Regularity issues in the problem of fluid structure interaction

Abstract

We investigate the evolution of rigid bodies in a viscous incompressible fluid. The flow is governed by the 2D Navier-Stokes equations, set in a bounded domain with Dirichlet boundary conditions. The boundaries of the solids and the domain have H\"older regularity C1, α, 0 < α 1. First, we show the existence and uniqueness of strong solutions up to collision. A key ingredient is a BMO bound on the velocity gradient, which substitutes to the standard H2 estimate for smoother domains. Then, we study the asymptotic behaviour of one C1, α body falling over a flat surface. We show that collision is possible in finite time if and only if α < 1/2.