Compensator design via the separation principle for a class of semilinear evolution equations
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Publication:2696196
DOI10.1007/s11253-023-02131-8OpenAlexW4319069364MaRDI QIDQ2696196
Publication date: 6 April 2023
Published in: Ukrainian Mathematical Journal (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11253-023-02131-8
Stabilization of systems by feedback (93D15) Nonlinear differential equations in abstract spaces (34G20) Control/observation systems in abstract spaces (93C25) Control/observation systems governed by ordinary differential equations (93C15)
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Cites Work
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- Nonlinear and robust control of PDE systems. Methods and applications to transport-reaction processes
- Semigroups of linear operators and applications to partial differential equations
- Compensators for infinite dimensional linear systems
- Extending a theorem of A. M. Liapunov to Hilbert space
- Stabilization and Practical Asymptotic Stability of Abstract Differential Equations
- Practical exponential stability of perturbed triangular systems and a separation principle
- Finite Dimensional Compensators for Parabolic Distributed Systems with Unbounded Control and Observation
- The Optimal Projection Equations for Finite-Dimensional Fixed-Order Dynamic Compensation of Infinite-Dimensional Systems
- Finite-Dimensional Compensators for Infinite-Dimensional Systems with Unbounded Input Operators
- Observers for systems characterized by semigroups
- Feedback stabilization of a class of distributed systems and construction of a state estimator
- Robust stabilization of infinite-dimensional systems using sliding-mode output feedback control
- A separation principle for the stabilization of a class of time delay nonlinear systems
- A SEPARATION PRINCIPLE OF TIME‐VARYING DYNAMICAL SYSTEMS: A PRACTICAL STABILITY APPROACH
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