Averaging of equations of viscoelasticity with singularly oscillating external forces

TL;DR

This paper studies the behavior of solutions to a viscoelastic equation with singularly oscillating external forces, showing the existence of uniform attractors and their convergence to the averaged system's attractor as oscillation frequency increases.

Contribution

It introduces a framework for analyzing viscoelastic equations with highly oscillatory external forces, proving uniform attractor existence and convergence results.

Findings

Existence of uniform attractors for all small 

Boundedness of attractors uniformly in <1

Convergence of attractors to the averaged system as 

Abstract

Given $\rho\in[0,1]$, we consider for $\varepsilon\in(0,1]$ the nonautonomous viscoelastic equation with a singularly oscillating external force $$ \partial_{tt} u-\kappa(0)\Delta u - \int_0^\infty \kappa'(s)\Delta u(t-s) d s +f(u)=g_{0}(t)+\varepsilon ^{-\rho }g_{1}(t/\varepsilon ) $$ together with the {\it averaged} equation $$ \partial_{tt} u-\kappa(0)\Delta u - \int_0^\infty \kappa'(s)\Delta u(t-s) d s +f(u)=g_{0}(t). $$ Under suitable assumptions on the nonlinearity and on the external force, the related solution processes $S_\varepsilon(t,\tau)$ acting on the natural weak energy space ${\mathcal H}$ are shown to possess uniform attractors ${\mathcal A}^\varepsilon$. Within the further assumption $\rho<1$, the family ${\mathcal A}^\varepsilon$ turns out to be bounded in ${\mathcal H}$, uniformly with respect to $\varepsilon\in[0,1]$. The convergence of the attractors ${\mathcal A}^\varepsilon$ to the attractor ${\mathcal A}^0$ of the averaged equation as $\varepsilon\to 0$ is also established.