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Practical asymptotic stability of stochastic systems driven by Lévy processes and its application to control of TORA systems

K.D. Do

2020International Journal of Control17 citationsDOI

Abstract

Two Lyapunov-type theorems are developed to investigate global (practical) asymptotic stability in probability for SDEs driven by (non-vanishing) Lévy processes, which can be either affine or non-affine or both in the states. These theorems provide sufficient conditions for the stability, which are relatively easy to be verified, and thus have a potential application in control design. The theoretical development is then applied to design feedback stabilisers for global (practical) asymptotic stability in probability for a translating oscillator with a rotating actuator (TORA) system.

Topics & Concepts

Affine transformationMathematicsStability (learning theory)Exponential stabilityControl theory (sociology)Lyapunov functionApplied mathematicsControl (management)Computer sciencePure mathematicsNonlinear systemMachine learningArtificial intelligenceQuantum mechanicsPhysicsControl and Stability of Dynamical SystemsStability and Control of Uncertain SystemsChaos control and synchronization
Practical asymptotic stability of stochastic systems driven by Lévy processes and its application to control of TORA systems | Litcius