We classify the topological invariants of admissible effective configurations in the Cosmochrony framework. The projection fiber S³ carries a Hopf fibration S¹ S³ S², whose U (1) fiber sector supports electric charge as a winding number associated with ₁ (S¹) Z. On a canonical admissible configuration model, the bounded-flux constraint removes polar regions from the base~S², reducing the admissible base to a topological annulus with ₂ = 0. This triviality excludes isolated magnetic monopoles as admissible topological excitations. We further argue that parity violation arises from projective chirality: a structural orientation dependence of admissibility under non-injective projection, which selects one handedness of winding invariants over its conjugate. We distinguish rigorously between results established on the canonical model and open problems related to the full effective configuration space C₄₅₅.
Jerome Beaurepaire (Sat,) studied this question.