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| viXra.org > Number Theory > viXra:2504.0079 |
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Number Theory |
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Authors: Natalia Tanyatia
We construct a unified symbolic and geometric framework that links the recursive generation of prime numbers to the problem of closest hypersphere packing in Euclidean space. Beginning with a purely logical definition of primes and building an iterative formula that filters primes based on modular constraints, we establish a symbolic system for exact prime counting and approximation. We then transition from arithmetic to geometry by introducing sphere-packing principles in various dimensions, particularly focusing on both furthest-touching and closest-touching configurations. By analyzing simplex-based Delaunay lattices and maximizing local sphere contact, we show how prime indices emerge naturally as layers in the radial expansion of optimally packed lattices. This construction culminates in a symbolic proof of the Riemann Hypothesis by bounding the prime counting function with a geometric analogy. The result is a cohesive theory in which logical prime filtration, packing density, and analytic continuation of Dirichlet series converge in a single constructively grounded model.
Comments: 16 Pages. https://github.com/NataliaTanyatia/Optimal-Prime.git (Note by viXra Admin: The article should start with article title, author name and abstract; Please submit article written with AI assistance to ai.viXra.org)
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[v1] 2025-04-12 22:15:36
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