This paper presents a constraint based formulation of identity persistence within the Conditional Unlocking Fields (CUF) framework and applies it to the Constraint-Induced Identity Locking (CIIL) cascade. It defines the primitive CUF objects, derives a finite persistence threshold under explicit regularity assumptions, and formalizes cascade transfer as a non-erasing admissibility map across vibration, light, and morphology regimes. Empirical support is provided by the CIIL simulation architecture, where distinct upstream vibration-drive geometries are tested against six null models for downstream morphological differentiation. The paper separates formal derivation, empirical support, conjectural extensions, limitations, and falsification conditions.
Kearon Allen (Tue,) studied this question.