具耗散项的变更Boussinesq方程行波解的定性分析

利用平面动力系统理论和方法对具耗散项的变更Boussinesq方程作了全面的定性分析,给出了其在不同参数条件下的全局相图.并得出了具耗散项的变更Boussinesq方程有界行波解存在的条件和个数等.     

地球物理流动的MHD型三维发展方程组的大解全局L~2稳定性

本文对三维有界及无界区域上描述地球物理流动的磁流体型发展方程解的 全局Ｌ２稳定性进行了讨论．在解满足适当的条件下,证明了此解为稳定的,并得到 非强迫二维磁流体流动在三维扰动下的稳定性．     

一类带扩散项的HIV模型的平衡解的稳定性分析

研究了一类齐次Neumann边界条件下带扩散项的HIV模型.运用赫尔维茨判定定理得出正常数平衡解在一定条件下的局部渐近稳定性;当游离病毒达到一定量时,通过构造Lyapunov函数得出正常数平衡解全局稳定的条件.     

带有阻尼项的三维Boussinesq方程组解的适定性问题（英文）

本文研究带有阻尼项的三维Boussinesq方程组.在对初始值加最低正则性假设条件下,证明了强解的存在唯一性.     

三维广义MHD方程和Boussinesq方程正则性准则的注记

该文研究三维具有分数阶耗散项的广义MHD方程,得到了在负指标齐次Besov空间意义下速度场u与磁场b和的正则性准则,推广了已有结论.另外,该文还得到了三维分数阶耗散广义Boussinesq方程光滑解关于速度梯度的一个正则性准则.     

一个广义Boussinesq方程解的存在性与衰减性

文章研究一个广义Boussinesq方程的Cauchy问题.利用长短波分解、Green函数办法和能量方法,证明全局解的存在性,并且给出解的Lp衰减估计.     

脉冲接种作用下具有时滞的传染病模型分析

本文建立了一类具有潜伏期和免疫期的双时滞SEIRS传染病模型,在脉冲免疫接种和垂直传染条件下,分析了其全局动力学行为.利用频闪映射,获得了无病周期解,给出了此周期解的全局吸引性,并获得了系统一致持续生存的条件.     

双稳时滞系统波前解的全局指数稳定性

研究了双稳时滞系统波前解的全局指数稳定性.在拟单调条件下,首先利用抽象泛函微分方程理论建立了R上时滞反应扩散系统解的存在性和比较原理,然后运用基于比较原理的挤压技术证明该系统的双稳波是全局指数稳定的.     

两类Boussinesq方程的行波解分支

应用动力系统理论和方法研究两类广义Boussinesq系统. 在各种参数条件下, 严格地证明了各种可能的光滑和非光滑孤立波解、不可数无穷多周期波解和破缺波解的存在性, 计算了这些解的明显的参数表示, 并确定了这些解存在的参数条件.     

具S-型分布时滞的模糊细胞神经网络的周期解及指数稳定性

研究了一类具S-型分布时滞的模糊细胞神经网络(FCNN)的周期解及全局指数稳定性问题.在不要求激励函数全局L ipsch itz条件下,通过使用指数型二分性和Schauder不动点定理以及构造Lyapunov函数,得到了模糊细胞神经网络模型周期解和指数稳定性的一些充分条件.此外,给出一个实例说明结果是可行的.     

THE GLOBAL L~2 STABILITY OF SOLUTIONS TO THREE DIMENSIONAL MHD EQUATIONS

In this paper,we mainly study the global L2 stability for large solutions to the MHD equations in three-dimensional bounded or unbounded domains.Under suitable conditions of the large solutions,it is shown that the large solutions are stable.And we obtain the equivalent condition of this stability condition.Moreover,the global existence and the stability of two-dimensional MHD equations under three-dimensional perturbations are also established.     

Serrin-type blow-up criteria for 3D Boussinesq equations

In this article, we consider the three-dimensional Boussinesq equations with the incompressibility condition. We obtain some Serrin-type regularity conditions for the three-dimensional Boussinesq equations.     

Blow-up criteria for 3D Boussinesq equations in the multiplier space

In this paper, we consider the three-dimensional Boussinesq equations with the incompressibility condition. We obtain some regularity conditions for the three-dimensional Boussinesq equations in the multiplier space.     

