Seminar

For any hyperbolic systems (the hyperbolic systems we mean here are systems

that the sepctra of the linear operator of these systems are not the pure imaginary), if

the inhomogeneous terms decrease exponentially about time t in and small, the linear

perturbations are small and the higher order perturbations are bounded, our main result

(Theorem 2.1) shows that there is a small solution that decreases exponentially in .

We take the time-dependent complex Ginaburg-andau equations, Boussinesq equations

and the duffing equations, which are infinite-dimensional and finite-dimensional systems

respectively, as examples.