A global attractor for a fluid--plate interaction model

TL;DR

This paper proves the existence of a finite-dimensional global attractor for a coupled fluid-plate system, demonstrating fluid viscosity alone stabilizes the system without mechanical damping.

Contribution

It establishes the existence of a global attractor for a fluid-plate interaction model without requiring damping in the plate, highlighting fluid viscosity's stabilizing role.

Findings

Existence of a compact finite-dimensional global attractor.

Fluid viscosity alone stabilizes the coupled system.

Linearized model generates exponentially stable semigroup.

Abstract

We study asymptotic dynamics of a coupled system consisting of linearized 3D Navier--Stokes equations in a bounded domain and a classical (nonlinear) elastic plate equation for transversal displacement on a flexible flat part of the boundary. We show that this problem generates a semiflow on appropriate phase space. Our main result states the existence of a compact finite-dimensional global attractor for this semiflow. We do not assume any kind of mechanical damping in the plate component. Thus our results means that dissipation of the energy in the fluid due to viscosity is sufficient to stabilize the system. To achieve the result we first study the corresponding linearized model and show that this linear model generates strongly continuous exponentially stable semigroup.