Title: A Tale of the Deep Symmetry of the World – Version 5.0 This work presents a conceptual geometric model of spacetime, in which matter, antimatter, and their mirror counterparts are interpreted as local deformations of an ordered vacuum structure, rather than as fundamentally distinct entities. The model introduces an elementary quantum of geometry—the p-gluon (pG)—which carries a binary topological orientation. Ordered ensembles of p-gluons form the Expanded Vacuum Configuration (ECV/RKP), which defines the geometric ground state of spacetime. Local deformations of this vacuum give rise to Compact Vacuum Configurations (CCV/ZKP), interpreted as elementary particles. Version 5.0 replaces the geometric spring metaphor used in earlier versions with a new visualization based on a thin-walled cap. This metaphor provides a clearer interpretation of local geometric deformation, the formation of Boundary K, and the rolling process that leads to particle formation, while preserving the underlying structure of the model. The framework relies on three independent binary degrees of freedom:- vacuum polarization,- deformation type,- Boundary K orientation. Their combinations naturally generate four elementary particle configurations, interpreted as the proton, antiproton, and their mirror counterparts. The model distinguishes two independent mechanisms of geometric-information reduction:- annihilation, and- quasi-annihilation. Quasi-annihilation naturally leads to the highly symmetric intermediate state RKP(0), interpreted as the boundary between the two vacuum polarizations. At its current stage, the model is qualitative and conceptual. It does not yet provide a complete dynamical or quantum formalism. It should be regarded as a geometric framework intended to stimulate further mathematical development and experimental investigation. Version 5.0 focuses primarily on establishing a consistent geometric language. Future work (Version 6.0) will investigate alternative representations of local vacuum deformation and further develop the geometric foundations of the model. Follow my work and related discussions on Facebook: Facebook
Okupski Arkadiusz (Thu,) studied this question.