Hostname: page-component-78c5997874-dh8gc Total loading time: 0 Render date: 2024-11-04T19:18:45.219Z Has data issue: false hasContentIssue false
  • English
  • Français

Reachability of nonnegative equilibrium statesfor the semilinear vibrating string by varying its axial load and the gain of damping

Published online by Cambridge University Press:  22 March 2006

Alexander Y. Khapalov
Alexander Y. Khapalov*
Affiliation:
Department of Mathematics, Washington State University, Pullman, WA 99164-3113, USA; [email protected]
Get access

Abstract

We show that the set of nonnegative equilibrium-like states, namely, like $ (y_d, 0) $ of the semilinear vibrating string that can be reached from any non-zero initial state $ (y_0, y_1) \in H^1_0 (0,1) \times L^2 (0,1)$ , by varying its axial load and the gain of damping, is dense in the “nonnegative” part of the subspace $ L^2 (0,1) \times \{0\} $ of $ L^2 (0,1) \times H^{-1} (0,1)$ . Our main results deal with nonlinear terms which admit at most the linear growth at infinity in $ \; y \; $ and satisfy certain restriction on their total impact on (0,∞) with respect to the time-variable.

Keywords

Semilinear wave equationapproximate controllabilitymultiplicative controlsaxial loaddamping.
Type
Research Article
Information
ESAIM: Control, Optimisation and Calculus of Variations , Volume 12 , Issue 2 , April 2006 , pp. 231 - 252
Copyright
© EDP Sciences, SMAI, 2006

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

A. Baciotti, Local Stabilizability of Nonlinear Control Systems. Ser. Adv. Math. Appl. Sci. 8 (1992).
Ball, J.M. and Slemrod, M., Feedback stabilization of semilinear control systems. Appl. Math. Opt. 5 (1979) 169179. CrossRef
Ball, J.M. and Slemrod, M., Nonharmonic Fourier series and the stabilization of distributed semi-linear control systems. Comm. Pure. Appl. Math. 32 (1979) 555587. CrossRef
J.M. Ball, J.E. Mardsen and M. Slemrod, Controllability for distributed bilinear systems. SIAM J. Contr. Optim. (1982) 575–597.
Bradley, M.E., Lenhart, S. and Yong, J., Bilinear optimal control of the velocity term in a Kirchhoff plate equation. J. Math. Anal. Appl. 238 (1999) 451467. CrossRef
Chambolle, A. and Santosa, F., Control of the wave equation by time-dependent coefficient. ESAIM: COCV 8 (2002) 375392. CrossRef
L.A. Fernández, Controllability of some semilinear parabolic problems with multiplicative control, presented at the Fifth SIAM Conference on Control and its applications, held in San Diego, July 11–14 (2001).
A.Y. Khapalov, Bilinear control for global controllability of the semilinear parabolic equations with superlinear terms, the Special volume “Control of Nonlinear Distributed Parameter Systems", dedicated to David Russell, G. Chen/I. Lasiecka/J. Zhou Eds., Marcel Dekker (2001) 139–155.
Khapalov, A.Y., Global non-negative controllability of the semilinear parabolic equation governed by bilinear control. ESAIM: COCV 7 (2002) 269283. CrossRef
Khapalov, A.Y., On bilinear controllability of the parabolic equation with the reaction-diffusion term satisfying Newton's Law. Special issue dedicated to the memory of J.-L. Lions. Computat. Appl. Math. 21 (2002) 123.
Khapalov, A.Y., Controllability of the semilinear parabolic equation governed by a multiplicative control in the reaction term: A qualitative approach. SIAM J. Control. Optim. 41 (2003) 18861900. CrossRef
Khapalov, A.Y., Bilinear controllability properties of a vibrating string with variable axial load and damping gain. Dynamics Cont. Discrete. Impulsive Systems 10 (2003) 721743.
Khapalov, A.Y., Controllability properties of a vibrating string with variable axial load. Discrete Control Dynamical Systems 11 (2004) 311324. CrossRef
Kime, K., Simultaneous control of a rod equation and a simple Schrödinger equation. Syst. Control Lett. 24 (1995) 301306. CrossRef
Lenhart, S., Optimal control of convective-diffusive fluid problem. Math. Models Methods Appl. Sci. 5 (1995) 225237. CrossRef
Lenhart, S. and Liang, M., Bilinear optimal control for a wave equation with viscous damping. Houston J. Math. 26 (2000) 575595.
Liang, M., Bilinear optimal control for a wave equation. Math. Models Methods Appl. Sci. 9 (1999) 4568. CrossRef
Müller, S., Strong convergence and arbitrarily slow decay of energy for a class of bilinear control problems. J. Differ. Equ. 81 (1989) 5067. CrossRef