Inverse of divergence and homogenization of compressible Navier-Stokes equations in randomly perforated domains

Abstract

We analyze behavior of weak solutions to compressible fluid flows in a bounded domain in R3, randomly perforated by tiny balls with random size. Assuming the radii of the balls scale like α, α > 3, with denoting the average distance between the balls, the problem homogenize with the same limiting equation. Our main contribution is a construction of the Bogovski operator, uniformly in , without any assumptions on the minimal distance between the balls.