English

Uniform Local Existence for Inhomogeneous Rotating Fluid Equations

Analysis of PDEs 2009-11-13 v1
Authors: Mohamed Majdoub , Marius Paicu
View on arXiv PDF DOI

Abstract

We investigate the equations of anisotropic incompressible viscous fluids in R3\R^3, rotating around an inhomogeneous vector B(t,x1,x2)B(t, x_1, x_2). We prove the global existence of strong solutions in suitable anisotropic Sobolev spaces for small initial data, as well as uniformlocal existence result with respect to the Rossby number in the same functional spaces under the additional assumption that B=B(t,x1)B=B(t,x_1) or B=B(t,x2)B=B(t,x_2). We also obtain the propagation of the isotropic Sobolev regularity using a new refined product law.

Keywords

sobolev regularity of partial differential equations global existence fluid dynamics

Cite

@article{arxiv.0806.4658,
  title  = {Uniform Local Existence for Inhomogeneous Rotating Fluid Equations},
  author = {Mohamed Majdoub and Marius Paicu},
  journal= {arXiv preprint arXiv:0806.4658},
  year   = {2009}
}

Comments

25 pages, to appear in Journal of Dynamics and Differential Equations

Related papers

View all related →
Analysis of PDEs · Mathematics
Axisymmetric Rotating Fluid Equations
Olfa Bejaoui
2008-12-15
Analysis of PDEs · Mathematics
Uniform Boundedness of Homogeneous Incompressible Flows in $\mathbb{R}^3$
Ulisse Iotti
2025-03-10
Analysis of PDEs · Mathematics
Existence of Solutions to Fluid Equations in H\"{o}lder and Uniformly Local Sobolev Spaces
David M. Ambrose, Elaine Cozzi, Daniel Erickson, James P. Kelliher
2022-06-14
Analysis of PDEs · Mathematics
Local solutions for nonhomogeneous Navier-Stokes equations with large flux
Joanna Rencławowicz, Wojciech M. Zajączkowski
2024-02-08
Analysis of PDEs · Mathematics
Anisotropic regularity of linearized compressible vortex sheets
Paolo Secchi
2020-08-14
Analysis of PDEs · Mathematics
Global large solutions to 3-D inhomogeneous Navier-Stokes system with one slow variable
Jean-Yves Chemin, Marius Paicu, Ping Zhang
2013-01-29
Analysis of PDEs · Mathematics
Dispersive effects of weakly compressible and fast rotating inviscid fluids
Van-Sang Ngo, Stefano Scrobogna
2017-08-15
Analysis of PDEs · Mathematics
On the well-posedness in Besov-Herz spaces for the inhomogeneous incompressible Euler equations
Lucas C. F. Ferreira, Daniel F. Machado
2023-08-22
Analysis of PDEs · Mathematics
On existence of spatially regular strong solutions for a class of transport equations
Jouko Tervo, Petri Kokkonen
2025-04-24
Analysis of PDEs · Mathematics
On the Oseen-type resolvent problem associated with time-periodic flow past a rotating body
Thomas Eiter
2021-11-02
Analysis of PDEs · Mathematics
Global Existence of Infinite Energy Solutions for a Perfect Incompressible Fluid
Ralph Saxton, Feride Tiglay
2009-02-27
Analysis of PDEs · Mathematics
Global Axisymmetric Euler Flows with Rotation
Yan Guo, Benoit Pausader, Klaus Widmayer
2022-10-10
Analysis of PDEs · Mathematics
Nonlinear Instability for Nonhomogeneous Incompressible Viscous Fluids
Fei Jiang, Song Jiang, Guoxi Ni
2015-06-05
Analysis of PDEs · Mathematics
Global existence of non-Newtonian incompressible fluids in half space with nonhomogeneous initial-boundary data
Tongkuen Chang, Bum Ja Jin
2024-08-06
Analysis of PDEs · Mathematics
Existence of global strong solutions in critical spaces for barotropic viscous fluids
Boris Haspot
2015-05-18
Analysis of PDEs · Mathematics
Viscous flow past a translating body with oscillating boundary
Thomas Eiter, Yoshihiro Shibata
2023-03-20
Analysis of PDEs · Mathematics
Local and global analysis in Besov-Morrey spaces for inhomogeneous Navier-Stokes equations
Lucas C. F. Ferreira, Daniel F. Machado
2023-09-04
Analysis of PDEs · Mathematics
Existence results for viscous polytropic fluids with degenerate viscosities and far field vacuum
Shengguo Zhu
2015-03-20
Analysis of PDEs · Mathematics
Kolmogorov-Type Theory of Compressible Turbulence and Inviscid Limit of the Navier-Stokes Equations in $\mathbb{R}^3$
Gui-Qiang G. Chen, James Glimm
2019-10-02
Analysis of PDEs · Mathematics
On local well-posedness of the stochastic incompressible density-dependent Euler equations
Claudia Espitia, David A. C. Mollinedo, Christian Olivera
2025-10-28
Analysis of PDEs · Mathematics
Anisotropic micropolar fluids subject to a uniform microtorque: the unstable case
Antoine Remond-Tiedrez, Ian Tice
2020-10-01
Analysis of PDEs · Mathematics
Global Solutions for Incompressible Viscoelastic Fluids
Zhen Lei, Chun Liu, Yi Zhou
2009-11-13
Analysis of PDEs · Mathematics
Steady Euler Flows with Large Vorticity and Characteristic Discontinuities in Arbitrary Infinitely Long Nozzles
Gui-Qiang G. Chen, Fei-Min Huang, Tian-Yi Wang, Wei Xiang
2019-02-19
Analysis of PDEs · Mathematics
Global uniform regularity and vanishing vertical viscosity limit for the compressible Navier--Stokes equations in the half-space
Jincheng Gao, Lianyun Peng, Jiahong Wu, Zheng-an Yao
2026-05-25
Analysis of PDEs · Mathematics
Wellposedness for density-dependent incompressible viscous fluids on the torus $\T^3$
Eugénie Poulon
2015-05-28
R2 v1 2026-06-21T10:55:20.159Z