Existence, Uniqueness and Asymptotic Behavior of Regular Time-Periodic Viscous Flow around a Moving Body: Rotational Case

Abstract

We show existence and uniqueness for small data of regular time-periodic solutions to the Navier-Stokes problem in the exterior of a rigid body, B, that moves by time-periodic translational motion of the same period along a constant direction, 1, and spins with constant angular velocity parallel to 1. We also study the spatial asymptotic behavior of such solutions and show, in particular, that if B has a net motion characterized by a non-zero average translational velocity , then the solution exhibit a wake-like behavior in the direction - entirely analogous to that of a steady-state flow around a body that moves with velocity and angular velocity .