Critical Symmetry Theorem: Principles of Harmonic Order in Number Theory

Blaize Rouyea; Corey Bourgeois; Trey Bourgeois

Critical Symmetry Theorem: Principles of Harmonic Order in Number Theory

Authors: Blaize Rouyea, Corey Bourgeois, Trey Bourgeois

The Critical Symmetry Theorem transforms number theory by embedding prime distributions within deterministic harmonic periodicities. By enforcing symmetry, it aligns all non-trivial zeros of the Riemann zeta function (zeta(s)) on the critical line (Re)(s) = (0.5), resolving the Riemann Hypothesis. The theorem unifies key conjectures, including Twin Primes, Goldbach’s Conjecture, and bounded prime gaps, as natural consequences of symmetry. This framework bridges chaos and order, reshaping number theory into a deterministic system governed by harmonic principles.

Comments: 35 Pages.

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[v1] 2024-12-06 21:52:18

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