This paper treats classical mechanics as a fixed-ℏ validity regime of the backbone ratherthan as a separate primitive theory or a mere formal ℏ → 0 limit. With ℏ fixed at thebackbone level, it appears as a licensed Hamilton–Jacobi/trajectory readout of the R3dynamics on regions where a semiclassical gate is objectively satisfied. For concreteness weuse the Schrödinger-form R3 representative as an anchor (the Part III anchor class); KG-typecompletions are deferred to later extensions. On a space–time domain U ⊂ M × R, we definean R3–HJ regime sector by (i) single-phase representability Ψ = AeiS/ℏ, (ii) a non-nodalinterior A ≥ a0 > 0, and (iii) residual smallness quantified by the indicator Ξ = |RS|/ΛHJ,where RS := ∂tS + H(x, ∇S, t) and ΛHJ := |∂tS| + |H(x, ∇S, t)| + δ0. Our main theorem isconditional on the declared semiclassical realization regime: on any regime-valid region, thephase is HJ-dominated with controlled residual and the amplitude obeys an R3-consistenttransport law with a controlled remainder. While computationally equivalent to standardWKB hierarchies for the same anchor class (Part III; cf. 3), the status differs: classicality isgoverned by regime membership at fixed ℏ, yielding explicit validity and breakdown criteriaand a backbone-fixed correction hierarchy. Finally, Newtonian mechanics is formulated as anexplicit readout instance applied to regime data and is licensed only while regime conditionspersist along the instance evolution; under an additional macroscopic residual-regularitygate (G–HJ4) we obtain a force-level accuracy bound controlling ∇RS at O(εΞ) within thedeclared regime.
Yunbeom Yi (Sun,) studied this question.
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