On the Rate of Decay of the Oseen Semigroup in Exterior Domains and its Application to Navier–Stokes Equation

Abstract: We prove Lp-Lq estimates of the Oseen semigroup in n-dimensional exterior domains (n 3), which refine and improve those obtained by Kobayashi and Shibata [15]. As an application, we give a globally in time stability theory for the stationary Navier-Stokes flow whose velocity at infinity is a non-zero constant vector. We thus extend the result of Shibata [21]. In particular, we find an optimal rate of convergence of solutions of the non-stationary problem to those of the corresponding stationary problem. (2000)… Show more

“…For the nonlinear equations, Enomoto and Shibata [12] proved that u(t) L p (Ω) = o(t − 1 2 + 3 2p ) for 3 ≤ p ≤ ∞. We extend their results for p < 3 and improve the estimates for p ≥ 3.…”

“…One should note that under the assumption in the above theorem one can also get ∇u(t) L 3 (Ω) = o(t − 1 2 ) (refer to [12]). By using the results Theorem 1.1, we will derive spatial-temporal convergence rates of nonstationary solutions to the stationary solutions.…”

“…In this work, we consider the stability for the full Navier-Stokes flow on the exterior to a fixed object. In this direction, there are just a few results [12,13,31]. For the stationary case, Finn worked on such a problem [15,16].…”

“…Our goal consists of two; first, we extend the temporal convergence results in [12] to p < 3 and obtain better estimates for p ≥ 3, and secondly, we obtain the weighted stability.…”

Stability for the 3D Navier–Stokes Equations with Nonzero far Field Velocity on Exterior Domains

“…For the nonlinear equations, Enomoto and Shibata [12] proved that u(t) L p (Ω) = o(t − 1 2 + 3 2p ) for 3 ≤ p ≤ ∞. We extend their results for p < 3 and improve the estimates for p ≥ 3.…”

“…One should note that under the assumption in the above theorem one can also get ∇u(t) L 3 (Ω) = o(t − 1 2 ) (refer to [12]). By using the results Theorem 1.1, we will derive spatial-temporal convergence rates of nonstationary solutions to the stationary solutions.…”

“…In this work, we consider the stability for the full Navier-Stokes flow on the exterior to a fixed object. In this direction, there are just a few results [12,13,31]. For the stationary case, Finn worked on such a problem [15,16].…”

“…Our goal consists of two; first, we extend the temporal convergence results in [12] to p < 3 and obtain better estimates for p ≥ 3, and secondly, we obtain the weighted stability.…”

Stability for the 3D Navier–Stokes Equations with Nonzero far Field Velocity on Exterior Domains

“…The velocity u : Z T → R 3 and the pressure π : Z T → R are unknown. In previous articles, problem (1) - (3) was usually solved by semigroup theory based on estimates of the Oseen resolvent ( [4], [5], [8], [10]). Recently reference [2] proposed a potential theoretic approach which leads to solutions of (1) - (3) in the form of a sum of certain volume potentials plus a single-layer potential.…”

On boundary-driven time-dependent Oseen flows

The boundary value problems for the scalar Oseen equation