This micro-article introduces the ψ-Shadow Equation, a minimal formal construct describing the persistence of structural difference (Δψ) when classical time approaches extinction. The retentive shadow Sψ is defined as the deviation from the equilibrium floor Δψ₀, stabilized by the Ξ-node and emerging naturally from the ψ-Lagrangian. The work presents Sψ as a topological remainder independent of metric geometry and capable of surviving temporal collapse. This formulation expands the ψ⁸ architecture by establishing retentive shadows as fundamental invariants of structural continuity.
Logacheva Yulia (Sat,) studied this question.
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