标题
A Note on Adaptive Observer Design Method for One-Sided Lipschitz Systems
作者
关键词
-
出版物
CIRCUITS SYSTEMS AND SIGNAL PROCESSING
Volume -, Issue -, Pages -
出版商
Springer Science and Business Media LLC
发表日期
2020-07-25
DOI
10.1007/s00034-020-01505-8
参考文献
相关参考文献
注意:仅列出部分参考文献,下载原文获取全部文献信息。- An interval observer design method for asynchronous switched systems
- (2020) Jun Huang et al. IET Control Theory and Applications
- H∞-Sliding mode control of one-sided Lipschitz nonlinear systems subject to input nonlinearities and polytopic uncertainties
- (2019) Wajdi Saad et al. ISA TRANSACTIONS
- D-type iterative learning control for one-sided Lipschitz nonlinear systems
- (2019) Panpan Gu et al. INTERNATIONAL JOURNAL OF ROBUST AND NONLINEAR CONTROL
- Robust H ∞ sliding mode observer‐based fault‐tolerant control for One‐sided Lipschitz nonlinear systems
- (2019) Abbas Rastegari et al. ASIAN JOURNAL OF CONTROL
- Simultaneous Fault Estimation for Markovian Jump Systems With Generally Uncertain Transition Rates: A Reduced-Order Observer Approach
- (2019) Xiaohang Li et al. IEEE TRANSACTIONS ON INDUSTRIAL ELECTRONICS
- Unknown Input Reduced-order Observer Design for One-Sided Lipschitz Nonlinear Descriptor Markovian Jump Systems
- (2018) Jiaming Tian et al. ASIAN JOURNAL OF CONTROL
- Neuro-adaptive observer based control of flexible joint robot
- (2018) Xin Liu et al. NEUROCOMPUTING
- Consensus control for multi-agent systems with quasi-one-sided Lipschitz nonlinear dynamics via iterative learning algorithm
- (2018) Qin Fu et al. NONLINEAR DYNAMICS
- Robust Simultaneous Fault Estimation and Nonfragile Output Feedback Fault-Tolerant Control for Markovian Jump Systems
- (2018) Xiaohang Li et al. IEEE Transactions on Systems Man Cybernetics-Systems
- Distributed Consensus Control of One-Sided Lipschitz Nonlinear Multiagent Systems
- (2018) Muhammad Rehan et al. IEEE Transactions on Systems Man Cybernetics-Systems
- Observer-Based Synchronization of Chaotic Systems Satisfying Incremental Quadratic Constraints and Its Application in Secure Communication
- (2018) Younan Zhao et al. IEEE Transactions on Systems Man Cybernetics-Systems
- Sensor fault estimation for fractional-order descriptor one-sided Lipschitz systems
- (2017) Assaad Jmal et al. NONLINEAR DYNAMICS
- Reduced-order observer design for one-sided Lipschitz time-delay systems subject to unknown inputs
- (2016) Minh Cuong Nguyen et al. IET Control Theory and Applications
- Adaptive full-order and reduced-order observers for one-sided Lur'e systems with set-valued mappings
- (2016) Min-Jie Shi et al. IMA JOURNAL OF MATHEMATICAL CONTROL AND INFORMATION
- Improved exponential observer design for one-sided Lipschitz nonlinear systems
- (2016) Wei Zhang et al. INTERNATIONAL JOURNAL OF ROBUST AND NONLINEAR CONTROL
- Observer-based robust control of one-sided Lipschitz nonlinear systems
- (2016) Sohaira Ahmad et al. ISA TRANSACTIONS
- On observer-based control of one-sided Lipschitz systems
- (2016) Sohaira Ahmad et al. JOURNAL OF THE FRANKLIN INSTITUTE-ENGINEERING AND APPLIED MATHEMATICS
- Exponential Observer for a Class of One-Sided Lipschitz Stochastic Nonlinear Systems
- (2015) Asma Barbata et al. IEEE TRANSACTIONS ON AUTOMATIC CONTROL
- Unknown input observer design for one-sided Lipschitz nonlinear systems
- (2014) Wei Zhang et al. NONLINEAR DYNAMICS
- Observer-Based H ∞ Synchronization and Unknown Input Recovery for a Class of Digital Nonlinear Systems
- (2013) Wei Zhang et al. CIRCUITS SYSTEMS AND SIGNAL PROCESSING
- New Results on Output Feedback $H_{\infty} $ Control for Linear Discrete-Time Systems
- (2013) Xiao-Heng Chang et al. IEEE TRANSACTIONS ON AUTOMATIC CONTROL
- Non-linear observer design for one-sided Lipschitz systems: an linear matrix inequality approach
- (2012) W. Zhang et al. IET Control Theory and Applications
- A Note on Observers for Discrete-Time Lipschitz Nonlinear Systems
- (2011) Wei Zhang et al. IEEE TRANSACTIONS ON CIRCUITS AND SYSTEMS II-EXPRESS BRIEFS
- Reduced-order observer design for one-sided Lipschitz non-linear systems
- (2009) M. Xu et al. IMA JOURNAL OF MATHEMATICAL CONTROL AND INFORMATION
Become a Peeref-certified reviewer
The Peeref Institute provides free reviewer training that teaches the core competencies of the academic peer review process.
Get StartedAsk a Question. Answer a Question.
Quickly pose questions to the entire community. Debate answers and get clarity on the most important issues facing researchers.
Get Started