On the regularity of weak solutions to the fluid-rigid body interaction problem
Abstract
We study a 3D fluid-rigid body interaction problem. The fluid flow is governed by 3D incompressible Navier-Stokes equations, while the motion of the rigid body is described by a system of ordinary differential equations describing conservation of linear and angular momentum. Our aim is to prove that any weak solution satisfying certain regularity conditions is smooth. This is a generalization of the classical result for the 3D incompressible Navier-Stokes equations, which says that a weak solution that additionally satisfy Prodi - Serrin Lr-Ls condition is smooth. We show that in the case of fluid - rigid body the Prodi - Serrin conditions imply W2,p and W1,p regularity for the fluid velocity and fluid pressure, respectively. Moreover, we show that solutions are C∞ if additionally we assume that the rigid body acceleration is bounded almost anywhere in time variable.
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