None, None)

    vector_a = [(1, 1), (2, 2), (3, 3)]
    vector_b = [(1, 1), (2, 5), (3, 7), (4, 14)]
    self.assertAlmostEquals(self.sim_calculator.get_pearson_corelation(vector_a, vector_b, 5), -0.0137089240555, 3, None, None)
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Rather than rely on numpy/scipy, I think my answer should be the easiest to code and understand the steps in calculating the Pearson Correlation Coefficient (PCC) .

import math

# calculates the mean
def mean(x) 
    sum = 0.0
    for i in x:
         sum += i
    return sum / len(x) 

# calculates the sample standard deviation
def sampleStandardDeviation(x):
    sumv = 0.0
    for i in x:
         sumv += (i - mean(x))**2
    return math.sqrt(sumv/(len(x)-1))

# calculates the PCC using both the 2 functions above
def pearson(x,y):
    scorex = []
    scorey = []

    for i in x: 
        scorex.append((i - mean(x))/sampleStandardDeviation(x)) 

    for j in y:
        scorey.append((j - mean(y))/sampleStandardDeviation(y))

# multiplies both lists together into 1 list (hence zip) and sums the whole list   
    return (sum([i*j for i,j in zip(scorex,scorey)]))/(len(x)-1)

The significance of PCC is basically to show you how strongly correlated the two variables/lists are. It is important to note that the PCC value ranges from -1 to 1. A value between 0 to 1 denotes a positive correlation. Value of 0 = highest variation (no correlation whatsoever). A value between -1 to 0 denotes a negative correlation.

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You can simply load the data in a Pandas DataFrame which has method for calculating pairwise correlation on his columns. Here is a simple tutorial with real Investment Founds data.

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While this link may answer the question, it is better to include the essential parts of the answer here and provide the link for reference. Link-only answers can become invalid if the linked page changes. –  Andy Korneyev Nov 22 '14 at 7:37

Hmm, many of these responses have long and hard to read code...

I'd suggest using numpy with its nifty features when working with arrays:

import numpy as np
def pcc(X, Y):
   ''' Compute Pearson Correlation Coefficient. '''
   # Normalise X and Y
   X -= X.mean(0)
   Y -= Y.mean(0)
   # Standardise X and Y
   X /= X.std(0)
   Y /= Y.std(0)
   # Compute mean product
   return np.mean(X*Y)

# Using it on a random example
from random import random
X = np.array([random() for x in xrange(100)])
Y = np.array([random() for x in xrange(100)])
pcc(X, Y)
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You may wonder how to interpret your probability in the context of looking for a correlation in a particular direction (negative or positive correlation.) Here is a function I wrote to help with that. It might even be right!

It's based on info I gleaned from http://www.vassarstats.net/rsig.html and http://en.wikipedia.org/wiki/Student%27s_t_distribution, thanks to other answers posted here.

# Given (possibly random) variables, X and Y, and a correlation direction,
# returns:
#  (r, p),
# where r is the Pearson correlation coefficient, and p is the probability
# that there is no correlation in the given direction.
# direction:
#  if positive, p is the probability that there is no positive correlation in
#    the population sampled by X and Y
#  if negative, p is the probability that there is no negative correlation
#  if 0, p is the probability that there is no correlation in either direction
def probabilityNotCorrelated(X, Y, direction=0):
    x = len(X)
    if x != len(Y):
        raise ValueError("variables not same len: " + str(x) + ", and " + \
    if x < 6:
        raise ValueError("must have at least 6 samples, but have " + str(x))
    (corr, prb_2_tail) = stats.pearsonr(X, Y)

    if not direction:
        return (corr, prb_2_tail)

    prb_1_tail = prb_2_tail / 2
    if corr * direction > 0:
        return (corr, prb_1_tail)

    return (corr, 1 - prb_1_tail)
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