Spatial asymptotics of mild solutions to the time-dependent Oseen system

We consider mild solutions to the 3D time-dependent Oseen system with homogeneous Dirichlet boundary conditions, under weak assumptions on the data. Such solutions are defined via the semigroup generated by the Oseen operator in \begin{document}$ L^q. $\end{document} They turn out to be also \begin{document}$ L^q $\end{document} -weak solutions to the Oseen system. On the basis of known results about spatial asymptotics of the latter type of solutions, we then derive pointwise estimates of the spatial decay of mild solutions. The rate of decay depends in particular on \begin{document}$ L^p $\end{document} -integrability in time of the external force.

[1]  Ryuichi Mizumachi On the asymptotic behavior of incompressible viscous fluid motions past bodies , 1984 .

[2]  Y. Shibata,et al.  On the Rate of Decay of the Oseen Semigroup in Exterior Domains and its Application to Navier–Stokes Equation , 2005 .

[3]  Paul Deuring Spatial Decay of Time-Dependent Incompressible Navier-Stokes Flows with Nonzero Velocity at Infinity , 2013, SIAM J. Math. Anal..

[4]  Takayuki Kobayashi,et al.  On the Oseen equation in the three dimensional exterior domains , 1998 .

[5]  Amnon Pazy,et al.  Semigroups of Linear Operators and Applications to Partial Differential Equations , 1992, Applied Mathematical Sciences.

[6]  Lutz Weis,et al.  Operator–valued Fourier multiplier theorems and maximal $L_p$-regularity , 2001 .

[7]  P. Deuring Time-dependent incompressible viscous flows around a rigid body: Estimates of spatial decay independent of boundary conditions , 2020, Journal of Differential Equations.

[8]  R. Farwig,et al.  On the Spectrum of an Oseen-Type Operator Arising from Flow past a Rotating Body , 2008 .

[9]  P. Deuring,et al.  On Oseen resolvent estimates , 2010, Differential and Integral Equations.

[10]  T. Hishida Decay Estimates of Gradient of a Generalized Oseen Evolution Operator Arising from Time-Dependent Rigid Motions in Exterior Domains , 2019, Archive for Rational Mechanics and Analysis.

[11]  P. Deuring Pointwise spatial decay of time-dependent Oseen flows: The case of data with noncompact support , 2013 .

[12]  Tetsuro Miyakawa,et al.  On nonstationary solutions of the Navier-Stokes equations in an exterior domain , 1982 .

[13]  G. Knightly Some decay properties of solutions of the Navier-Stokes equations , 1980 .

[14]  Hideo Kozono,et al.  $L^1$-solutions of the Navier-Stokes equations in exterior domains , 1998 .

[15]  T. Hishida Large time behavior of a generalized Oseen evolution operator, with applications to the Navier–Stokes flow past a rotating obstacle , 2017, 1706.03344.

[16]  Giovanni P. Galdi,et al.  An Introduction to the Mathematical Theory of the Navier-Stokes Equations: Steady-State Problems , 2011 .

[17]  Paul Deuring,et al.  The 3D Time-Dependent Oseen System: Link Between $$L^p$$-Integrability in Time and Pointwise Decay in Space of the Velocity , 2021, Journal of Mathematical Fluid Mechanics.

[18]  E. Hille Functional Analysis And Semi-Groups , 1948 .

[19]  Y. Shibata,et al.  Local energy decay of solutions to the oseen equation in the exterior domains , 2004 .

[20]  Paul Deuring,et al.  Spatial Decay of Time-Dependent Oseen Flows , 2009, SIAM J. Math. Anal..

[21]  P. Deuring Pointwise Decay in Space and in Time for Incompressible Viscous Flow Around a Rigid Body Moving with Constant Velocity , 2017, Journal of Mathematical Fluid Mechanics.

[22]  P. Deuring Oseen resolvent estimates with small resolvent parameter , 2018, Journal of Differential Equations.