scientific article
From MaRDI portal
Publication:3797269
zbMath0652.10019MaRDI QIDQ3797269
Jonathan M. Borwein, Peter B. Borwein
Publication date: 1988
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
hypergeometric seriesmodular invariantscomputational number theoryanalytic computationsformulas for 1/\(\pi \)rapidly convergent power series for 1/\(\pi \)
Discontinuous groups and automorphic forms (11F99) Software, source code, etc. for problems pertaining to number theory (11-04) Homogeneous approximation to one number (11J04)
Related Items
“Divergent” Ramanujan-type supercongruences ⋮ Infinite series identities derived from the very well-poised \(\Omega\)-sum ⋮ Rational analogues of Ramanujan's series for 1/π ⋮ The empirical quest for \(\pi \) ⋮ Multiprecision arithmetic using fast Hartley transforms ⋮ Inequalities for the generalized elliptic integrals and modular functions ⋮ On covering a digital disc with concentric circles in \(\mathbb Z^2\) ⋮ Eisenstein series and Ramanujan-type series for \(1 / \pi\) ⋮ Birth, growth and computation of pi to ten trillion digits ⋮ On a Ramanujan-type series associated with the Heegner number 163 ⋮ Extensions of Ramanujan's two formulas for \(1/\pi\) ⋮ Obituary: Jonathan M. Borwein (1951--2016). Homo sapiens, homo ludens ⋮ Unnamed Item ⋮ $q$-analogues of several $\pi $-formulas ⋮ Class number three Ramanujan type series for \(1/\pi\) ⋮ Dougall’s bilateral ₂𝐻₂-series and Ramanujan-like 𝜋-formulae ⋮ Extensions of the classical theorems for very well-poised hypergeometric functions ⋮ Numerical results on relations between fundamental constants using a new algorithm ⋮ Ramanujan's Eisenstein series and new hypergeometric-like series for \(1/\pi ^{2}\) ⋮ Accelerating Dougall’s $_5F_4$-sum and infinite series involving $\pi $
This page was built for publication:
