Robust Invariance Conditions of Uncertain Linear Discrete Time Systems Based on Semidefinite Programming Duality

Robust Invariance Conditions of Uncertain Linear Discrete Time Systems Based on Semidefinite Programming Duality

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This article socksmith santa cruz proposes a novel robust invariance condition for uncertain linear discrete-time systems with state and control constraints, utilizing a method of semidefinite programming duality.The approach involves approximating the robust invariant set for these systems by tackling the dual problem associated with semidefinite programming.Central to this method is the formulation of a dual programming through the application of adjoint mapping.From the standpoint of semidefinite programming dual optimization, rumchata proof the paper presents a novel linear matrix inequality (LMI) conditions pertinent to robust positive invariance.Illustrative examples are incorporated to elucidate the findings.