Topological Phase Closure

In WILL Relational Geometry, a stable state is represented by a closed geometric projection on the S1 carrier. The quantum number n is the topological winding number. When n is an integer, the geometry achieves closure, creating a stable structure. Non-integer values lead to destructive interference and broken geometry. This constraint establishes the Minimal Phase Grain (2π/n), providing the ontological origin of quantum granularity and uncertainty.