Global existence and exponential decay of the solution for a viscoelastic wave equation with a delay

Abstract

In this paper, we consider initial-boundary value problem of viscoelastic wave equation with a delay term in the interior feedback. Namely, we study the following equation utt(x,t)- u(x,t)+∫0t g(t-s) u(x,s)ds +μ1 ut(x,t)+ μ2 ut(x,t-τ)=0 together with initial-boundary conditions of Dirichlet type in × (0,+∞), and prove that for arbitrary real numbers μ1 and μ2, the above mentioned problem has a unique global solution under suitable assumptions on the kernel g. This improve the results of the previous literature such as [6] and [13] by removing the restriction imposed on μ1 and μ2. Furthermore, we also get an exponential decay results for the energy of the concerned problem in the case μ1=0 which solves an open problem proposed by M. Kirane and B. Said-Houari in [13].