This paper extends the capacity-limited recursive systems framework to nonlinear dynamics where structures appear intermittently rather than deterministically. Survival is determined by how often a structure’s activation conditions reoccur within the remaining system horizon. The paper introduces a maneuverability measure that accounts for temporal availability of directions, revealing an intermittency adversary that hides from traditional geometric monitoring. A variance-based detector exposes this behavior. Results are demonstrated on canonical nonlinear systems including chaotic recurrence and the FitzHugh–Nagumo neuron model.
Joseph DeMase (Thu,) studied this question.
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