The probability distribution of the sum of two random variables, x and y, is given by the convolution of the individual distributions. I'm having some trouble doing this numerically. In the following example, x and y are uniformly distributed, with their respective distributions approximated as histograms. My reasoning says that the histograms should be convoluted to give the distribution of, x+y.
from numpy.random import uniform from numpy import ceil,convolve,histogram,sqrt from pylab import hist,plot,show n = 10**2 x,y = uniform(-0.5,0.5,n),uniform(-0.5,0.5,n) bins = ceil(sqrt(n)) pdf_x = histogram(x,bins=bins,normed=True) pdf_y = histogram(y,bins=bins,normed=True) s = convolve(pdf_x,pdf_y) plot(s) show()
which gives the following,
In other words, a triangular distribution, as expected. However, I have no idea how to find the x-values. I would appreciate it if someone could correct me here.