A blow-up criterion for 3D Boussinesq equations in Besov spaces

In this paper, we consider the 3D Boussinesq equations with the incompressibility condition. We obtain a regularity condition for the three-dimensional Boussinesq equations by means of the Littlewood-Paley theory and Bony’s paradifferential calculus.     

Global smooth solution for the modified anisotropic 3D Boussinesq equations with damping

This paper is mainly concerned with the modified anisotropic three-dimensional Boussinesq equations with damping. We first prove the existence and uniqueness of global solution of velocity anisotropic equations. Then we establish the well-posedness of global solution of temperature anisotropic equations.     

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This paper deals with a variant Boussinesq equations which describes the propagation of shallow water waves in a lake or near an ocean beach. We derive out two hetero-B\"{a}cklund transformations between the variant Boussinesq equations and two linear parabolic equations by using the extended homogeneous balance method. We also obtain two hetero-B\"{a}cklund transformations between the variant Boussinesq equations and Burgers equations. Furthermore, we obtain two hetero-B\"{a}cklund transformation between the variant Boussinesq equations and heat equations. By using these B\"{a}cklund transformations and so-called "seed solution", we obtain a large number of explicit exact solutions of the variant Boussinesq equations. Especially, The infinite explicit exact singular wave solutions of variant Boussinesq equations are obtained for the first time. It is worth noting that these singular wave solutions of variant Boussinesq equations will blow up on some lines or curves in the $(x,t)$ plane. These facts reflect the complexity of the structure of the solution of variant Boussinesq equations. It also reflects the complexity of shallow water wave propagation from one aspect.     

Boussinesq方程解的部分正则性

本文考虑Boussinesq方程一类合适弱解的部分正则性.我们先运用广义能量不等式和奇异积分理论得到一些无维量的估计;再通过合适弱解满足的等式,运用迭代技巧,推导出温度场的小性估计;最后由尺度分析(scaling arguments)得到了一类合适弱解的部分正则性.     

一类Boussinesq型方程整体解的存在性和唯一性

证明一类6阶Boussinesq型方程Cauchy问题整体广义解和整体古典解的存在性和唯一性,给出解在有限时刻发生爆破的充分条件.     

A note on statistical solutions of the three-dimensional Navier–Stokes equations: The stationary case

Stationary statistical solutions of the three-dimensional Navier–Stokes equations for incompressible fluids are considered. They are a mathematical formalization of the notion of ensemble average for turbulent flows in statistical equilibrium in time. They are also a generalization of the notion of invariant measure to the case of the three-dimensional Navier–Stokes equations, for which a global uniqueness result is not known to exist and a semigroup may not be well-defined in the classical sense. The two classical definitions of stationary statistical solutions are considered and compared, one of them being a particular case of the other and possessing a number of useful properties. Furthermore, the so-called time-average stationary statistical solutions, obtained as generalized limits of time averages of weak solutions as the averaging time goes to infinity are shown to belong to this more restrictive class. A recurrent type result is also obtained for statistical solutions satisfying an accretion condition. Finally, the weak global attractor of the three-dimensional Navier–Stokes equations is considered, and in particular it is shown that there exists a topologically large subset of the weak global attractor which is of full measure with respect to that particular class of stationary statistical solutions and which has a certain regularity property.     

Convective Linear Stability of Solitary Waves for Boussinesq Equations

Boussinesq was the first to explain the existence of Scott Russell's solitary wave mathematically. He employed a variety of asymptotically equivalent equations to describe water waves in the small-amplitude, long-wave regime. We study the linearized stability of solitary waves for three linearly well-posed Boussinesq models. These are problems for which well-developed Lyapunov methods of stability analysis appear to fail. However, we are able to analyze the eigenvalue problem for small-amplitude solitary waves, by comparison to the equation that Boussinesq himself used to describe the solitary wave, which is now called the Korteweg–de Vries equation. With respect to a weighted norm designed to diminish as perturbations convect away from the wave profile, we prove that nonzero eigenvalues are absent in a half-plane of the form R λ>− b for some b >0, for all three Boussinesq models. This result is used to prove the decay of solutions of the evolution equations linearized about the solitary wave, in two of the models. This "convective linear stability" property has played a central role in the proof of nonlinear asymptotic stability of solitary-wave-like solutions in other systems.