This work investigates the fundamental limits and failure modes of dynamic stabilization in nonlinear systems driven by high-frequency parametric forcing. While parametric renormalization provides a powerful mechanism for suppressing instabilities via multiscale averaging, its validity is restricted by strict physical constraints. We identify three primary breakdown regimes: (i) loss of timescale separation leading to parametric resonance, (ii) amplitude-driven nonlinear radiation and secondary instabilities in continuum systems, and (iii) long-time Floquet heating in interacting quantum systems. These regimes define the operational envelope within which dynamic stabilization can be safely applied. Rather than diminishing the framework, this analysis provides the necessary physical boundaries for its controlled implementation across complex systems. This work complements existing stabilization frameworks by establishing a rigorous set of limits for non-equilibrium parametric control.
Claudia Attaianese (Mon,) studied this question.