Chudnovsky's formula for $1/\pi$ revisited

Yue Zhao

arXiv:1807.10125·math.NT·July 27, 2018

Chudnovsky's formula for $1/\pi$ revisited

Yue Zhao

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TL;DR

This paper revisits Chudnovsky's formula for 1/π, providing a modular proof of the Ramanujan-Chudnovsky identity to deepen understanding of its mathematical foundations.

Contribution

It offers a new modular proof of the Ramanujan-Chudnovsky identity, enhancing the theoretical understanding of this formula.

Findings

01

Provides a modular proof of the identity

02

Clarifies the mathematical structure behind Chudnovsky's formula

03

Strengthens the theoretical basis for high-precision calculations of π

Abstract

The document contains an outline of a modular proof for Ramanujan-Chudnovsky identity.

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Taxonomy

TopicsAdvanced Mathematical Identities · Analytic Number Theory Research · Advanced Algebra and Geometry