Fast and stable rational approximation of generalized hypergeometric functions
Abstract
Rational approximations of generalized hypergeometric functions of type are constructed by the Drummond and factorial Levin-type sequence transformations. We derive recurrence relations for these rational approximations that require flops. These recurrence relations come in two forms: for the successive numerators and denominators; and, for an auxiliary rational sequence and the rational approximations themselves. Numerical evidence suggests that these recurrence relations are much more stable than the original formul\ae~for the Drummond and factorial Levin-type sequence transformations. Theoretical results on the placement of the poles of both transformations confirm the superiority of factorial Levin-type transformation over the Drummond transformation.
Cite
@article{arxiv.2307.06221,
title = {Fast and stable rational approximation of generalized hypergeometric functions},
author = {Richard Mikael Slevinsky},
journal= {arXiv preprint arXiv:2307.06221},
year = {2023}
}