Experimental Non-Violation of the Bell Inequality

Abstract

A finite non-classical framework for physical theory is described which challenges the conclusion that the Bell Inequality has been shown to have been violated experimentally, even approximately. This framework postulates the universe as a deterministic locally causal system evolving on a measure-zero fractal-like geometry IU in cosmological state space. Consistent with the assumed primacy of IU, and p-adic number theory, a non-Euclidean (and hence non-classical) metric gp is defined on cosmological state space, where p is a large but finite Pythagorean prime. Using number-theoretic properties of spherical triangles, the inequalities violated experimentally are shown to be gp-distant from the CHSH inequality, whose violation would rule out local realism. This result fails in the singular limit p=∞, at which gp is Euclidean. Broader implications are discussed.