Precision, why do Matlab and Python numpy give so different outputs?

Question

I know about basic data types and that float types (float,double) can not hold some numbers exactly.

In porting some code from Matlab to Python (Numpy) I however found some significant differences in calculations, and I think it's going back to precision.

Take the following code, z-normalizing a 500 dimensional vector with only first two elements having a non-zero value.

Matlab:

Z = repmat(0,500,1); Z(1)=3;Z(2)=1;
Za = (Z-repmat(mean(Z),500,1)) ./ repmat(std(Z),500,1);
Za(1)
>>> 21.1694

Python:

from numpy import zeros,mean,std
Z = zeros((500,))
Z[0] = 3
Z[1] = 1
Za = (Z - mean(Z)) / std(Z)
print Za[0]
>>> 21.1905669677

Besides that the formatting shows a bit more digits in Python, there is a huge difference (imho), more than 0.02

Both Python and Matlab are using a 64 bit data type (afaik). Python uses 'numpy.float64' and Matlab 'double'.

Why is the difference so huge? Which one is more correct?

Answer 1

Maybe the difference comes from the mean and std calls. Compare those first.

There are several definitions for std, some use the sqaure root of

 1/n * sum( (xi - mean(x)**2 )

others use

 1/(n-1) * sum( (xi - mean(x)**2 )

instead.

From a mathematical point: these formulas are estimators of the variance of a normal distributed random value. The distribution has two parameters sigma and mu. If you know mu exactly the optimal estimator for sigma**2 is

  1/n * sum( (xi-mu)**2 )

If you estimate mu from the data, you use mu = mean(xi), and in this case the optimal estimator for sigma**2 is

  1/(n-1) * sum( (xi- mean(x))**2 )

Answer 2

To answer your question, no, this is not a problem of precision. As @rocksportrocker points out, there are two popular estimators for the standard deviation. MATLAB's std has both available but as a standard uses a different one from what you used in Python.

Try std(Z,1) instead of std(Z):

Za = (Z-repmat(mean(Z),500,1)) ./ repmat(std(Z,2),500,1);Za(1)
sprintf('%1.10f', Za(1))

leads to

Za(1) = 21.1905669677

in MATLAB. Read rockspotrocker's answer about which of the two results is more appropriate for what you want to do ;-).