A numerical evaluator for the generalized hypergeometric series. The generalized hypergeometric series is numerically evaluated using extended precision subroutines. Cases involving large, complex arguments are shown to be accurate up to 12 significant figures.
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References in zbMATH (referenced in 4 articles , 1 standard article )
Showing results 1 to 4 of 4.
- Chen, Changkai; Zhang, Xiaohua; Liu, Zhang: A high-order compact finite difference scheme and precise integration method based on modified Hopf-Cole transformation for numerical simulation of (n)-dimensional Burgers’ system (2020)
- Willis, Joshua L.: Acceleration of generalized hypergeometric functions through precise remainder asymptotics (2012)
- Annunziato, M.: A finite difference method for piecewise deterministic processes with memory. II. (2009)
- Perger, Warren F.; Bhalla, Atul; Nardin, Mark: A numerical evaluator for the generalized hypergeometric series (1993)