Diagonal Stability of Discrete-Time k-Positive Linear Systems With Applications to Nonlinear Systems
成果类型:
Article
署名作者:
Wu, Chengshuai; Margaliot, Michael
署名单位:
Tel Aviv University
刊物名称:
IEEE TRANSACTIONS ON AUTOMATIC CONTROL
ISSN/ISSBN:
0018-9286
DOI:
10.1109/TAC.2021.3115443
发表日期:
2022
页码:
4308-4313
关键词:
Compound matrix
cyclic systems
diagonal Lyapunov function
sign variation
STABILITY
wedge product
摘要:
A linear dynamical system is called k-positive if its dynamics maps the set of vectors with up to k - 1 sign variations to itself. For k = 1, this reduces to the important class of positive linear systems. Since stable positive linear time-invariant systems always admit a diagonal quadratic Lyapunov function, i.e., they are diagonally stable, we may expect that this holds also for stable kpositive systems. We show that, in general, this is not the case both in the continuous-time and discrete-time (DT) case. We then focus on DT k-positive linear systems and introduce the new notion of the DT k-diagonal stability. It is shown that this is a necessary condition for the standard DT diagonal stability. We demonstrate an application of this new notion to the analysis of a class of DT nonlinear systems.
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