Uniform Spaces in the Pregeometric Modeling of Quantum Non-Separability

Abstract

We introduce a pregeometry employing uniform spaces over the denumerable set X of spacetime events. The discrete uniformity DX over X is used to obtain a pregeometric model of macroscopic spacetime neighborhoods. We then use a uniformity base generated by a topological group structure over X to provide a pregeometric model of microscopic spacetime neighborhoods. Accordingly, quantum non-separability as it pertains to non-locality is understood pregeometrically as a contrast between microscopic spacetime neighborhoods and macroscopic spacetime neighborhoods. A nexus between this pregeometry and conventional spacetime physics is implied per the metric induced by DX. A metric over the topological group Z2 x ... x Z2 is so generated. Implications for quantum gravity are enumerated.