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    赵昆

    • 教授      博士生导师
    • 教师英文名称:Zhao Kun
    • 教师拼音名称:ZK
    • 所在单位:数学科学学院
    • 职务:Professor
    • 性别:男
    • 学位:哲学博士学位
    • 在职信息:在职
    • 毕业院校:Georgia Institute of Technology
    • 学科:数学
    • 学科:数学

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    论文成果

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    • [21] On the Cahn-Hilliard-Brinkman equations in R^4: global well-posedness,Annals of Applied Mathematics,2021,
    • [22] Cauchy problem of a system of parabolic conservation laws arising from the singular Keller-Segel mod,Indiana University Mathematics Journal,2021,
    • [23] Global stabilization and boundary control of generalized Fisher/KPP equation and application to diff,Journal of Differential Equations,2021,
    • [24] Initial and boundary value problem for a system of balance laws from chemotaxis: global dynamics and,Annals of Applied Mathematics,2021,
    • [25] On the degenerate Boussinesq equations on surfaces,Journal of Geometric Mechanics,2020,
    • [26] Qualitative analysis of an integrated chemotaxis-fluid model: global existence and extensibility cri,Communications in Mathematical Sciences,2020,
    • [27] Stability near hydrostatic equilibrium to the 2D Boussinesq equations without thermal diffusion,Archive for Rational Mechanics and Analysis,2020,
    • [28] Large time dynamics of 2D semi-dissipative Boussinesq systems,Nonlinearity,2020,
    • [29] Explicit decay rates for a generalized Boussinesq-Burgers system,Applied Mathematics Letters,2020,
    • [30] Optimal decay rates for a chemotaxis model with logistic growth, logarithmic sensitivity and density,Journal of Differential Equations,2020,
    • [31] Initial boundary value problems for a system of parabolic conservation laws arising from chemotaxis ,Discrete and Continuous Dynamical Systems,2019,
    • [32] Non blowup of a generalized Boussinesq-Burgers system with nonlinear dispersion relation and large d,Physica D: Nonlinear Phenomena,2019,
    • [33] On the Keller-Segel-Fisher/KPP system,Discrete and Continuous Dynamical Systems,2019,
    • [34] On a class of nonlocal SIR models,Journal of Mathematical Biology,2019,
    • [35] Long-time behavior of two-dimensional Boussinesq equations without buoyancy diffusion,Physica D: Nonlinear Phenomena,2018,
    • [36] Boundary layers and stabilization of the singular Keller-Segel model,Kinetic and Related Models,2018,
    • [37] Asymptotic and viscous stability of large-amplitude solutions of a hyperbolic system arising from bi,Indiana University Mathematics Journal,2018,
    • [38] Global Cauchy problem of a system of parabolic conservation laws arising from a Keller-Segel type ch,SIAM Journal on Mathematical Analysis,2018,
    • [39] Improved extensibility criteria and long-time behavior of a coupled chemotaxis-fluid model,Discrete and Continuous Dynamical Systems - Series B,2018,
    • [40] On the Boussinesq-Burgers equations driven by dynamic boundary conditions,Journal of Differential Equations,2018,
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