Uniform decay of solutions for a quasilinear system of viscoelastic equations

## Abstract We consider the following nonlinear viscoelastic equation equation image together with Dirichlet‐boundary conditions, in a bounded domain Ω and __ρ__ > 0. We prove an exponential decay result for a class of relaxation functions. Our result is established without imposing the usual rel

## Abstract In this paper the nonlinear viscoelastic wave equation in canonical form equation image with Dirichlet boundary condition is considered. By introducing a new functional and using the potential well method, we show that the damping induced by the viscoelastic term is enough to ensure g

In this paper we consider a quasilinear viscoelastic wave equation in canonical form with the homogeneous Dirichlet boundary condition. We prove that, for certain class of relaxation functions and certain initial data in the stable set, the decay rate of the solution energy is similar to that of the

## 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.