Finite Time Blow Up for a 1D Model of 2D Boussinesq System

被引:0
|
作者
Kyudong Choi
Alexander Kiselev
Yao Yao
机构
[1] University of Wisconsin,Department of Mathematics
[2] Rice University,Department of Mathematics
来源
Communications in Mathematical Physics | 2015年 / 334卷
关键词
Vorticity; Euler Equation; Boussinesq Equation; Global Regularity; Global Classical Solution;
D O I
暂无
中图分类号
学科分类号
摘要
The 2D conservative Boussinesq system describes inviscid, incompressible, buoyant fluid flow in a gravity field. The possibility of finite time blow up for solutions of this system is a classical problem of mathematical hydrodynamics. We consider a 1D model of the 2D Boussinesq system motivated by a particular finite time blow up scenario. We prove that finite time blow up is possible for the solutions to the model system.
引用
收藏
页码:1667 / 1679
页数:12
相关论文
共 50 条
  • [31] An FCT finite element scheme for ideal MHD equations in 1D and 2D
    Basting, Melanie
    Kuzmin, Dmitri
    JOURNAL OF COMPUTATIONAL PHYSICS, 2017, 338 : 585 - 605
  • [32] A Stochastic Wavelet Finite Element Method for 1D and 2D Structures Analysis
    Zhang, Xingwu
    Chen, Xuefeng
    Yang, Zhibo
    Li, Bing
    He, Zhengjia
    SHOCK AND VIBRATION, 2014, 2014
  • [33] Dimensions of the distribution of dielectric relaxation time: 1D versus 2D
    Bello, A
    Laredo, E
    Grimau, M
    REVISTA MEXICANA DE FISICA, 2003, 49 : 189 - 191
  • [34] Blow-up Criteria for the 2D Full Compressible MHD system
    Yuan, Baoquan
    Zhao, Xiaokui
    APPLICABLE ANALYSIS, 2014, 93 (07) : 1339 - 1357
  • [35] DECIMATION OF FINITE-DIFFERENCE TIME-DOMAIN SCHEMES IN 1D AND 2D BOUNDARY-ABSORBING ACOUSTIC MODEL SIMULATIONS
    Novello, M.
    Fontana, F.
    Bozzo, E.
    2014 IEEE INTERNATIONAL CONFERENCE ON ACOUSTICS, SPEECH AND SIGNAL PROCESSING (ICASSP), 2014,
  • [36] Speed of Convergence of Time Euler Schemes for a Stochastic 2D Boussinesq Model
    Bessaih, Hakima
    Millet, Annie
    MATHEMATICS, 2022, 10 (22)
  • [37] Parallelization of elliptic solver for solving 1D Boussinesq model
    Tarwidi, D.
    Adytia, D.
    INTERNATIONAL CONFERENCE ON DATA AND INFORMATION SCIENCE (ICODIS), 2018, 971
  • [38] 1D PERIMETER WAVES IN A CLASSICAL 2D ELECTRON-SYSTEM
    GLATTLI, DC
    ANDREI, EY
    DEVILLE, G
    WILLIAMS, FIB
    SURFACE SCIENCE, 1986, 170 (1-2) : 70 - 74
  • [39] Stability of the 2D Boussinesq System with Partial Dissipation
    Youhua Wei
    Dan Li
    Journal of Dynamics and Differential Equations, 2021, 33 : 1615 - 1624
  • [40] Stability of the 2D Boussinesq System with Partial Dissipation
    Wei, Youhua
    Li, Dan
    JOURNAL OF DYNAMICS AND DIFFERENTIAL EQUATIONS, 2021, 33 (04) : 1615 - 1624
12345