v. 6 n. 03 (2025), Free Section
v. 6 n. 03 (2025)

A NEW ARCHITECTURE FOR PRIME NUMBER THEORY: FROM EXACT CALCULATION TO PRIME COUNTING VIA SPECTRAL CALIBRATION OF THE ZETA FUNCTION

Free Section
Publicado 09/01/2026
Murillo Fonseca
Professor in the Undergraduate Program in Pedagogy at Faculdade Integra and Colégio Ágape (Caldas Novas, Goiás, Brazil). Specialist in Mathematics from Faculdade Apogeu
PDF (Inglês)

Palavras-chave

Prime Numbers. Prime-counting Function. Riemann Zeta Function. Spectral Connection Function.

Como Citar

Fonseca , M. . (2026). A NEW ARCHITECTURE FOR PRIME NUMBER THEORY: FROM EXACT CALCULATION TO PRIME COUNTING VIA SPECTRAL CALIBRATION OF THE ZETA FUNCTION. Journal of Interdisciplinary Debates, 6(03), 109-129. https://doi.org/10.51249/jid.v6i03.2784
ACM ACS APA ABNT Chicago Harvard IEEE MLA Turabian Vancouver AMA

Baixar Citação

Endnote/Zotero/Mendeley (RIS) BibTeX

Resumo

This research presents a paradigm shift from the stochastic tradition within Analytic Number Theory by establishing a deterministic framework for the derivation of prime numbers and their associated prime-counting functions. The methodology is centered on the Spectral Connection Function, an operator that employs the non-trivial zeros of the Riemann Zeta Function as a harmonic basis for the interpolation of modular cardinality sequences over a continuous domain. Through the Sine Equation of Cardinalities, we demonstrate the mapping of this spectral interpolation onto discrete, exact prime values. Local instability is resolved via Spectral Measures, involving dynamic sliding-window calibration, and the minimization of Spectral Energy through Golden Ratio heuristics. Numerical validation yields a vanishing error in both prime determination and cardinality counting across controlled intervals.

PDF (Inglês)

Referências

EDWARDS, Harold M. Riemann’s Zeta Function. New York: Academic Press, 1974.

FONSECA, Murillo. O espectro dos números primos: a função espectral de conexão e o acorde de Riemann: da função zeta de Riemann à reconstrução contínua das cardinalidades [The spectrum of prime numbers: the spectral connection function and the Riemann chord: from the Riemann zeta function to the continuous reconstruction of cardinalities]. 1st ed. Caldas Novas, GO: Author’s Edition, 2025.

___________. Compassos espectrais na contagem dos números primos: da função espectral de conexão à arquitetura da contagem de primos [Spectral compasses in prime number counting: from the spectral connection function to the prime counting architecture]. 1st ed. Caldas Novas, GO: Author’s Edition, 2025.

HARDY, Godfrey H.; WRIGHT, Edward M. An Introduction to the Theory of Numbers. 6th ed. Oxford: Oxford University Press, 2008.

IVIĆ, Aleksandar. The Riemann Zeta-Function: Theory and Applications. Mineola: Dover Publications, 2003.

RIEMANN, Bernhard. Über die Anzahl der Primzahlen unter einer gegebenen Grösse [On the Number of Primes Less Than a Given Magnitude]. Monatsberichte der Königlichen Preussischen Akademie der Wissenschaften zu Berlin, Berlin, p. 671-680, Nov. 1859.

TITCHMARSH, Edward C. The Theory of the Riemann Zeta-Function. 2nd ed. Oxford: Clarendon Press, 1986.