33 results
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2. New Gramians for Switched Linear Systems: Reachability, Observability, and Model Reduction.
- Author
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Pontes Duff, Igor, Grundel, Sara, and Benner, Peter
- Subjects
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LINEAR systems , *VECTOR spaces , *OBSERVABILITY (Control theory) , *GLOBAL asymptotic stability , *SYMMETRIC matrices - Abstract
In this paper, we propose new algebraic Gramians for continuous-time switched linear systems, which satisfy generalized Lyapunov equations. The main contribution of this paper is twofold. First, we show that the ranges of those Gramians encode the reachability and observability spaces of a switched linear system. As a consequence, a simple Gramian-based criterion for reachability and observability is established. Second, a balancing-based model order reduction technique is proposed and, under some sufficient conditions, stability preservation and an error bound are shown. Finally, the efficiency of the proposed method is illustrated by means of numerical examples. [ABSTRACT FROM AUTHOR]
- Published
- 2020
- Full Text
- View/download PDF
3. Dynamic Consensus Tracking of Uncertain Lagrangian Systems With a Switched Command Generator.
- Author
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Cai, He and Hu, Guoqiang
- Subjects
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UNCERTAIN systems , *TRACKING control systems , *CLOSED loop systems , *SET functions , *NONLINEAR systems - Abstract
This paper studies the consensus tracking problem of uncertain Lagrangian systems. In contrast to the existing results where the command signals are sufficiently smooth, we consider a class of nonsmooth command signals generated by a switched command generator, which might be more realistic from the perspective of practical applications. The main technical innovations of this paper are threefold. First, to enable a rigorous problem formulation, some piecewise decaying function sets are defined to precisely describe the steady-state behaviors of the tracking errors. Second, to ensure the stability of the switched nonlinear closed-loop system, a system-based scaling method with the establishment of several lemmas is developed to determine the minimal dwell time of the switching signal. Third, a quantitative analysis is performed to acquire the ultimate bound for the steady-state tracking errors. The proposed control approach is evaluated by a simulation example. [ABSTRACT FROM AUTHOR]
- Published
- 2019
- Full Text
- View/download PDF
4. Iterative Sequential Action Control for Stable, Model-Based Control of Nonlinear Systems.
- Author
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Tzorakoleftherakis, Emmanouil and Murphey, Todd D.
- Subjects
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TEST systems - Abstract
This paper presents iterative sequential action control (iSAC), a receding horizon approach for control of nonlinear systems. The iSAC method has a closed-form open-loop solution, which is iteratively updated between time steps by introducing constant control values applied for short duration. Application of a contractive constraint on the cost is shown to lead to closed-loop asymptotic stability under mild assumptions. The effect of asymptotically decaying disturbances on system trajectories is also examined. To demonstrate the applicability of iSAC, we employ a variety of systems and conditions, including a 13-dimensional quaternion-based quadrotor and NASA's Transition Region and Coronal Explorer (TRACE) spacecraft. Each system is tested in different scenarios, ranging from feasible and infeasible trajectory tracking to setpoint stabilization, with or without the presence of external disturbances. Finally, limitations of this paper are discussed. [ABSTRACT FROM AUTHOR]
- Published
- 2019
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5. Switching Stochastic Nonlinear Systems With Application to an Automotive Throttle.
- Author
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Vargas, Alessandro N., Costa, Eduardo F., Acho, Leonardo, and Do Val, Joao B. R.
- Subjects
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STOCHASTIC systems , *NONLINEAR systems , *SWITCHING systems (Telecommunication) , *RANDOM variables , *AUTOMOTIVE electronics - Abstract
This paper presents results to assure the almost sure stability of switching stochastic nonlinear systems. The switching rule governing the parameters of the system is driven by independent and identically distributed random variables. In this scenario, we prove that the switching nonlinear system is almost surely stable when appropriate matrices have spectral radius less than one. The result is particularly useful for applications, as shown in the paper by the application for an automotive electronic throttle device. The stability result was used to design a real-time controller for the automotive throttle device, and the experimental data confirm the usefulness of our approach. [ABSTRACT FROM AUTHOR]
- Published
- 2018
- Full Text
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6. A Switching Controller for a Class of MIMO Bilinear Systems With Time Delay.
