Homogenization of the Navier-Stokes equations in a randomly perforated domain in the inviscid limit

Abstract

We study the behaviour of the solution u to the Navier-Stokes equations with vanishing viscosity and a non-slip condition in a randomly perforated domain. We consider the space R3 where we remove N holes that are i.i.d. distributed. The behaviour depends on the particle size α=N-α/3 and the viscosity γ=N-γ/3 of the fluid. We prove quantitative convergence results to a function u, provided that the local Reynolds number is small, in the subcritical (α+γ>3) and critical (α+γ=3) regime. In the first case, u solves the Euler equations, whereas in the second case u solves the Euler-Brinkman equations. This extends the results of https://doi.org/10.1088/1361-6544/acfe56 from the periodic to the random setting. We only treat the case α>2 so that the particles do not overlap with overwhelming probability.