I would like to run some tests for the null hypothesis that the times of events I have was created from a homogeneous Poisson process (see e.g. http://en.wikipedia.org/wiki/Poisson_process ). For a fixed number of events the times should therefore look like a sorted version of a uniform distribution in the appropriate range. There is an implementation of the Kolmogorov-Smirnov test at http://docs.scipy.org/doc/scipy-0.7.x/reference/generated/scipy.stats.kstest.html but I can't see how to use it here as scipy.stats doesn't seem to know about Poisson processes.
As a simple example, this sample data should give a high p-value for any such test.
import random nopoints = 100 max = 1000 points = sorted([random.randint(0,max) for j in xrange(nopoints)])
How can I make a sensible test for this problem?
From www.stat.wmich.edu/wang/667/classnotes/pp/pp.pdf I see
" REMARK 6.3 ( TESTING POISSON ) The above theorem may also be used to test the hypothesis that a given counting process is a Poisson process. This may be done by observing the process for a fixed time t. If in this time period we observed n occurrences and if the process is Poisson, then the unordered occurrence times would be independently and uniformly distributed on (0, t]. Hence, we may test if the process is Poisson by testing the hypothesis that the n occurrence times come from a uniform (0, t] population. This may be done by standard statistical procedures such as the Kolmogorov-Smirov test."