We propose a geometric and topological framework in which interaction suppression emerges as a consequence of constrained high-dimensional interaction spaces structured by the dodecahedral graph. The interaction is initially defined in a 30-dimensional edge space corresponding to pairwise interaction modes. Local conservation constraints at each vertex reduce the admissible configurations to the cycle space of the graph, yielding an 11-dimensional effective interaction manifold.
Bonneau et al. (Tue,) studied this question.