- Author
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Sanchez, Tonametl, Polyakov, Andrey, Fridman, Emilia, and Hetel, Laurentiu
- Subjects
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MIMO systems , *TIME delay systems , *LINEAR matrix inequalities , *LINEAR systems - Abstract
In this paper, we propose a state-dependent switching controller for multiple-input multiple-output (MIMO) bilinear systems with constant delays in both the state and the input. The control input is assumed to be restricted to take only a finite number of values. The stability analysis of the closed loop is based on a Lyapunov–Krasovskii functional, and the design is reduced to solve a system of linear matrix inequalities. The controller can be designed by considering (state) delay-dependent or delay-independent conditions. [ABSTRACT FROM AUTHOR]
- Published
- 2020
- Full Text
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7. Detectability and Uniform Global Asymptotic Stability in Switched Nonlinear Time-Varying Systems.
- Author
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Lee, Ti-Chung, Tan, Ying, and Mareels, Iven
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TIME-varying systems , *NONLINEAR systems , *GLOBAL asymptotic stability , *DEFINITIONS - Abstract
This paper employs detectability ideas to decide uniform global asymptotic stability (UGAS) of the trivial solution for a class of switched nonlinear time-varying systems when the trivial solution is uniformly globally stable. Using the notion of limiting behaviors of the state, output, and switching signals, the concept of a limiting zeroing-output solution is introduced. This leads to a definition of weak zero-state detectability (WZSD) that can be used to check UGAS, (uniformly for a set of switched signals). En route to establish this, a number of new stability results are derived. For example, under appropriate conditions, it is feasible to decide UGAS even when the switching signal does not satisfy an averaged dwell-time condition. It is also shown that WZSD of the original switched system can be verified by detectability conditions of much simpler auxiliary systems. Moreover, UGAS can be guaranteed without requiring that in each allowable system (without switching), the trivial solution is attractive. The effectiveness of the proposed concept is illustrated by a few examples including a switched semi-quasi-Z-source inverter. [ABSTRACT FROM AUTHOR]
- Published
- 2020
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8. Continuous-Time and Sampled-Data Stabilizers for Nonlinear Systems With Input and Measurement Delays.
- Author
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Battilotti, Stefano
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NONLINEAR systems , *CONTINUOUS time systems , *TIME-varying systems , *NONLINEAR dynamical systems , *FORECASTING - Abstract
In this paper, we propose continuous-time and sampled-data output feedback controllers for nonlinear multi-input multi-output systems with time-varying measurement and input delays, with no restriction on the bound or serious limitations on the growth of the nonlinearities. A state prediction is generated by chains of saturated high-gain observers with switching error-correction terms and the state prediction is used to stabilize the system with saturated controls. The observers reconstruct the unmeasurable states at different delayed time-instants, which partition the maximal variation interval of the time-varying delays. These delayed time instant depend both on the magnitude of the delays and the growth rate of the nonlinearities. We also design sampled-data stabilizers as zero-order discretization of a hybrid modification (with continuous-time states and discrete-time control and innovations) of the continuous-time stabilizers. [ABSTRACT FROM AUTHOR]
- Published
- 2020
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9. On Input-to-State Stability of Discrete-Time Switched Nonlinear Time-Varying Systems.
- Author
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Chen, Guopei, Yang, Ying, and Li, Junmin
- Subjects
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TIME-varying systems , *NONLINEAR systems , *LYAPUNOV functions , *DISCRETE-time systems , *STABILITY criterion - Abstract
In this paper, input-to-state stability (ISS) for discrete-time switched nonlinear time-varying (SNTV) systems is investigated. Starting with discrete-time nonlinear time-varying (NTV) systems, some improved sufficient conditions are proposed to verify the ISS of systems by using the weak implication-form ISS (WI-ISS) Lyapunov function, weak dissipative-form ISS (WD-ISS) Lyapunov function, and interval descent technique. Then, the results obtained are extended to study the ISS of discrete-time SNTV systems, several relaxed conditions are given by using piecewise WI-ISS and WD-ISS Lyapunov functions, minimum dwell time, and infinite switching methods, respectively. Comparing with the existing results, the obtained conditions release the requirement on negative definiteness of the differences of (piecewise) Lyapunov functions, moreover, all subsystems are allowed to be unstable in the case of infinite switching. Finally, a numerical example is given to illustrate the theoretical results. [ABSTRACT FROM AUTHOR]
- Published
- 2019
- Full Text
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10. Low-Complexity Tracking Control of Strict-Feedback Systems With Unknown Control Directions.
- Author
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Zhang, Jin-Xi and Yang, Guang-Hong
- Subjects
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TRACKING control systems , *NONLINEAR systems , *ERROR functions , *PARAMETER estimation , *NONLINEAR functions - Abstract
This paper focuses on the problem of output tracking with prescribed transient and steady-state performance for strict-feedback systems with unknown nonlinear functions and unmatched disturbances. In lieu of Nussbaum gain techniques, parameter estimation algorithms and switching control strategies, a continuous static low-complexity control solution is provided by means of a novel combination of smooth orientation functions and error transformation functions. The proposed method possesses inherent robustness against model uncertainties, disturbances, and virtual control signal derivatives, thus eliminating the needs to introduce extra robust control schemes and compute analytic derivatives. Comparative simulation results further illustrate the above theoretical findings. [ABSTRACT FROM AUTHOR]
- Published
- 2019
- Full Text
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11. Global Stability Results for Switched Systems Based on Weak Lyapunov Functions.
