Strong Lyapunov Functions for Linear Time-Varying Systems Under Persistency of Excitation
成果类型:
Article
署名作者:
Verrelli, Cristiano Maria; Tomei, Patrizio
署名单位:
University of Rome Tor Vergata
刊物名称:
IEEE TRANSACTIONS ON AUTOMATIC CONTROL
ISSN/ISSBN:
0018-9286
DOI:
10.1109/TAC.2024.3485307
发表日期:
2025
页码:
2028-2034
关键词:
Lyapunov methods
Time-varying systems
Symmetric matrices
vectors
Runtime
Robustness
projection algorithms
Parameter Estimation
observers
observability
Adaptive identification
linear time-varying systems
persistency of excitation
strong Lyapunov functions
摘要:
Linear time-varying differential equations that arise in the study of model reference adaptive identification problems are studied in both the continuous-time and the discrete-time frameworks. The original contribution of the article is to present two new strong Lyapunov functions (e.g., Lyapunov functions with negative definite derivative), assessing global uniform asymptotic stability properties under the classical persistency of excitation condition. The first Lyapunov function, in the continuous-time framework, covers general (full-order) gradient-like adaptive observer forms-possibly taking into account the presence of projection algorithms and exhibiting piecewise continuous regressor matrices-that have so far restrictively required uniform boundedness of the (everywhere defined) derivative of the regressor. The second Lyapunov function, in the discrete-time framework, owns the advantage feature of being nonanticipating (e.g., characterized by a causal time-varying matrix that is available at runtime), which allows the designer to solve further adaptation issues.