We establish the arithmetic-geometric extension of Arithmetic Power Geometry (APG) over regular arithmetic models by targeting the central projection bridge isolated in Volume VI. Moving beyond localized thermodynamic descriptions, this paper formalizes the relationship between the continuous, path-integrated deformation energy ℰAPG on the compactified modular curve X₀ (N) * and the discrete arithmetic metrics of a projected semi-stable Frey scheme Eₐ, ᵦ, ₚ. We prove the Intrinsic Discrepancy–Source Compatibility Theorem, anchoring the continuous potential directly to the positive curvature landscape of the Arakelov metric discrepancy bundle. By applying Stein factorization to graph closures and formalizing the metric self-pairing within the arithmetic Picard group, we map analytic field variations to global intersection invariants. We show that the global projection inequality is reduced to three explicit boundary conditions governing weighted cusp widths, vertical component intersection matrices, and Green-energy metric distortion fields. This completes the structural architecture of the conditional projection program and localizes the remaining analytic and arithmetic limits of the APG method.
Md. Amir Khusru Akhtar (Thu,) studied this question.