Gorde:
| Egile Nagusiak: | , |
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| Formatua: | Recurso digital |
| Hizkuntza: | |
| Argitaratua: |
Zenodo
2025
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| Sarrera elektronikoa: | https://doi.org/10.5281/zenodo.17708485 |
| Etiketak: |
Etiketa erantsi
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Aurkibidea:
- This paper explores the profound and intricate connections between the universality of the distribution of non-trivial zeros of the Riemann zeta function on the critical line and the arithmetic properties of prime gaps. The Riemann Hypothesis, asserting that all non-trivial zeros lie on the critical line with real part one-half, underpins much of modern analytic number theory and has deep implications for the distribution of prime numbers. A central aspect of this hypothesis is the observed statistical regularity of these zeros, which remarkably aligns with the eigenvalue distributions found in random matrix theory, specifically the Gaussian Unitary Ensemble (GUE). This phenomenon, often referred to as critical line universality, suggests a hidden order in the spectral properties of the zeta function. Simultaneously, the study of prime gaps -- the differences between consecutive prime numbers -- presents some of the most challenging open problems in number theory, including the Twin Prime Conjecture and Polignac's Conjecture. This paper hypothesizes that the statistical universality observed on the critical line could offer a novel perspective and potentially yield insights into the seemingly erratic yet ultimately structured nature of prime gaps. We delve into the theoretical framework that links these two seemingly disparate domains, utilizing explicit formulas that connect the zeros of the zeta function to the prime counting function. By drawing parallels between spectral correlations of zeros and the arithmetic structure of primes, we aim to elucidate how the 'music' of the critical line might orchestrate the complex rhythm of prime number distribution, proposing a methodological approach grounded in spectral analysis and advanced number theory to bridge this gap.