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

Iyindamope Edward Ariori

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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

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This article has no evaluationsLatest version Mar 19, 2025
The Riemann Hypothesis as an Operator Constraint: A Comprehensive Spectral, Geometric, and Entropic Justification

This article has 1 author:
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This article has no evaluationsLatest version Mar 19, 2025
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This article has 2 authors:
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