This paper presents a minimal relaxation model for the closure of globally coherent gravitational realization following large-scale disturbance. The approach introduces no new forces, fields, or modified local dynamics, and it does not alter the equations of general relativity. A global incoherence measure Δ(t) represents the degree to which a configuration may be dynamically admissible yet not fully realized as a temporally coherent global structure. The minimal non-oscillatory closure dynamics is modeled by a first-order relaxation law: dΔ/dt = −Ω·ΔΔ(t) = Δ₀ · exp(−Ω t) Here Ω is interpreted as an effective, system-dependent closure rate rather than a propagating mode or a signal frequency. The paper clarifies how observable quantities can be treated as projections of Δ(t), for example: O(t) = O∞ + A·Δ(t) + ε(t) Two motivating contexts are discussed: (i) persistent ultra–low–frequency structure in precision timing residuals (without proposing an alternative interpretation of PTA correlated common-spectrum results), and (ii) exponential offset decay in dissociative galaxy cluster mergers: |Δx(t)| = |Δx₀| · exp(−t/τ) The aim is to provide a compact, operational formulation of global realization closure dynamics that can guide future empirical tests.
Luka Gluvić (Mon,) studied this question.
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