# Efficient evaluation of hypergeometric functions

Does anyone have experience with algorithms for evaluating hypergeometric functions? I would be interested in general references, but I'll describe my particular problem in case someone has dealt with it.

My specific problem is evaluating a function of the form 3F2(a, b, 1; c, d; 1) where a, b, c, and d are all positive reals and c+d > a+b+1. There are many special cases that have a closed-form formula, but as far as I know there are no such formulas in general. The power series centered at zero converges at 1, but very slowly; the ratio of consecutive coefficients goes to 1 in the limit. Maybe something like Aitken acceleration would help?

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Is it correct that you want to sum a series where you know the ratio of successive terms and it is a rational function?

I think Gosper's algorithm and the rest of the tools for proving hypergeometric identities (and finding them) do exactly this, right? (See Wilf and Zielberger's A=B book online.)

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Yes, the ratio of the series coefficients is a rational function of the index. But I have not found a useful hypergeometric identity. functions.wolfram.com lists thousands of identities, but none of them help. –  John D. Cook Jan 25 '09 at 23:39
I don't know much -- don't these algorithms find an identity as well? I haven't read the A=B book in detail, but the Maple packages it mentions might have better implementations... –  ShreevatsaR Jan 26 '09 at 1:34