EXPONENTIAL STABILITY FOR THE COUPLED KLEIN-GORDON-SCHRODINGER EQUATIONS WITH LOCALLY DISTRIBUTED DAMPING

被引：4

作者：

De Almeida, Adriana Flores ^{[1
]}

Cavalcanti, Marcelo Moreira ^{[1
]}

Zanchetta, Janaina Pedroso ^{[1
]}

机构：

[1] Univ Estadual Maringa, Dept Math, BR-87020900 Maringa, Parana, Brazil

来源：

EVOLUTION EQUATIONS AND CONTROL THEORY | 2019年 / 8卷 / 04期

关键词：

Klein-Gordon-Schrodinger; localized damping; exponential stability; asymptotic behavior; existence and uniqueness; GLOBAL-SOLUTIONS; CAUCHY-PROBLEM; WELL-POSEDNESS; WAVE-EQUATION; UNIFORM DECAY; SYSTEM; STABILIZATION; ATTRACTORS; REGULARITY; RATES;

D O I：

10.3934/eect.2019041

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

The following coupled damped Klein-Gordon-Schrodinger equations are considered i psi(t) + Delta psi + i alpha b(x) (vertical bar psi vertical bar(2) + 1)psi = phi psi chi(omega) in Omega x (0,infinity), (alpha > 0) phi(tt) - Delta phi + a(x)phi(t) = vertical bar psi vertical bar(2)chi(omega) in Omega x (0,infinity), where Omega is a bounded domain of R-2, with smooth boundary Gamma and omega is a neighbourhood of partial derivative Omega satisfying the geometric control condition. Here chi(omega) represents the characteristic function of omega. Assuming that a, b is an element of L-infinity(Omega) are nonnegative functions such that a(x) >= a(0) > 0 in omega and b(x) >= b(0) > 0 in omega, the exponential decay rate is proved for every regular solution of the above system. Our result generalizes substantially the previous ones given by Cavalcanti et. al in the reference [9] and [1].

引用

页码：847 / 865

页数：19

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