ROBERT EDWARD GRANT PRESENTS
Exploring the Riemann Hypothesis through the Lens of Quasi Prime Methodology
Abstract
This paper explores novel perspectives on the Riemann Hypothesis (RH) through the application of the Quasi Prime Methodology (QPM), a structured sieve that excludes composites via modular constraints, revealing primes by constructive residue. Additionally, a new mathematical phenomenon is identified: all quasi-prime reciprocals, excluding 2 and 3, exhibit infinite decimal periodicity with digit-sum invariance to 9. This digital-root pattern, tied with the modular symmetry of QPM, presents an emergent harmonic model for prime distribution. The potential implications for RH, including spectral interpretations and standing wave analogues, are discussed.
Author: Sir Robert Edward Grant
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