A Lyapunov-Krasovskii Methodology for a Class of Large-Scale Systems with Neutral-type Delays in an iISS Framework
DOI10.1007/978-3-319-18072-4_10zbMath1384.93133OpenAlexW2309595091MaRDI QIDQ4637313
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Publication date: 18 April 2018
Published in: Recent Results on Nonlinear Delay Control Systems (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/978-3-319-18072-4_10
large-scale systemsintegral input-to-state stabilityLyapunov-Krasovskii functionalsneutral-type delays
Nonlinear systems in control theory (93C10) Lyapunov and other classical stabilities (Lagrange, Poisson, (L^p, l^p), etc.) in control theory (93D05) Input-output approaches in control theory (93D25) Control/observation systems governed by ordinary differential equations (93C15) Large-scale systems (93A15)
Cites Work
- Unnamed Item
- Necessary conditions for global asymptotic stability of networks of iISS systems
- Capability and limitation of max- and sum-type construction of Lyapunov functions for networks of iISS systems
- Synchronization of cellular neural networks of neutral type via dynamic feedback controller
- A small-gain condition for iISS of interconnected retarded systems based on Lyapunov-Krasovskii functionals
- Lyapunov formulation of ISS cyclic-small-gain in continuous-time dynamical networks
- On a small gain theorem for ISS networks in dissipative Lyapunov form
- On characterizations of the input-to-state stability property
- Delay differential equations: with applications in population dynamics
- A Lyapunov--Krasovskii methodology for ISS and iISS of time-delay systems
- Stability results for systems described by coupled retarded functional differential equations and functional difference equations
- On the Lyapunov-Krasovskii methodology for the ISS of systems described by coupled delay differential and difference equations
- Comments on integral variants of ISS
- Introduction to functional differential equations
- Delay effects on stability. A robust control approach
- A Lyapunov formulation of the nonlinear small-gain theorem for interconnected ISS systems
- Construction of Lyapunov-Krasovskii functionals for networks of iISS retarded systems in small-gain formulation
- Small Gain Theorems for Large Scale Systems and Construction of ISS Lyapunov Functions
- A vector small-gain theorem for general non-linear control systems
- Methods for linear systems of circuit delay differential equations of neutral type
- A characterization of integral input-to-state stability
- Smooth stabilization implies coprime factorization
- A Nonlinear Small-Gain Theorem for Large-Scale Time Delay Systems
- Necessary and Sufficient Small Gain Conditions for Integral Input-to-State Stable Systems: A Lyapunov Perspective
- A Lyapunov Approach to Cascade Interconnection of Integral Input-to-State Stable Systems
- State-Dependent Scaling Problems and Stability of Interconnected iISS and ISS Systems
- Lyapunov Technique and Backstepping for Nonlinear Neutral Systems
- Robust Stability of Networks of iISS Systems: Construction of Sum-Type Lyapunov Functions
- Bifurcation of periodic solutions in a nonlinear difference-differential equations of neutral type
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