半空间MHD方程组弱解的L^2衰减被引量：1

L^2 Decay for Weak Solutions of the MHD Equations in Half Space

下载PDF

导出

摘要该文利用Stokes算子的谱表示及能量估计的方法研究半空间MHD方程组初边值问题弱解的L^2衰减. In this paper, the authors mainly study the decay rate for the weak solutions of the initial value and boundary value problem for the incompressible MHD equations in half spaces. The main tool is the spectral representation and the energy estimation.

作者刘颖李佳

机构地区装甲兵工程学院基础部北京市

出处《数学物理学报（A辑）》 CSCD 北大核心 2010年第4期1166-1175,共10页 Acta Mathematica Scientia

关键词 MHD方程弱解衰减率 MHD equations Weak solutions L2 decay rate.

分类号 O175.2 [理学—基础数学]

引文网络
相关文献

参考文献16

1He C. Weighted energy inequalities for nonstationary Navier-Stokes equations. J Differential Equations, 1998, 148:422-444.
2He C, Xin Z. On the decay properties of solutions to the non-stationary Navier-Stokes equations in R3. Proc Roy Soc Edinburgh Sect A, 2001, 131:597-619.
3Bae H, Choe H J. Decay rate for the incompressible flows in half spaces. Math Z, 2001, 238:799-816.
4Bae H O, Jin B J. Temporal and spatial decays for the Navier-Stokes equations. Proc Royal Soc Edinburgh (Sect A), 2005, 135:461-477.
5Bae H O, Jin B J. Upper and Lower bounds of temporal and spatial decays for the Navier-Stokes equations. J Differential Equations, 2005, 209:365- 391.
6Sohr H. The Navier-Stokes Equations: an Elementary Funcational Analytic Approach. Bosron, Basel, Berlin: Birkhauser, 2001.
7Leray J. Sur le mouvement d'un liquide visqueux emplissant l'espace. Acta Math, 1934, 63:193-248.
8Schonbek M E. L^2 decay for weak solutions of the Navier-Stokes equations. Arch Rat Mech Anal, 1985, 88:209-222.
9Schonbek M E. Lower boundes of rates of decay for solutions to the Navier-Stokes equations. J Amer Math Soc, 1991, 4(3): 809 823.
10Schonbek M E, Schonbek T P, Endre Siili. Large-time behaviour of solutions to the magneto-hydrodynamics equations. Math Ann, 1996, 304:717-756.

同被引文献11

1DUVAUT G,LIONS J L.Inéquations en thermoélasticitéet magnétohydrodynamique[J].Arch Ration Mech Anal,1972,46(4):241-279.
2ZHAO C,HE Y.Global Ln strong solutions to magnetohydrodynamics equations in the Rn space[J].Dyn Contin Discrete Impuls Syst Ser A Math Anal,2007,14(6):805-835.
3LI Y,ZHAO C.Existence,uniqueness and decay properties of strong solutions to an evo-lutionary system of MHD type in R3[J].J Dyn Diff Eq,2006,18(2):393-462.
4KATO T.Strong Lp solutions of the Navier-Stokes equations in Rm with applications to weak solutions[J].Math Z,1984,187(41):471-480.
5SERMANGE M,TEMAM R.Some mathematical questions related to the MHD equations[J].Comm Pure Appl Math,1983,36(5):635-664.
6AGAPITO R,SCHONBEK M.Non-uniform decay of MHD equations with and without magnetic diffusion[J].Comm Part Diff Eq,2007,32(11):1791-1812.
7GUO B,ZHANG L.Decay of solutions to magnetohydrodynamics equations in two space dimensions[J].Pro R Soc Lond Ser A Math Phys Eng Sci,1995,449(1935):79-91.
8OKABE T.Lower bound of L2 decay of the Navier-Stokes flow in the half-space Rn+and its asymptotic behavior in the frequency space[J].J Math Anal Appl,2013,401(2):534-547.
9SCHONBEK M E,SCHONBEK T P,SLI E.Large-time behaviour of solutions to the magnetohydrodynamics equations[J].Math Ann,1996,304(1):717-756.
10UKAI S.A solution formula for the Stokes equation in Rn+[J].Comm Pure Appl Math,1987,40(5):611-621.

引证文献1

1吕锴.半空间上MHD方程弱解的衰减下界[J].东华大学学报（自然科学版）,2016,42(1):160-166.

1李健平,汪全珍.一类带阻尼项非线性抛物型方程的衰减性[J].阜阳师范学院学报（自然科学版）,2011,28(3):6-8.
2刘颖,李军,杜健,詹环.Boussinesq方程组弱解的L^2衰减[J].数学的实践与认识,2012,42(22):198-205.
3刘颖,董玉才.Boussinesq方程组弱解的衰减下界[J].应用数学,2011,24(4):806-813. 被引量：1
4徐红梅,曾妍.一维非线性对流扩散方程解的L_2衰减估计[J].武汉大学学报（理学版）,2015,61(6):573-576. 被引量：1
5刘艳梅,高巧琴.半空间上Boussinesq方程组弱解的L^2衰减估计[J].纯粹数学与应用数学,2014,30(6):587-594. 被引量：1
6余沛.带有分数扩散的多维Burgers方程的衰减估计[J].数学物理学报（A辑）,2016,36(2):340-352. 被引量：1
7陶群群,章飞,董柏青.广义霍尔磁流体力学方程弱解的快速衰减（英文）[J].中国科学技术大学学报,2015,45(9):727-732. 被引量：1

数学物理学报（A辑）

2010年第4期

浏览历史

内容加载中请稍等...

半空间MHD方程组弱解的L^2衰减被引量：1

参考文献16

同被引文献11

引证文献1

相关作者

相关机构

相关主题

浏览历史

半空间MHD方程组弱解的L^2衰减 被引量：1

参考文献16

同被引文献11

引证文献1

相关作者

相关机构

相关主题

浏览历史

半空间MHD方程组弱解的L^2衰减被引量：1