A SYMMETRIC TWO-BALL DYNAMICAL FRAMEWORK FOR GOLDBACHS CONJECTURE FROM STATIC ADDITIVITY TO DETERMINISTIC NON-AVOIDANCE

  • Independent Researcher, Nantes, France.
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Goldbachs conjecture asserts that every even integer can be expressed as the sum of two prime numbers. Despite its simple formulation, the conjecture has resisted proof for nearly three centuries. The principal difficulty lies not in the scarcity of primes, but in guaranteeing simultaneous primality at two symmetric locations. This work introduces a deterministic two-ball dynamical framework that reformulates Goldbachs conjecture as a problem of symmetric motion and non-avoidance. Two arithmetic balls move symmetrically around the midpoint of a fixed even integer, generating an infinite sequence of candidate decompositions. Rather than testing static offsets, the framework studies whether such a symmetric, recurrent, and non-periodic motion can avoid all prime prime configurations indefinitely. By encoding symmetry, direction reversals, and arithmetic dispersion into the motion, the problem is reduced to a structural question: whether invariant obstructions can exist under infinite symmetric exploration. Using classical results on prime density and modern insights from dynamics and ergodic theory, the work demonstrates that permanent avoidance is structurally unstable. Goldbachs conjecture is thus transformed into a conditional theorem governed by deterministic motion rather than probabilistic assumptions, isolating a single, well-defined step remaining before an unconditional proof.


Bahbouhi Bouchaib (2026); A SYMMETRIC TWO-BALL DYNAMICAL FRAMEWORK FOR GOLDBACHS CONJECTURE FROM STATIC ADDITIVITY TO DETERMINISTIC NON-AVOIDANCE, Jana Nexus: Journal of Humanities and Social Thought, 2 (01), 25-59, ISSN 3108-284X. DOI URL: https://dx.doi.org/10.21474/JNHST01/118


Bahbouhi Bouchaib
Independent Researcher, Nantes, France.
India

DOI:


Article DOI: 10.21474/JNHST01/118      
DOI URL: https://dx.doi.org/10.21474/JNHST01/118