Pullback attractor for non-homogeneous micropolar fluid flows in non-smooth domains

This paper discusses the long time behavior of solutions for a two-dimensional (2D) nonautonomous micropolar fluid flow in 2D unbounded domains in which the Poincaré inequality holds. We use the energy method to obtain the so-called asymptotic compactness of the family of processes associated with t

We study the asymptotic behaviour of non-autonomous 2D Navier-Stokes equations in unbounded domains for which a Poincaré inequality holds. In particular, we give sufficient conditions for their pullback attractor to have finite fractal dimension. The existence of pullback attractors in this framewor

This paper discusses the incompressible non-Newtonian fluid with rapidly oscillating external forces g ε (x, t) = g(x, t, t/ε) possessing the average g 0 (x, t) as ε → 0 + , where 0 < ε ε 0 < 1. Firstly, with assumptions (A 1 )-(A 5 ) on the functions g(x, t, ) and g 0 (x, t), we prove that the Haus