Viscoelasticity with time-dependent memory kernels. Part II: asymptotic behavior of solutions

TL;DR

This paper studies the long-term behavior of solutions to a time-dependent viscoelasticity model with memory effects, proving the existence of a global attractor and analyzing its properties, especially as the memory kernel evolves.

Contribution

It establishes the existence and regularity of a time-dependent global attractor for a viscoelastic model with evolving memory kernels, extending previous well-posedness results.

Findings

Existence of a time-dependent global attractor.

Regularity properties of the attractor.

Asymptotic dynamics approach a Kelvin-Voigt type model.

Abstract

We continue the analysis on the model equation arising in the theory of viscoelasticity $$ \partial_{tt} u(t)-\big[1+k_t(0)\big]\Delta u(t) -\int_0^\infty k'_t(s)\Delta u(t-s) d s + f(u(t)) = g $$ in the presence of a (convex, nonnegative and summable) memory kernel $k_t(\cdot)$ explicitly depending on time. Such a model is apt to describe, for instance, the dynamics of aging viscoelastic materials. The earlier paper [4] was concerned with the correct mathematical setting of the problem, and provided a well-posedness result within the novel theory of dynamical systems acting on time-dependent spaces, recently established by Di Plinio {\it et al.}\ [14] In this second work, we focus on the asymptotic properties of the solutions, proving the existence and the regularity of the time-dependent global attractor for the dynamical process generated by the equation. In addition, when $k_t$ approaches a multiple $m\delta_0$ of the Dirac mass at zero as $t\to\infty$, we show that the asymptotic dynamics of our problem is close to the one of its formal limit $$\partial_{tt} u(t)-\Delta u(t) -m\Delta\partial_t u(t)+ f(u(t)) = g$$ describing viscoelastic solids of Kelvin-Voigt type.