International Journal of Mathematics Trends and Technology
Volume 70 | Issue 5 | Year 2024 | Article Id. IJMTT-V70I5P105 | DOI : https://doi.org/10.14445/22315373/IJMTT-V70I5P105
| Received | Revised | Accepted | Published |
|---|---|---|---|
| 01 Mar 2024 | 30 Apr 2024 | 18 May 2024 | 30 May 2024 |
This study explores achieving stochastic stability in Semi-Markov jump systems under dynamic event-triggering mechanisms. Addressing critical challenges in system control, it investigates the feasibility of stability dynamic triggers, offering insights into enhancing system performance and reliability.
Switched nonlinear systems, Dynamic event triggering mechanism, 𝐻∞ performance, Semi-Markov jump systems, Stochastic stability.
[1] Xiaona Song et al., “Saturated-Threshold Event-Triggered Adaptive Global Prescribed Performance Control for Nonlinear Markov
Jumping Systems and Application to a Chemical Reactor Model,” Expert Systems with Applications, vol. 249, 2024.
[CrossRef] [Google Scholar] [Publisher Link]
[2] Dan Li, Shengqiang Liu, and Jing'an Cui, “Threshold Dynamics and Ergodicity of an SIRS Epidemic Model with Semi-Markov
Switching,” Journal of Differential Equations, vol. 266, no. 7, pp. 3973-4017, 2019.
[CrossRef] [Google Scholar] [Publisher Link]
[3] Yankai Li et al., “Composite Anti-Disturbance Resilient Control for Markovian Jump Nonlinear Systems with Partly Unknown Transition
Probabilities and Multiple Disturbances,” International Journal of Robust Nonlinear Control, vol.27, no. 14, pp. 2323–2337, 2017.
[CrossRef] [Google Scholar] [Publisher Link]
[4] Shuping He, “Fault Detection Filter Design for a Class of Nonlinear Markovian Jumping Systems with Mode-Dependent Time-Varying
Delays.” Nonlinear Dynamics, vol. 91, pp. 1871-1884, 2018.
[CrossRef] [Google Scholar] [Publisher Link]
[5] Haibin Sun et al., “Disturbance Attenuation and Rejection for Stochastic Markovian Jump System with Partially Known Transition
Probabilities,” Automatica, vol. 89, pp. 349–357, 2018.
[CrossRef] [Google Scholar] [Publisher Link]
[6] Lei Li et al., “Stability Analysis and Control Synthesis for Positive Semi-Markov Jump Systems with Time-Varying Delay,” Applied
Mathematics and Computation, vol. 332, pp. 363-375, 2018.
[CrossRef] [Google Scholar] [Publisher Link]
[7] Zhaowen Xu et al., “Asynchronous H∞ Control of Semi-Markov Jump Linear Systems,” Applied Mathematics and Computation, vol.
349, pp. 270-280, 2019.
[CrossRef] [Google Scholar] [Publisher Link]
[8] Qian Wang et al., “Disturbance-Observer-Based Control for Nonhomogeneous Semi-Markov Jump Systems with Time-Varying Delays,”
Journal of the Franklin Institute, vol. 361, no. 1, pp. 197-209, 2024.
[CrossRef] [Google Scholar] [Publisher Link]
[9] Yanling Wei et al., “Improved Stability and Stabilization Results for Stochastic Synchronization of Continuous-Time Semi-Markovian
Jump Neural Networks with Time-Varying Delay,” IEEE Transactions on Neural Networks and Learning Systems, vol. 29, no. 6, pp.
2488-2501, 2018.
[CrossRef] [Google Scholar] [Publisher Link]
[10] Zhang Heng-Yang et al., “A Smooth Gauss-Semi-Markov Mobility Model for Wireless Sensor Networks,” Journal of Software, vol. 19,
no. 7, pp. 1707-1715, 2008.
[Google Scholar] [Publisher Link]
[11] Zepeng Ning, Lixian Zhang, and Patrizio Colaneri, “Semi-Markov Jump Linear Systems with Incomplete Sojourn and Transition
Information: Analysis and Synthesis,” IEEE Transactions on Automatic Control, vol. 65, no. 1, pp. 159-174, 2020.
[CrossRef] [Google Scholar] [Publisher Link]
[12] Wenhai Qi, Guangdeng Zong, and Choon Ki Ahn, “Input-Output Finite-Time Asynchronous SMC for Nonlinear Semi-Markov Switching
Systems with Application,” IEEE Transactions on Systems, Man, and Cybernetics: Systems, vol. 52, no. 8, pp. 5344-5353, 2022.
[CrossRef] [Google Scholar] [Publisher Link]
[13] Dian Zhang et al., “A Flexible Terminal Approach to Stochastic Stability and Stabilization of Continuous-Time Semi-Markovian Jump
Systems with Time-Varying Delay,” Applied Mathematics and Computation, vol. 342, pp. 191-205, 2019.
[CrossRef] [Google Scholar] [Publisher Link]
[14] Wenhai Qi, Guangdeng Zong, and Wei Xing Zheng, “Adaptive Event-Triggered SMC for Stochastic Switching Systems With
SemiMarkov Process and Application to Boost Converter Circuit Model,” IEEE Transactions on Circuits and Systems I: Regular Papers,
vol. 68, pp. 786-796. 2021.
[CrossRef] [Google Scholar] [Publisher Link]
[15] Baoping Jiang et al., “Takagi-Sugeno Model Based Event-Triggered Fuzzy Sliding-Mode Control of Networked Control Systems with
Semi-Markovian Switchings,” IEEE Transactions on Fuzzy Systems, vol. 28, no. 4, pp. 673-683, 2020.
[CrossRef] [Google Scholar] [Publisher Link]
[16] Hao Shen et al., “Reliable Event-Triggered Asynchronous Extended Passive Control for Semi-Markov Jump Fuzzy Systems and Its
Application,” IEEE Transactions on Fuzzy Systems, vol. 28, no. 8, pp. 1708-1722, 2020.
[CrossRef] [Google Scholar] [Publisher Link]
[17] Huan Yu et al., “Extended Dissipative Analysis for T-S Fuzzy Semi-Markov Jump Systems with Sampled-Data Input and Actuator Fault,”
Nonlinear Analysis: Hybrid Systems, vol. 40, 2021.
[CrossRef] [Google Scholar] [Publisher Link]
[18] Doha El Hellani, Ahmed El Hajjaji, and Roger Ceschi, “Finite Frequency H∞ Filter Design for T-S Fuzzy Systems: New Approach,”
Signal Process, vol. 143, pp. 191-199, 2018.
[CrossRef] [Google Scholar] [Publisher Link]
[19] Jiankang Fang et al., “Finite-Region Asynchronous H∞ Filtering for 2-D Markov Jump Systems in Roesser Model,” Applied Mathematics
and Computation, vol. 470, 2024.
[CrossRef] [Google Scholar] [Publisher Link]
[20] Chen Peng, and Fuqiang Li, “A Survey on Recent Advances in Event-Triggered Communication and Control,” Information Sciences, vol.
457-458, pp. 113-125, 2018.
[CrossRef] [Google Scholar] [Publisher Link]
Wenhui Jia, Wenqin Wang, "Enhancing Stochastic Stability in Semi-Markov Jump Systems via Dynamic Event-Triggering Mechanisms: A Control Perspective," International Journal of Mathematics Trends and Technology (IJMTT), vol. 70, no. 5, pp. 28-34, 2024. Crossref, https://doi.org/10.14445/22315373/IJMTT-V70I5P105
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