Dynamics for a viscoelastic beam equation with past history and nonlocal boundary dissipation

Abstract

This article aims to study the long-time dynamics of the linear viscoelastic plate equation utt+2 u-∫τtg(t-s)2u(s)ds=0 subject to nonlinear and nonlocal boundary conditions. This model, with τ=0, was first considered by Cavalcanti (Discrete Contin. Dyn. Syst., 8(3), 675-695, 2002), where results of global existence and uniform decay rates of energy have been established. In this work, by taking τ=-∞, and considering the autonomous equivalent problem we prove that the dynamical system (H,St) generated by the weak solutions has a compact global attractor A (in the topology of the weak phase space H), which in subcritical case has finite dimension and smoothness. Furthermore, when the force follows the Hook Law, we prove that (H,St) possesses a (generalized) fractal exponential attractor A with finite dimension in a space H⊃H.