- Author
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Mancilla-Aguilar, Jose L., Haimovich, Hernan, and Garcia, Rafael A.
- Subjects
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SWITCHING systems (Telecommunication) , *LYAPUNOV functions , *TIME-varying systems , *NONLINEAR dynamical systems , *PERTURBATION theory , *STABILITY of linear systems - Abstract
In this paper we study the stability of nonlinear and time-varying switched systems under restricted switching. We approach the problem by decomposing the system dynamics into a nominal-like part and a perturbation-like one. Most stability results for perturbed systems are based on the use of strong Lyapunov functions, i.e. functions of time and state whose total time derivative along the nominal system trajectories is bounded by a negative definite function of the state. However, switched systems under restricted switching may not admit strong Lyapunov functions, even when asymptotic stability is uniform over the set of switching signals considered. The main contribution of the current paper consists in providing stability results that are based on the stability of the nominal-like part of the system and require only a weak Lyapunov function. These results may have wider applicability than results based on strong Lyapunov functions. The results provided follow two lines. First, we give very general global uniform asymptotic stability results under reasonable boundedness conditions on the functions that define the dynamics of the nominal-like and the perturbation-like parts of the system. Second, we provide input-to-state stability (ISS) results for the case when the nominal-like part is switched linear-time-varying. We provide two types of ISS results: standard ISS that involves the essential supremum norm of the input and a modified ISS that involves a power-type norm. [ABSTRACT FROM AUTHOR]
- Published
- 2017
- Full Text
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12. Necessary and Sufficient Condition for Controlled Distinguishability of Continuous-Time Bilinear Systems.
- Author
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Motchon, Koffi M. D. and Pekpe, Komi M.
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DYNAMICAL systems , *LINEAR systems - Abstract
Controlled distinguishability of two dynamical systems is the property of the systems that guarantees the existence of a control input generating different outputs of the systems regardless of their initial state vectors. These inputs are referred in the literature as discerning control inputs. In this paper, a necessary and sufficient condition for controlled distinguishability of continuous-time bilinear systems is established. It generalizes the classic one provided in the literature for the class of linear systems and a method for designing discerning inputs of bilinear systems that stabilize the systems is also proposed. [ABSTRACT FROM AUTHOR]
- Published
- 2019
- Full Text
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13. Uniform Asymptotic Stability of Switched Nonlinear Time-Varying Systems and Detectability of Reduced Limiting Control Systems.
- Author
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Mancilla-Aguilar, Jose Luis and Garcia, Rafael Antonio
- Subjects
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TIME-varying systems , *GLOBAL asymptotic stability , *NONLINEAR systems , *GLOBAL analysis (Mathematics) , *FAMILY stability , *LYAPUNOV functions - Abstract
This paper is concerned with the study of both, local and global, uniform asymptotic stability for switched nonlinear time-varying (NLTV) systems through the detectability of output-maps. With this aim, the notion of reduced limiting control systems for switched NLTV systems whose switchings verify time/state-dependent constraints, and the concept of weak zero-state detectability for those reduced limiting systems are introduced. Necessary and sufficient conditions for the (global)uniform asymptotic stability of families of trajectories of the switched system are obtained in terms of this detectability property. These sufficient conditions in conjunction with the existence of multiple weak Lyapunov functions yield a criterion for the (global) uniform asymptotic stability of families of trajectories of the switched system. This criterion can be seen as an extension of the classical Krasovskii-LaSalle theorem. An interesting feature of the results is that no dwell-time assumptions are made. Moreover, they can be used for establishing the global uniform asymptotic stability of the switched NLTV system under arbitrary switchings. The effectiveness of the proposed results is illustrated by means of various interesting examples, including the stability analysis of a semiquasi-Z-source inverter [ABSTRACT FROM AUTHOR]
- Published
- 2019
- Full Text
- View/download PDF
14. Cooperative Control of Multiple Agents With Unknown High-Frequency Gain Signs Under Unbalanced and Switching Topologies.
