General decay rate estimates for viscoelastic dissipative systems

## Abstract In this paper we consider the following Timoshenko system: with Dirichlet boundary conditions and initial data where __a__, __b__, __g__ and __h__ are specific functions and ρ~1~, ρ~2~, __k__~1~, __k__~2~ and __L__ are given positive constants. We establish a general stability estimat

## Abstract Let __u__ and __v__ be, respectively, the solutions to the Cauchy problems for the dissipative wave equation $$u\_{tt}+u\_t‐\Delta u=0$$\nopagenumbers\end and the heat equation $$v\_t‐\Delta v=0$$\nopagenumbers\end We show that, as $t\rightarrow+\infty$\nopagenumbers\end, the norms

Consider the initial boundary value problem for the linear dissipative wave equation ( + ∂ t )u = 0 in an exterior domain Ω ⊂ R N . Using the so-called cut-off method together with local energy decay and L 2 decays in the whole space, we study decay estimates of the solutions. In particular, when N

We consider the viscoelastic plate equation and we prove that the first and second order energies associated with its solution decay exponentially provided the kernel of the convolution also decays exponentially. When the kernel decays polynomially then the energy also decays polynomially. More prec

Some su cient conditions concerning stability of solutions of stochastic di erential evolution equations with general decay rate are ÿrst proved. Then, these results are interpreted as suitable stabilization ones for deterministic and stochastic systems. Also, they permit us to construct appropriate