Strong convergence and arbitrarily slow decay of energy for a class of bilinear control problems
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Publication:923216
DOI10.1016/0022-0396(89)90177-0zbMath0711.35017OpenAlexW2069634773MaRDI QIDQ923216
Publication date: 1989
Published in: Journal of Differential Equations (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0022-0396(89)90177-0
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Related Items (5)
Small-time extinction with decay estimate of bilinear systems on Hilbert space ⋮ Time optimal control of semilinear parabolic equations via bilinear controls ⋮ Null controllability for a semilinear parabolic equation with gradient quadratic growth ⋮ Global non-negative controllability of the semilinear parabolic equation governed by bilinear control ⋮ Reachability of nonnegative equilibrium states for the semilinear vibrating string by varying its axial load and the gain of damping
Cites Work
- Unnamed Item
- Controllability and stability
- Decay rates for weakly damped systems in Hilbert space obtained with control-theoretic methods
- Feedback stabilization of distributed semilinear control systems
- Nonharmonic FOurier series in the control theory of distributed parameter systems
- Caractérisation de quelques espaces d'interpolation
- Some trigonometrical inequalities with applications to the theory of series
- Controllability for Distributed Bilinear Systems
- Shorter Notes: Strongly Continuous Semigroups, Weak Solutions, and the Variation of Constants Formula
- CONVERGENCE OF SOLUTIONS OF THE WAVE EQUATION WITH A NONLINEAR DISSIPATIVE TERM TO THE STEADY STATE
- Stabilization of Bilinear Control Systems with Applications to Nonconservative Problems in Elasticity
- Nonharmonic fourier series and the stabilization of distributed semi-linear control systems
- Controllability and Stabilizability Theory for Linear Partial Differential Equations: Recent Progress and Open Questions
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