- Author
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Wang, Qingling, Psillakis, Haris E., and Sun, Changyin
- Subjects
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MULTIAGENT systems , *TOPOLOGY , *NONLINEAR systems , *GRAPH theory , *ALGORITHMS - Abstract
Existing results on cooperative control of multiagent systems with unknown control directions require that the underlying topology is either fixed with a strongly connected graph or switching between different strongly connected graphs. Furthermore, in most cases the graph is assumed to be balanced. This paper proposes a new class of nonlinear proportional-integral (PI) based algorithms to relax these requirements and allow for unbalanced and switching topologies having a jointly strongly connected basis. This is made possible for single-integrator (SI) and double-integrator (DI) agents with nonidentical unknown control directions by a suitable selection of the distributed nonlinear PI functions. Moreover, as a special case, the proposed algorithms are applied to strongly connected and fixed graphs. Finally, simulation examples are given to show the validity of our theoretical results. [ABSTRACT FROM AUTHOR]
- Published
- 2019
- Full Text
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15. Co-Design of Controllers and a Switching Policy for Nonstrict Feedback Switched Nonlinear Systems Including First-Order Feedforward Paths.
- Author
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Li, Zhanjie and Zhao, Jun
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CRYSTAL structure , *LYAPUNOV functions , *NUMERICAL analysis , *REAL numbers , *NANOPARTICLES - Abstract
This paper studies the stabilization problem via the co-design of controllers and a switching policy for a new class of nonstrict feedback switched nonlinear systems whose subsystems consist of a chain of integrators, feedback paths, and first-order feedforward paths. Designing only smooth feedback controllers cannot deal with the unstabilizable factors caused by feedforward paths. By exploiting the single control Lyapunov function method, an effective switching policy is co-designed to compensate the controllers. In addition, we present a generalized backstepping process, based on which the solvability of virtual controllers is guaranteed, the algebraic condition for stabilizability is identified, and the transient response of the closed-loop systems is improved. Two examples demonstrate the effectiveness. [ABSTRACT FROM AUTHOR]
- Published
- 2019
- Full Text
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16. Event-Triggered Cooperative Output Regulation of Linear Multi-Agent Systems Under Jointly Connected Topologies.
- Author
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Hu, Wenfeng, Liu, Lu, and Feng, Gang
- Subjects
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MULTIAGENT systems , *TOPOLOGY , *NUMERICAL analysis , *COMMUNICATION , *NONLINEAR systems - Abstract
This paper addresses the cooperative output regulation problem of linear multi-agent systems under switching communication topologies. A distributed event-triggered control scheme is proposed so that the cooperative output regulation problem is solved with only intermittent communication. The communication topology is not required to be connected at every time instant under the jointly connected assumption. With the proposed triggering mechanism, each agent only transmits the information to its neighbors at its own triggering times or the switching times. By introducing a fixed timer, Zeno behavior is strictly excluded for each agent. The effectiveness of the proposed control scheme is demonstrated by an example. [ABSTRACT FROM AUTHOR]
- Published
- 2019
- Full Text
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17. Invariance-Like Results for Nonautonomous Switched Systems.
- Author
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Kamalapurkar, Rushikesh, Rosenfeld, Joel A., Parikh, Anup, Teel, Andrew R., and Dixon, Warren E.
- Subjects
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LYAPUNOV functions , *DIFFERENTIAL equations , *LIPSCHITZ spaces , *MATHEMATICAL optimization , *NONLINEAR analysis - Abstract
This paper generalizes the LaSalle–Yoshizawa Theorem to switched nonsmooth systems. The Filippov and Krasovskii regularizations of a switched system are shown to be contained within the convex hull of the Filippov and Krasovskii regularizations of the subsystems, respectively. A common candidate Lyapunov function that has a negative semidefinite generalized time derivative along the trajectories of the subsystems is shown to be sufficient to establish LaSalle–Yoshizawa-like results for the switched system. Of independent interest, are the results on approximate continuity and Filippov regularization of set-valued maps, reduction of differential inclusions using Lipschitz continuous regular functions, and comparative remarks on different generalizations of the time derivative along the trajectories of a nonsmooth system. [ABSTRACT FROM AUTHOR]
- Published
- 2019
- Full Text
- View/download PDF
18. Observer Design for Triangular Systems Under Weak Observability Assumptions.
- Author
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Theodosis, Dionysios, Boskos, Dimitris, and Tsinias, John
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SOLVATION , *OBSERVABILITY (Control theory) , *EMAIL systems , *NONLINEAR systems , *SWITCHING theory - Abstract
This paper presents results on the solvability of the observer design problem for general nonlinear triangular systems with inputs, under weak observability assumptions. The local state estimation is exhibited by means of a delayed time-varying Luenberger-type system. In order to achieve the global estimation, a switching sequence of observers is designed. [ABSTRACT FROM AUTHOR]
- Published
- 2018
- Full Text
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19. A Descriptor System Approach to Stability and Stabilization of Discrete-Time Switched PWA Systems.
