# python (SimPy) generate random numbers that follow the erlang distribution

I am using Python (SimPy package mostly, but it is irrelevant to the question I think), modeling some systems and running simulations. For this purpose I need to produce random numbers that follow distributions. I have done alright so far with some distributions like exponential and normal by importing the random (eg from random import *) and using the expovariate or normalvariate methods. However I cannot find any method in random that produce numbers that follow the Erlang distribution. So:

1. Is there some method that I overlooked?
2. Do I have to import some other library?
3. Can I make some workaround? (In think that I can use the Exponential distribution to produce random “Erlang” numbers but I am not sure how. A piece of code might help me.

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Erlang distribution is a special case of the gamma distribution, which exists as numpy.random.gamma (reference). Just use an integer value for the k ("shape") argument. See also about scipy.stats.gamma for functions with the PDF, CDF etc.

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Thank you. In random I only find "gammavariate(self, alpha, beta)" is that the one? If yes, how should I set alpha and beta to match an Erlang distribution that need a μ and σ as arguments? – george Sep 20 '12 at 17:44
Yes, you can use that if you don't have numpy. But notice that while alpha=k, beta is 1/theta (that's just another common method of describing the Gamma distribution parameters. – Harel Sep 20 '12 at 17:47
ok thank you very much! – george Sep 20 '12 at 17:49
Nicely done, Harel! your first answer is a zinger! – reechard Sep 21 '12 at 5:12
Thanks! I hope to stay and enjoy! – Harel Sep 21 '12 at 7:50

As the previous answer stated, the erlang distribution is a special case of the gamma distribution. As far as I know, you do not, however, need the `numpy` package. Random numbers from a gamma distribution can be generated in python using `random.gammavariate(alpha, beta)`.

Usage:

``````import random
print random.gammavariate(3,1)
``````
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thank you, but please check my comment on Harel's post on how to match an Erlang distribution using Alpha and Beta – george Sep 20 '12 at 17:46
@george &alpha; = &kappa; and &beta; = 1/&theta; – chucksmash Sep 20 '12 at 17:47
Thank you very much! I'd like to accept both answers but I can only one and since Harel replied first.. – george Sep 20 '12 at 17:50