On the Asymptotic Stability Problem for Solutions of Difference Switched Systems

被引:0
作者
A. V. Platonov
机构
[1] St. Petersburg State University,
来源
Automation and Remote Control | 2018年 / 79卷
关键词
difference equations; switched systems; stability; Lyapunov functions;
D O I
暂无
中图分类号
学科分类号
摘要
We consider difference systems obtained by discretizing certain classes of differential systems. It is assumed that the system under consideration can operate in several modes. The problem is to establish conditions that guarantee the asymptotic stability of a given equilibrium position when switching regimes. We use the method of Lyapunov functions. We study the case when solutions of the system under various operating modes can have features of both linear and nonlinear behavior.
引用
收藏
页码:811 / 821
页数:10
相关论文
共 50 条
[31]   Asymptotic solutions and error estimates for linear systems of difference and differential equations [J].
Bodine, S ;
Lutz, DA .
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 2004, 290 (01) :343-362
[32]   Lyapunov Functions for Shuffle Asymptotic Stability of Discrete-Time Switched Systems [J].
Girard, Antoine ;
Mason, Paolo .
IEEE CONTROL SYSTEMS LETTERS, 2019, 3 (03) :499-504
[33]   Bounded solutions and asymptotic stability of nonlinear difference equations in the complex plane II [J].
Petropoulou, EN ;
Siafarikas, PD .
COMPUTERS & MATHEMATICS WITH APPLICATIONS, 2001, 42 (3-5) :427-452
[34]   On stability of solutions for a class of nonlinear difference systems with switching [J].
Aleksandrov, A. Yu. ;
Platonov, A. V. .
AUTOMATION AND REMOTE CONTROL, 2016, 77 (05) :779-788
[35]   Stability of Equilibrium Solutions in Planar Hamiltonian Difference Systems [J].
Carcamo, Cristian ;
Vidal, Claudio .
CANADIAN JOURNAL OF MATHEMATICS-JOURNAL CANADIEN DE MATHEMATIQUES, 2015, 67 (06) :1270-1289
[36]   Results on Uniform Asymptotic Stability of Nonlinear Time-Varying Switched Systems [J].
Lee, Ti-Chung .
2009 IEEE INTERNATIONAL CONFERENCE ON CONTROL AND AUTOMATION, VOLS 1-3, 2009, :757-762
[37]   Geometric and asymptotic properties associated with linear switched systems [J].
Chitour, Y. ;
Gaye, M. ;
Mason, P. .
JOURNAL OF DIFFERENTIAL EQUATIONS, 2015, 259 (11) :5582-5616
[38]   A LYAPUNOV CHARACTERIZATION OF ASYMPTOTIC CONTROLLABILITY FOR NONLINEAR SWITCHED SYSTEMS [J].
Wang, Yanling ;
Qi, Ailing .
BULLETIN OF THE KOREAN MATHEMATICAL SOCIETY, 2014, 51 (01) :1-11
[39]   Asymptotic stability of continuum sets of periodic solutions to systems with hysteresis [J].
Brokate, M ;
Pokrovskii, A ;
Rachinskii, D .
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 2006, 319 (01) :94-109
[40]   Global asymptotic stability for quadratic fractional difference equation [J].
Mark DiPippo ;
Ed J Janowski ;
Mustafa RS Kulenović .
Advances in Difference Equations, 2015
12345