Exponential attractor for the viscoelastic wave model with time-dependent memory kernels

TL;DR

This paper proves the existence and regularity of exponential attractors for a viscoelastic wave model with time-dependent memory kernels, advancing understanding of long-term dynamics in aging materials.

Contribution

It introduces a new method to establish exponential attractors for hyperbolic models with time-dependent memory, overcoming regularity challenges.

Findings

Existence of time-dependent exponential attractors established.

Regularity properties of the attractors proved.

Method applicable to other hyperbolic models.

Abstract

The paper is concerned with the exponential attractors for the viscoelastic wave model in $\Omega\subset \mathbb R^3$: $$u_{tt}-h_t(0)\Delta u-\int_0^\infty\partial_sh_t(s)\Delta u(t-s)\mathrm ds+f(u)=h,$$ with time-dependent memory kernel $h_t(\cdot)$ which is used to model aging phenomena of the material. Conti et al [Amer. J. Math., 2018] recently provided the correct mathematical setting for the model and a well-posedness result within the novel theory of dynamical systems acting on. time-dependent spaces, recently established by Conti, Pata and Temam [J. Differential Equations, 2013], and proved the existence and the regularity of the time-dependent global attractor. In this work, we further study the existence of the time-dependent exponential attractors as well as their regularity. We establish an abstract existence criterion via quasi-stability method introduced originally by Chueshov and Lasiecka [J. Dynam. Diff.Eqs.,2004], and on the basis of the theory and technique developed in [Amer. J. Math., 2018] we further provide a new method to overcome the difficulty of the lack of further regularity to show the existence of the time-dependent exponential attractor. And these techniques can be used to tackle other hyperbolic models.