General decay of energy for a viscoelastic equation with nonlinear damping

## Abstract The purpose of this article is to prove the energy decay of the mixed problem for a nonlinear viscoelastic rod equation equation image with dynamic boundary conditions. Copyright © 2006 John Wiley & Sons, Ltd.

## 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 This paper is concerned with the non‐linear viscoelastic equation We prove global existence of weak solutions. Furthermore, uniform decay rates of the energy are obtained assuming a strong damping Δ__u~t~__ acting in the domain and provided the relaxation function decays exponentially.