Existence and Decay of Solutions of a Nonlinear Viscoelastic Problem with a Mixed Nonhomogeneous Condition

Abstract

We study the initial-boundary value problem for a nonlinear wave equation given by utt-uxx+∫0tk(t-s)uxx(s)ds+ utq-2ut=f(x,t,u) , 0 < x < 1, 0 < t < T, ux(0,t)=u(0,t), ux(1,t)+η u(1,t)=g(t), u(x,0)=\u0(x), ut(x,0)=\u1(x), where η ≥ 0, q≥ 2 are given constants \u0, \u1, g, k, f are given functions. In part I under a certain local Lipschitzian condition on f, a global existence and uniqueness theorem is proved. The proof is based on the paper [10] associated to a contraction mapping theorem and standard arguments of density. In Part 2, under more restrictive conditions it is proved that the solution u(t) and its derivative ux(t) decay exponentially to 0 as t tends to infinity.