- Author
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Zhu, Yanzheng, Zhong, Zhixiong, Basin, Michael V., and Zhou, Donghua
- Subjects
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DISCRETE-time systems , *NONLINEAR systems , *LYAPUNOV functions , *CLOSED loop systems , *NUMERICAL analysis software - Abstract
The stability and stabilization problems for a class of switched discrete-time nonlinear systems are studied in this paper. Each nonlinear subsystem of the presented switched system is modeled as a piecewise affine (PWA) one by splitting the state space into polyhedron regions. With the aid of a simple searching strategy for active state transition pairs at a switching instant, i.e., the so-called $\mathbb {S}$ -arbitrary switching approach, the stability criteria are derived via the relaxed piecewise quadratic Lyapunov function technique. Then, using the descriptor system approach, a family of PWA stabilizing controllers are designed to guarantee exponential stability of the resulting closed-loop control system, and the corresponding PWA controller gains could be calculated using numerical software. The validity and potential of the developed techniques are verified through a numerical example. [ABSTRACT FROM AUTHOR]
- Published
- 2018
- Full Text
- View/download PDF
20. Global Exponential/Finite-Time Stability of Nonlinear Adaptive Switching Systems With Applications in Controlling Systems With Unknown Control Direction.
- Author
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Chen, Weisheng, Wen, Changyun, and Wu, Jian
- Subjects
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NONLINEAR systems , *LYAPUNOV stability , *EXPONENTIAL stability , *ADAPTIVE control systems , *EIGENVALUES - Abstract
This paper focuses on the stability analysis and control of adaptive switching systems by establishing Lyapunov-based logic switching rules. Through considering performance-index-based adaptive switching control under a general framework, sufficient conditions are proposed and proved to ensure global generalized exponential stability and global finite-time stability. By taking these conditions as guidelines for designing control laws and logic switching rules, we explore their applications in controlling a class of lower-triangular nonlinear systems with an unknown control direction. [ABSTRACT FROM AUTHOR]
- Published
- 2018
- Full Text
- View/download PDF
21. A Characterization of Integral ISS for Switched and Time-Varying Systems.
- Author
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Haimovich, H. and Mancilla-Aguilar, J. L.
- Subjects
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MATHEMATICAL models of time-varying systems , *STABILITY of nonlinear systems , *INTEGRAL theorems , *SWITCHING system performance , *SYSTEM dynamics ,PERSISTENCE - Abstract
Most of the existing characterizations of the integral input-to-state stability (iISS) property are not valid for time-varying or switched systems in cases where converse Lyapunov theorems for stability are not available. This paper provides a characterization that is valid for switched and time-varying systems, and shows that natural extensions of some of the existing characterizations result in only sufficient but not necessary conditions. The results provided also pinpoint suitable iISS gains and relate these to supply functions and bounds on the function defining the system dynamics. [ABSTRACT FROM PUBLISHER]
- Published
- 2018
- Full Text
- View/download PDF
22. Cooperative Global Robust Output Regulation for Nonlinear Output Feedback Multiagent Systems Under Directed Switching Networks.
- Author
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Liu, Wei and Huang, Jie
- Subjects
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ROBUST control , *NONLINEAR systems , *FEEDBACK control systems , *MULTIAGENT systems , *LYAPUNOV functions , *INTELLIGENT agents - Abstract
In this paper, we study the cooperative global robust output regulation problem for nonlinear multiagent systems in output feedback form with any relative degree subject to directed switching networks. Through the augmentation by a distributed internal model and a distributed observer of the given system, we first convert the original problem into the global robust stabilization problem of the so-called extended augmented system, which is a multi-input-coupled switched system. Then, we establish a few technical lemmas to lay the foundation for constructing a switching control law and the corresponding multiple Lyapunov functions for the switched system. Then, we present the solvability conditions of our problem via the multiple Lyapunov functions and average dwell time method. The main result will be applied to the leader-following synchronization problem for a group of hyperchaotic Lorenz multiagent systems with a directed switching network. [ABSTRACT FROM PUBLISHER]
