Exponential decay for a nonlinear system of hyperbolic equations with locally distributed dampings

## Abstract In this paper we are concerned with a nonlinear viscoelastic equation with nonlinear damping. The general uniform decay of the energy is obtained. Copyright © 2008 John Wiley & Sons, Ltd.

Hyperbolic equations, exterior mixed problems, non-compactly supported initial data, local energy decay MSC (2000) 35L05; 35B40 A uniform local energy decay result is derived to a compactly perturbed hyperbolic equation with spatial variable coefficients. We shall deal with this equation in an N -d

We derive decay estimates for small disturbances of smooth traveling wave solutions of a one-dimensional, strictly hyperbolic system of partial differential equations with a zeroth order term which models relaxation in a number of physical systems.

## Abstract In this paper, we consider the non‐linear wave equation __a__,__b__>0, associated with initial and Dirichlet boundary conditions. Under suitable conditions on __α__, __m__, and __p__, we give precise decay rates for the solution. In particular, we show that for __m__=0, the decay is ex

Here we are concerned about the stability of the solution of internally damped wave equation y Y s ⌬ y q ⌬ y X with small damping constant ) 0, in a bounded domain ⍀ in R n under mixed undamped boundary conditions. A uniform expo-Ž . y␤ t Ž . nential energy decay rate E t F Me E 0 where M G 1 and ␤