In order to calculate the CDF of a multivariate normal, I followed this example (for the univariate case) but cannot interpret the output produced by scipy:

from scipy.stats import norm
import numpy as np
mean = np.array([1,5])
covariance = np.matrix([[1, 0.3 ],[0.3, 1]])
distribution = norm(loc=mean,scale = covariance)
print distribution.cdf(np.array([2,4]))

The output produced is:

[[  8.41344746e-01   4.29060333e-04]
 [  9.99570940e-01   1.58655254e-01]]

If the joint CDF is defined as:

P (X1 ≤ x1, . . . ,Xn ≤ xn)

then the expected output should be a real number between 0 and 1.


3 Answers 3


After searching a lot, I think this blog entry by Noah H. Silbert describes the only readymade code from a standard library that can be used for computing the cdf for a multivariate normal in Python. Scipy has a way to do it but as mentioned in the blog, it is difficult to find. The approach is based on a paper by Alan Genz’s.

From the blog, this is how it works.

from scipy.stats import mvn
import numpy as np
low = np.array([-10, -10])
upp = np.array([.1, -.2])
mu = np.array([-.3, .17])
S = np.array([[1.2,.35],[.35,2.1]])
p,i = mvn.mvnun(low,upp,mu,S)
print p

  • Is it possible to pass an array of points to mvn.mvnun? I read the code, seems I can only loop through it?
    – ZK Zhao
    Commented Feb 9, 2016 at 1:47
  • @cqcn1991 I am looking for multivariate cdf to plot by passing an array through a file. Were you able to find the solutions? Can you please have a look here stackoverflow.com/questions/37057938/…
    – Sitz Blogz
    Commented May 6, 2016 at 13:10
  • 1
    The problem with mvn.mvnun is that it is not deterministic. At least, this code gives diferent results each time: pastebin.com/L0WSTRui
    – David Dale
    Commented Jan 23, 2018 at 11:35
  • 2
    Here's that blog post, reposted (the database in my old blog was corrupted a while ago, and I've only fairly recently been able to recover the posts). It's true that the algorithm that Genz developed is not deterministic, but the probabilities that that code produce only differ in the 9th decimal place. For me at least, the benefits of a fast, accurate algorithm for calculating multivariate normal integrals far outweigh the costs of it not being deterministic. Commented Nov 19, 2018 at 16:02
  • The blogpost is on internet archive here
    – Nix G-D
    Commented Mar 30, 2022 at 23:39

The scipy multivariate_normal from v1.1.0 has a cdf function built in now:

from scipy.stats import multivariate_normal as mvn
import numpy as np

mean = np.array([1,5])
covariance = np.array([[1, 0.3],[0.3, 1]])
dist = mvn(mean=mean, cov=covariance)
print("CDF:", dist.cdf(np.array([2,4])))

CDF: 0.14833820905742245

Documentation can be found here.


If you don't care about performance (i.e. perform it only occasionally), then you can create the multivariate normal pdf using multivariate_normal, and then calculate the cdf by integrate.nquad

  • Can you please elaborate on how we can use this? and can this be used to find the expectation of a function which is dependent on a multivariate normal distribution?
    – vicky113
    Commented Aug 18, 2017 at 5:26

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