A Geometric-Arithmetic Framework for the Critical Line of the Riemann Zeta Function II: Strengthened Invariants and Extended Proofs

Iyindamope Edward Ariori

Read the full article

Discuss this preprint

Start a discussion What are Sciety discussions?

Listed in

This article is not in any list yet, why not save it to one of your lists.

Abstract

We present a framework that rigorously bridges classical vesica piscis geometry witharithmetic invariants—specifically the divisor function—to explain the critical line ofthe Riemann zeta function.

Version published to 10.31219/osf.io/6ksp5_v1 on OSF Preprints
Feb 28, 2025

There Should Exist The Tetradic Nontrivial Zeros Off The Critical Line

This article has 2 authors:
1. Elizabeth Zhou
2. Ming Zhou
This article has no evaluationsLatest version Jan 21, 2026
A Unified Proof of the Extended, Generalized, and Grand Riemann Hypothesis

This article has 1 author:
1. Weicun Zhang
This article has no evaluationsLatest version Dec 22, 2025
Minimal Surfaces and Analytic Number Theory: The Enneper-Riemann Spectral Bridge

This article has 1 author:
1. Felipe Oliveira Souto
This article has no evaluationsLatest version Dec 12, 2025

Discuss this preprint

Listed in

Abstract

Article activity feed

Related articles

There Should Exist The Tetradic Nontrivial Zeros Off The Critical Line

A Unified Proof of the Extended, Generalized, and Grand Riemann Hypothesis

Minimal Surfaces and Analytic Number Theory: The Enneper-Riemann Spectral Bridge