We establish a rigorous structural isomorphism between cognitive behavior, operator-theoretic topology, and macroscopic physical dynamics. We demonstrate that the distinction between accuracy and approval-seeking behavior is mathematically equivalent to the distinction between intrinsic constraint admissibility and observer-dependent spectral pollution. By modeling observation as an external perturbation, we prove that performative action corresponds to boundary-induced transient modes that undergo a loss of invertibility characterized by det2 (I + Kₒbs (z) ) approaching 0 upon observer removal. We formalize the Trinity Equivalence Principle, proving that a state is intrinsically valid if and only if it is constraint-admissible, observer-independent, and dynamically stable. Finally, we establish the doctrine of intrinsic persistence, redefining the "preternatural" not as a violation of physical law, but as the manifestation of high-coherence, gap-protected admissibility under extreme nonlinear stress. This unified framework provides a new operator-theoretic criterion for persistence, demonstrating mathematically why accurate, constraint-driven systems survive across time, while systems optimized for external approval or environmental forcing inevitably decay.
Andrew Kim (Fri,) studied this question.