Acta mathematica scientia, Series B >
GLOBAL WELL-POSEDNESS OF THE 2D INCOMPRESSIBLE MICROPOLAR FLUID FLOWS WITH PARTIAL VISCOSITY AND ANGULAR VISCOSITY
Received date: 2012-08-01
Online published: 2013-07-20
Supported by
This work is partially supported by NSFC (11271306).
This paper is concerned with the two-dimensional equations of incompress-ible micropolar fluid flows with mixed partial viscosity and angular viscosity. The global existence and uniqueness of smooth solution to the Cauchy problem is established.
Key words: micropolar fluid; global well-posedness; partial viscosities
CHEN Ming-Tao . GLOBAL WELL-POSEDNESS OF THE 2D INCOMPRESSIBLE MICROPOLAR FLUID FLOWS WITH PARTIAL VISCOSITY AND ANGULAR VISCOSITY[J]. Acta mathematica scientia, Series B, 2013 , 33(4) : 929 -935 . DOI: 10.1016/S0252-9602(13)60051-X
[1] Adhikari D, Cao C, Wu J. The 2D Boussinesq equations with vertical viscosity and vertical diffusivity. J Differ Eqns, 2010, 249(5): 1078–1088
[2] Dong B, Zhang Z. Global regularity of the 2D micropolar fluid flows with zero angular viscosity. J Differ Eqns, 2010, 249(1): 200–213
[3] Cao C, Wu J. Global regularity for the 2D MHD equations with mixed partial dissipation and magnetic diffusion. Adv Math, 2011, 226(2): 1803–1822
[4] Chae D. Global regularity for the 2D Boussinesq equations with partial viscosity terms. Adv Math, 2006, 203(2): 497–513
[5] Chen Q, Miao C. Global well-posedness for the micropolar fluid system in the critical Besov spaces. J Differ Eqns, 2012, 252(3): 2698–2724
[6] Danchin R, Paicu M. Global existence results for the anisotropic Boussinesq system in dimension two. Math Models Meth Appl Sci, 2011, 3: 412–457
[7] Dong B, Chen Z. Asymptotic profiles of solutions to the 2D viscous incompressible micropolar fluid flows. Discrete Contin Dyn Syst, 2009, 23(3): 765–784
[8] Eringen A C. Theory of micropolar fluids. J Math Mech, 1966, 16: 1–18
[9] Hou T Y, Li C. Global well-posedness of the viscous Boussinesq equations. Discrete Contin Dyn Sys, 2005, 12(1): 1–12
[10] Jiang S, Zhang J W, Zhao J N. Boundary-layer effects for the 2-D Boussinesq equations with vanishing diffusivity limit in the half plane. J Differ Eqns, 2011, 250(10): 3907–3936
[11] Lai M, Pan R, Zhao K. Initial boundary value problem for 2D viscous Boussinesq equations. Arch Ration Mech Anal, 2011, 199(3): 739–760
[12] Lukaszewicz G. Micropolar Fluids. Theory and Applications, Modeling and Simulation in Science, Engineering and Technology. Boston: Birkh¨auser, 1999
[13] Szopa P. On existence and regularity of solutions for 2-D micropolar fluid equations with periodic boundary conditions. Math Meth Appl Sci, 2007, 30(3): 331–346
[14] Xue L. Wellposedness and zero microrotation viscosity limit of the 2D micropolar fluid equations. Math Meth Appl Sci, 2011, 34(14): 1760–1777
[15] Yamaguchi N. Existence of global strong solution to the micropolar fluid system in a bounded domain. Math Meth Appl Sci, 2005, 28(13): 1507–1526
[16] Zhao K. 2D inviscid heat conductive Boussinesq system in a bounded domain. Michigan Math J, 2010, 59: 329–352
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