Estimate exponential cutoff in a power law distribution

As I have been doing some social network analysis, I have stumbled upon the problem of fitting a probability distribution on network degree.

So, I have a probability distribution `P(X >= x)` which, from visual inspection, follows a power law with an exponential cutoff rather than a pure power law (a straight line).

So, given that the equation for power law distribution with exponential cutoff is:

f(x) = x**alpha * exp(beta*x)

How might I estimate the parameters `alpha` and `beta` using Python?

I know scipy.stats.powerlaw package exists and they have a `.fit()` function but that doesn't seem to do the job as it only returns the location and scale of the plot, which seems to be useful only for normal distribution? There are also not enough tutorials on this package.

P.S. I'm well aware of the implementation of CLauset et al but they don't seem to provide ways to estimate the parameters of alternate distributions.

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The Clauset paper is the best reference on practical fitting of power law functions. If you genuinely think you have a problem that isn't addressed, consider emailing the authors –  Andrew Walker Jan 30 '12 at 12:03
I'm not a statistician so I'm not really sure if I understand the whole paper completely. I think the code by Ginsberg is great and very helpful. I just want to know if there are tools to help with estimating the parameters of other probability distributions. –  M.Y. Jan 30 '12 at 13:40
en.wikipedia.org/wiki/Power_law where's the straight line you talk about? –  qarma Mar 23 '12 at 12:33
qarma, power law is a straight line if the data is plotted on a log-log plot –  M.Y. Apr 12 '12 at 0:33