Averaging of equations of viscoelasticity with singularly oscillating external forces

Abstract

Given ∈[0,1], we consider for ∈(0,1] the nonautonomous viscoelastic equation with a singularly oscillating external force ∂tt u-(0) u - ∫0∞ '(s) u(t-s) d s +f(u)=g0(t)+ - g1(t/ ) together with the averaged equation ∂tt u-(0) u - ∫0∞ '(s) u(t-s) d s +f(u)=g0(t). Under suitable assumptions on the nonlinearity and on the external force, the related solution processes S(t,τ) acting on the natural weak energy space H are shown to possess uniform attractors A. Within the further assumption <1, the family A turns out to be bounded in H, uniformly with respect to ∈[0,1]. The convergence of the attractors A to the attractor A0 of the averaged equation as 0 is also established.