Papers 1–8 of the scale-space series establish gravitational, quantum, and biological physics on a four-dimensional Riemannian configuration manifold (x, y, z, s) with metric dσ² = e^ (2s/L) (dx² + dy² + dz²) + α² ds². That framework treats time as an external parameter and provides no geometric definition of proper duration. We propose a five-dimensional Lorentzian parent theory with metric dΣ² = −c² dt² + e^ (2s/L) dx² + dy² + dz² + α² ds², signature (−, +, +, +, +), in which time is a genuine geometric coordinate. We prove three results by SymPy-verified computation. (1) Exact decoupling. The t-geodesic equation gives "t= 0 with no coupling to (x, y, z, s). The four (x, y, z, s) geodesic equations are algebraically identical to those of Papers 1–8. Every established result — Newtonian limit, scale-Kerr, vector-mode amplitudes, the 5/7 correction, ∆s = ln (MA/MB) — is preserved without modification. (2) Exact SR time dilation. The 5D proper time formula dτ/dt= sqrt1− (e^ (2s/Lv²) /c²) − (α²˙s²) /c²) gives sqrt1−v²/c² exactly (to machine precision) when ˙s = 0 (flat-space limit), recovering special relativity with the universal speed c. (3) Gravitational time dilation: structural diagnosis. At v = 0, the formula gives sqrt1−4GM/ (Rc²) versus GR’s sqrt1−2GM/ (Rc²). This factor-of-2 discrepancy is observationally ruled out by GPS clock measurements and has a known structural cause: the block-diagonal metric has flat gtt, so the ˙s term must carry all gravitational time dilation but overshoots by factor 2. The correct 5D metric requires non-trivial gtt coupling, to be determined by the 5D field equations — the natural next step in the dynamical programme. The Riemannian 4D manifold and Minkowski spacetime are both projections of the 5D parent: projecting out t recovers the scale-space framework exactly; integrating out s with a weight function W (s) recovers an effective Minkowski spacetime on (t, x, y, z). Framework document Postulate 4 (time is external) remains the correct description within the (x, y, z, s) projection and is not contradicted by the 5D theory — it is the projection-level truth of a deeper geometric fact. The natural home for the framework’s missing dynamical field equations is identified as the 5D level: G^ (5) MN + Λ5g^ (5) MN = κ5T^ (5) MN, from which the current AdS4 structure and, after integrating out s, an effective 4D theory close to Einstein’s equations should emerge.
Donald G Palmer (Tue,) studied this question.