Stabilization and Control for the Subcritical Semilinear Wave Equation in a Bounded Domain With a Cauchy-Ventcel Boundary Conditions

A. Kanoune; N. Mehidi

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Article Navigation > Applied Mathematics and Mechanics > 2008 > 29(6): 713-725

A. Kanoune, N. Mehidi. Stabilization and Control for the Subcritical Semilinear Wave Equation in a Bounded Domain With a Cauchy-Ventcel Boundary Conditions[J]. Applied Mathematics and Mechanics, 2008, 29(6): 713-725.

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Stabilization and Control for the Subcritical Semilinear Wave Equation in a Bounded Domain With a Cauchy-Ventcel Boundary Conditions

Laboratory of Applied Mathematics, University of Beja a Algeria

Received Date: 2007-04-19
Rev Recd Date: 2008-04-30
Publish Date: 2008-06-15

Abstract

Abstract

The exponential decay property of solutions of the semilinear wave equation in bounded domain of R^N(N is equals or greater than 1) with a damping term which is effective on the exterior of a ball and with boundary conditions of Cauchy-Ventcel type was analyzed. Under suitable and natural assumptions on the nonlinearity, it was proved that the exponential decay holds locally uniformly for finite energy solutions that provided the nonlinearity is subcritical at infinity. Subcriticality means, roughly speaking, that the nonlinearity grows at infinity atmost as a power is less than 5. The results obtained in R³ and R^N (N equals to or greater than 1) by B. Dehman, G. Le beau and E. Zuazua on the inequalities of the classical energy (which estimate the total energy of solutions in terms of the energy localized in the exterior of a ball) and on Strichartz's estimates, allow us to give an application to the stabilization contro llability of the semilinear wave equation in abounded domain of R^N (N equals to orgreater than 1) with a subcritical nonlinearity on the domain and its boundary and with conditions on the boundary of Cauchy-Ventcel type.
- stabilization,
- exact controllability,
- limit pro blems,
- semilinear,
- subcritical,
- partial differential equations,
- Cauchy-Ventcel

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References(7)

References

[1]	Dehman B,Lebeau G,Zuazua E.Stabilization and control for the subcritical semilinear wave equation[J].Annales Scientifiques de l'Ecole Normale Supérieure,Série4,2003,36(4):525-551.
[2]	Bardos C,Lebeau G,Rauch J.Sharp sufficient conditions for the observation,control and stabilization of waves from the boundary[J].SIAM J Control Optim,1992,30(5):1024-1065. doi: 10.1137/0330055
[3]	Gerard P. Oscillation and concentration effects in semilinear dispersive wave equation[J].J Funct Anal,1996,41(1):60-98.
[4]	Rauch J, Taylor M. Exponential decay of solutions to symmetric hyperbolic equations in bounded domains[J].Indiana University Mathematical Journal,1974,24(1):79-86. doi: 10.1512/iumj.1974.24.24004
[5]	Zuazua E. Exact controllability for the semilinear wave equation[J].J Math Pures Appl,1990,69(1):33-55.
[6]	Lions J-L.Quelques Méthodes de Résolution des Problèmes aux Limites Non-Linéaires[M].Paris: Dunod, 1969.
[7]	Lions J-L.Contrlabilité Exacte, Stabilisation et Perturbations de Systèmes Distributés[M].1.In:RMA,Vol 8, Paris: Masson,1988.