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Bibliographic Details
Main Author: Campbell, John M.
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2403.07291
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author Campbell, John M.
author_facet Campbell, John M.
contents Using an infinite family of generalizations of the Chudnovsky brothers' series recently obtained via the analytic continuation of the Borwein brothers' formula for Ramanujan-type series of level 1, we apply the Gauss-Salamin-Brent iteration for $π$ to obtain a new, Ramanujan-type series that yields more digits per term relative to current world record given by an extension of the Chudnovsky algorithm from Bagis and Glasser that produces about 110 digits per term. We explicitly evaluate the required nested radicals over $\mathbb{Q}$ involved in the our summation, which yields about 153 digits per term, and we provide a practical way of implementing our higher-order version of the Chudnovsky algorithm via the the PARI/GP system. An evaluation due to Berndt and Chan for the modular $j$-invariant associated with their order-3315 extension of the Chudnovskys' Ramanujan-type series provides a key to our applications of recursions for the elliptic lambda and elliptic alpha functions.
format Preprint
id arxiv_https___arxiv_org_abs_2403_07291
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle An extension of the Chudnovsky algorithm
Campbell, John M.
Number Theory
11Y60
Using an infinite family of generalizations of the Chudnovsky brothers' series recently obtained via the analytic continuation of the Borwein brothers' formula for Ramanujan-type series of level 1, we apply the Gauss-Salamin-Brent iteration for $π$ to obtain a new, Ramanujan-type series that yields more digits per term relative to current world record given by an extension of the Chudnovsky algorithm from Bagis and Glasser that produces about 110 digits per term. We explicitly evaluate the required nested radicals over $\mathbb{Q}$ involved in the our summation, which yields about 153 digits per term, and we provide a practical way of implementing our higher-order version of the Chudnovsky algorithm via the the PARI/GP system. An evaluation due to Berndt and Chan for the modular $j$-invariant associated with their order-3315 extension of the Chudnovskys' Ramanujan-type series provides a key to our applications of recursions for the elliptic lambda and elliptic alpha functions.
title An extension of the Chudnovsky algorithm
topic Number Theory
11Y60
url https://arxiv.org/abs/2403.07291