# What is the most efficient way to solve system of equations containing the digamma function?

What is the most efficient way to solve system of equations involving the digamma function?

I have a vector v and I want to solve for a vector w such that for all i:

digamma(sum(w)) - digamma(w_i) = v_i

and

w_i > 0

I found the gsl function gsl_sf_psi, which is the digamma function (calculated using some kind of series.) Is there an identity I can use to reduce the equations? Is my best bet to use a solver? I am using C++0x; which solver is easiest to use and fast?

From my preliminary research, digamma is not easily invertible (searching for inverse digamma gives algorithms that work by binary search), so it makes sense that there would be no simplification to the whole system.

So, using a solver now leaves two problems: dealing with the fact that digamma is very slow to calculate, and dealing with the restriction that w_i > 0, or else digamma(w_i) will crash for w_i = 0.

For the first problem, I thought maybe I should implement a cache for recently calculated values of digamma -- I thought that would be a good idea, but don't know much about how root-finding algorithms work.

My idea was to solve the second problem was to find w'_i = log(w_i). That way, w'_i are on the whole line. I wonder if this is a good idea. There's probably no function to find digamma(exp(w')) directly? Also, the algorithm might take steps in w' space and not improve things because the mapping from w'->w loses some precision and so two elements of w' might map to the same w.

There's still the question of finding a good, fast rootfinding algorithm. I think I may ask that in a separate question.

Thanks...

-
not sure but would you get better answers on mathoverflow.net, and then come back here for specific questions on the algorithm? – Preet Sangha Apr 11 '10 at 4:40
Thanks for taking the time to answer. I have updated the question. – Neil G Apr 11 '10 at 18:31
Nice, thanks for the update to the question, gave me an insight about how to procedd with solving such systems and what problems I can expect. By the way, I'm sure you know this already but GSL has root finding algorithms too :) – Akanksh Apr 14 '10 at 7:25