Decay estimates of gradient of a generalized Oseen evolution operator arising from time-dependent rigid motions in exterior domains

Abstract

Let us consider the motion of a viscous incompressible fluid past a rotating rigid body in 3D, where the translational and angular velocities of the body are prescribed but time-dependent. In a reference frame attached to the body, we have the Navier-Stokes system with the drift and (one half of the) Coriolis terms in a fixed exterior domain. The existence of the evolution operator T(t,s) in the space Lq generated by the linearized non-autonomous system was proved by Hansel and Rhandi [26] and the large time behavior of T(t,s)f in Lr for (t-s)∞ was then developed by the present author [33] when f is taken from Lq with q≤ r. The contribution of the present paper concerns such Lq-Lr decay estimates of ∇ T(t,s) with optimal rates, which must be useful for the study of stability/attainability of the Navier-Stokes flow in several physically relevant situations. Our main theorem completely recovers the Lq-Lr estimates for the autonomous case (Stokes and Oseen semigroups, those semigroups with rotating effect) in 3D exterior domains, which were established by [37], [42], [39], [36] and [44].