On the long-time behavior for a damped Navier-Stokes-Bardina model

TL;DR

This paper investigates the long-term behavior of solutions to a damped Navier-Stokes-Bardina model, establishing the existence of a global attractor, its properties, and conditions under which solutions stabilize to stationary states.

Contribution

It proves the existence and uniqueness of global solutions, constructs a global attractor, and characterizes its structure for the damped Navier-Stokes-Bardina equations.

Findings

Existence of a global attractor in the energy space.

Upper bound for the fractal dimension of the attractor.

Under certain damping conditions, solutions tend to stationary states.

Abstract

In this paper, we consider a damped Navier-Stokes-Bardina model posed on the whole three-dimensional. These equations have an important physical motivation and they arise from some oceanic model. From the mathematical point of view, they write down as the well-know Navier-Stokes equations with an additional nonlocal operator in their nonlinear transport term, and moreover, with an additional damping term depending of a parameter $\beta>0$. We study first the existence and uniqueness of global in time weak solutions in the energy space. Thereafter, our main objective is to describe the long time behavior of these solutions. For this, we use some tools in the theory of dynamical systems to prove the existence of a global attractor, which is a compact subset in the energy space attracting all the weak solutions when the time goes to infinity. Moreover, we derive an upper bound for the fractal dimension of the global attractor associated to these equations. Finally, we find a range of values for the damping parameter $\beta>0$, where we are able to give an acutely description of the internal structure of the global attractor. More precisely, we prove that the global attractor only contains the stationary (time-independing) solution of the damped Navier-Stokes-Bardina equations.