- Published
- 2017
- Full Text
- View/download PDF
23. Geometric Properties of Isostables and Basins of Attraction of Monotone Systems.
- Author
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Sootla, Aivar and Mauroy, Alexandre
- Subjects
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MONOTONE operators , *DYNAMICAL systems , *SYSTEMS theory , *NONLINEAR systems , *INVARIANT manifolds , *EIGENFUNCTIONS - Abstract
In this paper, we study geometric properties of basins of attraction of monotone systems. Our results are based on a combination of monotone systems theory and spectral operator theory. We exploit the framework of the Koopman operator, which provides a linear infinite-dimensional description of nonlinear dynamical systems and spectral operator-theoretic notions such as eigenvalues and eigenfunctions. The sublevel sets of the dominant eigenfunction form a family of nested forward-invariant sets and the basin of attraction is the largest of these sets. The boundaries of these sets, called isostables, allow studying temporal properties of the system. Our first observation is that the dominant eigenfunction is increasing in every variable in the case of monotone systems. This is a strong geometric property which simplifies the computation of isostables. We also show how variations in basins of attraction can be bounded under parametric uncertainty in the vector field of monotone systems. Finally, we study the properties of the parameter set for which a monotone system is multistable. Our results are illustrated on several systems of two to four dimensions. [ABSTRACT FROM PUBLISHER]
- Published
- 2017
- Full Text
- View/download PDF
24. Adaptive Finite-Time Stabilization of a Class of Uncertain Nonlinear Systems via Logic-Based Switchings.
- Author
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Fu, Jun, Ma, Ruicheng, and Chai, Tianyou
- Subjects
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NONLINEAR systems , *SWITCHING circuits , *ELECTRIC controllers , *POWER management of integrated circuits , *SYSTEMS theory , *ADAPTIVE control systems - Abstract
In this paper, global adaptive finite-time stabilization is investigated by logic-based switching control for a class of uncertain nonlinear systems with the powers of positive odd rational numbers. Parametric uncertainties entering the state equations nonlinearly can be fast time-varying or jumping at unknown time instants, and the control coefficient appearing in the control channel can be unknown. The bounds of the parametric uncertainties and the unknown control coefficient are not required to know a priori. Our proposed controller is a switching-type one, in which a nonlinear controller with two parameters to be tuned is first designed by adding a power integrator, and then a switching mechanism is proposed to tune the parameters online to finite-time stabilize the system. An example is provided to demonstrate the effectiveness of the proposed result. [ABSTRACT FROM AUTHOR]
- Published
- 2017
- Full Text
- View/download PDF
25. On Passivity of a Class of Discrete-Time Switched Nonlinear Systems.
- Author
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Wang, Yue, Gupta, Vijay, and Antsaklis, Panos J.
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NONLINEAR dynamical systems , *DISCRETE-time systems , *NONLINEAR systems , *AFFINE geometry , *SWITCHING systems (Telecommunication) , *INTEGRATED circuit interconnections - Abstract
This paper analyzes the passivity and feedback passivity of discrete-time-switched nonlinear systems with passive and nonpassive modes that are affine in the control input. When a nonpassive mode is active, the increase in storage function is not necessarily bounded by the energy supplied to the switched system at every time step. Therefore, a switched system with at least one nonpassive mode is defined to be nonpassive in the classical passivity theory. In this paper, we propose a framework to analyze the passivity of such switched systems in a more general sense. We consider switched nonlinear systems which are affine in the control input and may consist of passive, feedback passive modes, and modes which cannot be rendered passive using feedback. In the proposed framework, we prove that a switched nonlinear system is locally feedback passive if and only if its zero dynamics are locally passive. A lower bound on the ratio of total activation time between (feedback) passive and nonfeedback passive modes is obtained to guarantee passive zero dynamics. Finally, we prove that two important properties of classical passivity still hold for the proposed passivity definition, that is: 1) output feedback control can be used to stabilize the switched system, and 2) parallel and negative feedback interconnections of two such passive systems are also passive. [ABSTRACT FROM AUTHOR]
- Published
- 2014
- Full Text
- View/download PDF
26. Multiple Lyapunov Functions-Based Small-Gain Theorems for Switched Interconnected Nonlinear Systems.
- Author
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Long, Lijun
- Subjects
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LYAPUNOV functions , *NONLINEAR systems , *SMALL-gain theorem (Mathematics) , *STABILITY criterion , *DYNAMICAL systems - Abstract
Multiple Lyapunov functions (MLFs)-based small-gain theorems are presented for switched interconnected nonlinear systems with unstable subsystems, which extend the small-gain technique from its original non-switched nonlinear version to a switched nonlinear version. Each low dimensional subsystem does not necessarily have the input-to-state stability (ISS) property in the whole state space, and it only has individual ISS property in some subregions of the state space. The novelty of this paper is that integral-type MLFs and small-gain techniques are utilized to establish some MLFs-based small-gain theorems for switched interconnected nonlinear systems, which derive various stability results under some novel switching laws designed and construct integral-type MLFs. The small-gain theorems proposed cover several recent results as special cases, which also permit removal of a common restriction in which all low dimensional subsystems in switched interconnected systems are ISS or only some are ISS and others are not. Finally, two illustrative examples are presented to demonstrate the effectiveness of the results provided. [ABSTRACT FROM AUTHOR]
- Published
- 2017
- Full Text
- View/download PDF
27. Uniform Stabilization of Nonlinear Systems With Arbitrary Switchings and Dynamic Uncertainties.
- Author
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Pavlichkov, S. S., Dashkovskiy, S. N., and Pang, C. K.
