The preservation of the global exponential stability property for the class of fully nonlinear retarded globally Lipschitz systems with time-varying delays under suitable fast sampling is proven through this manuscript. Two main classes of time-varying delays are considered: i) piece-wise constant state delays and ii) continuous-time Lipschitz state delays. Halanay's inequality along with the equivalence between the piece-wise constant delay global exponential stability and measurable delay global exponential stability properties are exploited to demonstrate these results.
From piece-wise constant to continuous time-varying delays: Global Exponential Stability Preservation for Nonlinear Systems Under Sampling
Caiazzo, Bianca;
2024-01-01
Abstract
The preservation of the global exponential stability property for the class of fully nonlinear retarded globally Lipschitz systems with time-varying delays under suitable fast sampling is proven through this manuscript. Two main classes of time-varying delays are considered: i) piece-wise constant state delays and ii) continuous-time Lipschitz state delays. Halanay's inequality along with the equivalence between the piece-wise constant delay global exponential stability and measurable delay global exponential stability properties are exploited to demonstrate these results.File in questo prodotto:
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