Chapter 28: Omega-Germs on the Ontic Elements

The Prime Polarity Theorem assigns each internal prime a canonical polarity — B-dominant or C-dominant — using finite, decidable computations. This chapter passes from the finite regime to the infinite limit. We construct omega-germs: compatible towers on the primorial ladder that serve as the τ-native analogue of Cauchy sequences. Omega-germs live on the bare-metal ontic elements of τ-Idx. They require no coordinates, no interior points, no imported topology. They are the pre-topological boundary data from which the algebraic lemniscate will emerge in the relevant chapter.