- Subjects
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NONLINEAR systems , *DYNAMICAL systems , *ARBITRARY constants , *MATHEMATICAL constants , *CONSTANTS of integration - Abstract
We solve the problem of global uniform input-to-state stabilization of nonlinear switched systems with time-varying and periodic dynamics, with dynamic uncertainties, and with external disturbances. The switching signal is assumed to be unknown and the dynamics of the known components of the state vector is equivalent to the general triangular form (GTF) with non-invertible input-output maps. In our first and most general result, we prove that, if the dynamic uncertainty is treated as external disturbance, then the general triangular form system can be stabilized with arbitrarily small gain w.r.t. the dynamic uncertainty by means of a switching-independent, smooth and periodic feedback. Hence, using a suitable extension of the well-known small gain theorem to our case of switched systems with arbitrary switchings, we obtain the uniform input-to-state stabilization of the entire interconnected system. The second part of the paper addresses a more special case of triangular form (TF) switched systems with right-invertible input-output (I-O) maps with unknown switchings and with dynamic uncertainties. We show that the design becomes simpler and more constructive and the controllers become time-invariant if the dynamics is autonomous in this special case. Finally, we consider an example with explicit design of the stabilizing controllers. [ABSTRACT FROM PUBLISHER]
- Published
- 2017
- Full Text
- View/download PDF
28. A Comprehensive Method for Reachability Analysis of Uncertain Nonlinear Hybrid Systems.
- Author
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Maiga, Moussa, Ramdani, Nacim, Trave-Massuye, Louise, and Combastel, Christophe
- Subjects
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NONLINEAR systems , *DISCRETE systems , *APPROXIMATION algorithms , *MINKOWSKI space , *NONLINEAR functions - Abstract
Reachability analysis of nonlinear uncertain hybrid systems, i.e., continuous-discrete dynamical systems whose continuous dynamics, guard sets and reset functions are defined by nonlinear functions, can be decomposed in three algorithmic steps: computing the reachable set when the system is in a given operation mode, computing the discrete transitions, i.e., detecting and localizing when (and where) the continuous flowpipe intersects the guard sets, and aggregating the multiple trajectories that result from an uncertain transition once the whole flow-pipe has transitioned so that the algorithm can resume. This paper proposes a comprehensive method that provides a nicely integrated solution to the hybrid reachability problem. At the core of the method is the concept of MSPB, i.e., geometrical object obtained as the Minkowski sum of a parallelotope and an axes aligned box. MSPB are a way to control the over-approximation of the Taylor's interval integration method. As they happen to be a specific type of zonotope, they articulate perfectly with the zonotope bounding method that we propose to enclose in an optimal way the set of flowpipe trajectories generated by the transition process. The method is evaluated both theoretically by analyzing its complexity and empirically by applying it to well-chosen hybrid nonlinear examples. [ABSTRACT FROM AUTHOR]
- Published
- 2016
- Full Text
- View/download PDF
29. Maximum Hands-Off Control: A Paradigm of Control Effort Minimization.
- Author
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Nagahara, Masaaki, Quevedo, Daniel E., and Nesic, Dragan
- Subjects
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AUTOMATIC control systems , *CONTINUOUS time systems , *MATHEMATICAL equivalence , *UNIQUENESS (Mathematics) , *DISCRETE-time systems - Abstract
In this paper, we propose a paradigm of control, called a maximum hands-off control. A hands-off control is defined as a control that has a short support per unit time. The maximum hands-off control is the minimum support (or sparsest) per unit time among all controls that achieve control objectives. For finite horizon continuous-time control, we show the equivalence between the maximum hands-off control and L^1-optimal control under a uniqueness assumption called normality. This result rationalizes the use of L^1 optimality in computing a maximum hands-off control. The same result is obtained for discrete-time hands-off control. We also propose an L^1/L^2-optimal control to obtain a smooth hands-off control. Furthermore, we give a self-triggered feedback control algorithm for linear time-invariant systems, which achieves a given sparsity rate and practical stability in the case of plant disturbances. An example is included to illustrate the effectiveness of the proposed control. [ABSTRACT FROM PUBLISHER]
- Published
- 2016
- Full Text
- View/download PDF
30. Multirate Observers for Nonlinear Sampled-Data Systems Using Input-to-State Stability and Discrete-Time Approximation.
