Theory of the Infinite Numerical Sheaf: A Spherical Framework for Coexisting Number Article Swipe
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· 2026
· Open Access
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· DOI: https://doi.org/10.5281/zenodo.18122332
· OA: W7118075904
We present the Theory of the Infinite Numerical Sheaf over the 2-sphere, a rig-orous mathematical framework that formalizes the geometric coexistence of struc-turally distinct number systems. We construct a fiber bundle π : E → S2 whereeach fiber represents an ordered topological field with its own algebraic properties.The spherical topology enables richer geometric structures, including north-southpole duality and hemispheric symmetries. Through explicit constructions (hyper-reals, p-adic numbers, subfields of surreals), we demonstrate that non-isomorphicfibers can coexist over the same base manifold, characterized by categorical invari-ants. The model supports a pluralist perspective: the real arithmetic R emerges asa particular case determined by specific axiomatic choices among a continuum ofconstructible logical possibilities.
