Book contents
- Frontmatter
- Contents
- Preface
- List of Contributors Present at the Summer School
- 1 Controllability of Parabolic Systems: The Moment Method
- 2 Stabilization of Semilinear PDEs, and Uniform Decay under Discretization
- 3 A Null-Controllability Result for the Linear System of Thermoelastic Plates with a Single Control
- 4 Doubly Connected V-States for the Generalized Surface Quasi-geostrophic Equations
- 5 About Least-Squares Type Approach to Address Direct and Controllability Problems
- 6 A Note on the Asymptotic Stability of Wave-Type Equations with Switching Time-Delay
- 7 Ill-Posedness of Coupled Systems with Delay
- 8 Controllability of Parabolic Equations by the Flatness Approach
- 9 Mixing for the Burgers Equation Driven by a Localized Two-Dimensional Stochastic Forcing
- References
3 - A Null-Controllability Result for the Linear System of Thermoelastic Plates with a Single Control
Published online by Cambridge University Press: 25 October 2017
Book contents
- Frontmatter
- Contents
- Preface
- List of Contributors Present at the Summer School
- 1 Controllability of Parabolic Systems: The Moment Method
- 2 Stabilization of Semilinear PDEs, and Uniform Decay under Discretization
- 3 A Null-Controllability Result for the Linear System of Thermoelastic Plates with a Single Control
- 4 Doubly Connected V-States for the Generalized Surface Quasi-geostrophic Equations
- 5 About Least-Squares Type Approach to Address Direct and Controllability Problems
- 6 A Note on the Asymptotic Stability of Wave-Type Equations with Switching Time-Delay
- 7 Ill-Posedness of Coupled Systems with Delay
- 8 Controllability of Parabolic Equations by the Flatness Approach
- 9 Mixing for the Burgers Equation Driven by a Localized Two-Dimensional Stochastic Forcing
- References
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- Evolution EquationsLong Time Behavior and Control, pp. 77 - 89Publisher: Cambridge University PressPrint publication year: 2017
References
[1] , Exact controllability of a thermoelastic system with control in the thermal component only,
Diff. Integr. Eq.
13 (4–6) (2000), 613–30.Google Scholar
[2] , , The null controllability of thermoelastic plates and singularity of the associated minimal energy function,
Math. Anal. Appl.
294 (2004), 34–61.Google Scholar
[3] , , Null controllability of a thermoelastic plate,
Abstr. Appl. Anal.
7 (11) (2002), 585–99.Google Scholar
[4] E. Fernández-Caray, , Strong convergent approximations of null controls for the heat equation,
SEMA J.
61 (1) (2013), 49–78.Google Scholar
[5] , , Null controllability of the linear system of thermoelastic plates,
J. Math. Anal. App.
428 (2) (2015), 772–93.Google Scholar
[6] , , , Simultaneous exact/approximate boundary controllability of thermo-elastic plates with variable thermal coefficient and moment control,
J. Math. Anal. App.
251 (2000), 452–78.Google Scholar
[7] , ,
Controllability of Evolution Equations,
Lecture Notes Ser. 34, Seoul National University, Korea, (1996).
[8] , , Boundary control of a linear thermo-elastic beam,
J. Math. Anal. Appl.,
210 (1997), 182–205.Google Scholar
[9] , The reachability problem of thermoelastic plates,
Arch. Rat. Mech. Anal.
112 (1990), 223–67.Google Scholar
[10] , , Blowup estimates for observability of a thermoelastic system,
Asymptot. Anal.
50 (1–2) (2006), 93–120.Google Scholar
[11] , , Exact null controllability of structurally damped and thermoelastic parabolic models,
Rend. Mat. Acc. Lincei
9 (9) (1998), 43–69.Google Scholar
[12] L. de Teresa, , Controllability of the linear system of thermoelastic plates,
Adv. Diff. Eq.
1 (3) (1996), 369–402.Google Scholar
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