- Author
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Beikzadeh, Hossein and Marquez, Horacio J.
- Subjects
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NONLINEAR systems , *DISCRETE-time systems , *ESTIMATION theory , *COMPUTER simulation , *SPACE vehicles , *COMPARATIVE studies - Abstract
This paper is devoted to the problem of nonlinear state estimation under multirate sampling in presence of disturbance inputs. Considering a general description of a nonlinear sampled-data system, we establish a prescriptive framework for multirate observer design via an approximate discrete-time model of the plant. This framework is shown to be input-to-state stable in a semiglobal practical sense with respect to the estimation error for the unknown exact discrete-time model. A numerical example of an aerospace vehicle with input and output channels of various sampling rates demonstrates how the multirate observer can drastically improve performance compared with the single-rate observer. [ABSTRACT FROM PUBLISHER]
- Published
- 2014
- Full Text
- View/download PDF
31. Convex Design Control for Practical Nonlinear Systems.
- Author
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Baldi, Simone, Michailidis, Iakovos, Kosmatopoulos, Elias B., Papachristodoulou, Antonis, and Ioannou, Petros A.
- Subjects
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PIECEWISE linear approximation , *NONLINEAR systems , *MATHEMATICAL optimization , *CONVEX domains , *OPTIMAL control theory , *CLOSED loop systems - Abstract
This paper describes a new control scheme for approximately optimal control (AOC) of nonlinear systems, convex control design (ConvCD). The key idea of ConvCD is to transform the approximate optimal control problem into a convex semi-definite programming (SDP) problem. Contrary to the majority of existing AOC designs where the problem that is addressed is to provide a control design which approximates the performance of the optimal controller by increasing the “controller complexity,” the proposed approach addresses a different problem: given a controller of “fixed complexity” it provides a control design that renders the controller as close to the optimal as possible and, moreover, the resulted closed-loop system stable. Two numerical examples are used to show the effectiveness of the method. [ABSTRACT FROM AUTHOR]
- Published
- 2014
- Full Text
- View/download PDF
32. The Bang-Bang Funnel Controller for Uncertain Nonlinear Systems With Arbitrary Relative Degree.
- Author
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Liberzon, Daniel and Trenn, Stephan
- Subjects
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FEEDBACK control systems , *CONTROL theory (Engineering) , *TRACKING control systems , *FEASIBILITY studies , *MATHEMATICAL analysis , *NUMERICAL analysis - Abstract
The paper considers output tracking control of uncertain nonlinear systems with arbitrary known relative degree and known sign of the high frequency gain. The tracking objective is formulated in terms of a time-varying bound—a funnel—around a given reference signal. The proposed controller is bang-bang with two control values. The controller switching logic handles arbitrarily high relative degree in an inductive manner with the help of auxiliary derivative funnels. We formulate a set of feasibility assumptions under which the controller maintains the tracking error within the funnel. Furthermore, we prove that under mild additional assumptions the considered system class satisfies these feasibility assumptions if the selected control values are sufficiently large in magnitude. Finally, we study the effect of time delays in the feedback loop and we are able to show that also in this case the proposed bang-bang funnel controller works under slightly adjusted feasibility assumptions. [ABSTRACT FROM PUBLISHER]
- Published
- 2013
- Full Text
- View/download PDF
33. Input to State Stabilizing Controller for Systems With Coarse Quantization.
- Author
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Sharon, Yoav and Liberzon, Daniel
- Subjects
- *
STRUCTURAL stability , *QUANTIZATION (Physics) , *MEASURE theory , *PARAMETER estimation , *FEEDBACK control systems , *STRUCTURAL analysis (Engineering) , *NONLINEAR systems - Abstract
We consider the problem of achieving input-to-state stability (ISS) with respect to external disturbances for control systems with quantized measurements. Quantizers considered in this paper take finitely many values and have an adjustable “center” and “zoom” parameters. Both the full state feedback and the output feedback cases are considered. Similarly to previous techniques from the literature, our proposed controller switches repeatedly between “zooming out” and “zooming in.” However, here we use two modes to implement the “zooming in” phases, which allows us to attenuate an unknown disturbance while using the minimal number of quantization regions. Our analysis is trajectory-based and utilizes a cascade structure of the closed-loop hybrid system. We further show that our method is robust to modeling errors using a specially adapted small-gain theorem. The main results are developed for linear systems, but we also discuss their extension to nonlinear systems under appropriate assumptions. [ABSTRACT FROM PUBLISHER]
- Published
- 2012
- Full Text
- View/download PDF
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