שמור ב:
| מחבר ראשי: | |
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| פורמט: | Recurso digital |
| שפה: | |
| יצא לאור: |
Zenodo
2026
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| גישה מקוונת: | https://doi.org/10.5281/zenodo.18889396 |
| תגים: |
הוספת תג
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תוכן הענינים:
- <p>This article explores the Prime Number Theorem and the Riemann Hypothesis through the lens of signal processing and periodical rotation. We propose that the critical line at $s = 1/2$ is not merely a geometric locus but a dynamic gyrocentrifical center. By applying Fourier analysis to the von Mangoldt function and the Zeta non-trivial zeros, we demonstrate how prime powers act as decaying harmonics and how the "swag" of the prime-counting error term maintains a stable orbit around the fundamental frequency state of $1/2$.</p>