shanks: Evaluation of the hypergeometric function using Shanks's method

Description

Evaluation of the hypergeometric function using Shanks transformation of successive sums

Usage

hypergeo_shanks(A,B,C,z,maxiter=20)
genhypergeo_shanks(U,L,z,maxiter=20)
shanks(Last,This,Next)

Arguments

A,B,C

Parameters (real or complex)

U,L

Upper and lower vectors

Primary complex argument

maxiter

Maximum number of iterations

Last,This,Next

Three successive convergents

Details

The Shanks transformation of successive partial sums is

$$S(n)=\frac{A_{n+1}A_{n-1}-A_n^2}{A_{n+1}-2A_n+A_{n-1}}$$

and if the $A_n$ tend to a limit then the sequence $S(n)$ often converges more rapidly than $A_n$. However, the denominator is susceptible to catastrophic rounding under fixed-precision arithmetic and it is difficult to know when to stop iterating.

References

Shanks, D. (1955).Non-linear transformation of divergent and slowly convergent sequences,Journal of Mathematics and Physics34:1-42

Examples

Run this code

hypergeo_shanks(1/2,1/3,pi,z= 0.1+0.2i)