A stabilization analysis for highly nonlinear neutral stochastic delay hybrid systems with superlinearly growing jump coefficients by variable-delay feedback control
Li, Wenrui and Fei, Chen and Shen, Mingxuan and Fei, Weiyin and Mao, Xuerong (2023) A stabilization analysis for highly nonlinear neutral stochastic delay hybrid systems with superlinearly growing jump coefficients by variable-delay feedback control. Journal of the Franklin Institute, 360 (16). pp. 11932-11964. ISSN 0016-0032 (https://doi.org/10.1016/j.jfranklin.2023.08.028)
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Abstract
In a recent paper [H. Dong, J. Tang, and X. Mao, SIAM J. Control Optim., 2022], the stability of delayed feedback control of Levy noise driven stochastic delay hybrid systems is discussed. Notably, the system assumes the absence of the neutral term and imposes the classical linear growth condition on the jump coefficients. This work aims to close the gap by imposing the superlinearly growing jump coefficients for a class of highly nonlinear neutral stochastic delay hybrid systems with Levy noise (NSDHSs-LN), where neutral-term implies that the systems depend on derivatives with delays in addition to the present and past states. We first show the existence and uniqueness theorem of the solution to the highly nonlinear NSDHSs-LN under the local Lipschitz condition, along with the moment boundedness and finiteness of the solution. We then demonstrate the moment exponential stability and almost sure exponential stability of highly nonlinear NSDHSs-LN through a variable-delay feedback control function and Lyapunov functionals. Finally, we apply our results to a concrete stabilization problem of a coupled oscillatorpendulum system with Levy noise, and some numerical analyses are presented to illustrate our theoretical results
ORCID iDs
Li, Wenrui, Fei, Chen, Shen, Mingxuan, Fei, Weiyin and Mao, Xuerong ORCID: https://orcid.org/0000-0002-6768-9864;-
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Item type: Article ID code: 86596 Dates: DateEventNovember 2023Published6 September 2023Published Online18 August 2023AcceptedSubjects: Science > Mathematics > Electronic computers. Computer science Department: Faculty of Science > Mathematics and Statistics Depositing user: Pure Administrator Date deposited: 30 Aug 2023 10:34 Last modified: 12 Dec 2024 14:58 Related URLs: URI: https://strathprints.strath.ac.uk/id/eprint/86596