变截面管道磁气体动力学守恒律方程组的基本波（英文）

根据质量守恒定律、动量守恒定律以及能量守恒定律推导了变截面管道等熵磁气体动力学守恒律方程组.利用特征分析法给出了基本波曲线表达式.引入全局熵条件唯一确定驻波解,并证明了驻波的一些性质.     

波前为运动气流的激波-激波扰动关系式

本文首先把Whitham的波前为静止均匀气体的激波-激波扰动关系推广到波前为静止非均匀气体的情况,然后在此基础上导出波前为运动气流条件下的激波-激波扰动关系的三维矢量表达式,进而给出二维和轴对称条件下的表达式.至此,加上Chester,Whitham以及作者的工作,波前为运动气流的激波动力学方程组的完整体系已基本建立.     

Ω级数类求和公式及其在电磁理论计算中的应用

本文计算了示波管中慢波结构的电场、磁场、电感和电容的解析表达式。在实验室中制造了模型,理论值与实验值符合得很好。理论曲线与实验曲线平行。利用电感、电容的表达式,计算了阻抗的最佳值及分析了最佳条件。 本文还计算了微波中低端耦合器(对称的与不对称的情况)的电场和磁场及电感(包括内导体半径不相等和偏离对称平面的一般情况)的解析表达式,非对称情况正是目前应用中所注意的。 为了解决这些实际问题,建立了四个基本级数的求和公式和Ω级数类的求和定理、某些无穷乘积公式和Σ(k)函数的极限值。这些公式正好都在上列计算中获得应用。     

偶应力一维声子晶体中出平面Bloch波的色散特征

研究了由偶应力固体构成的周期层状结构中出平面Bloch波的色散关系.首先,给出偶应力固体中自由能密度表达式,得到了本构关系,并进一步得出位移形式的运动方程;然后,根据偶应力固体的界面条件,计算出一个典型单胞的状态矢量;再根据传递矩阵和Bloch定理,推导出Bloch波的色散关系,最后,根据数值结果讨论了微结构参数对出平面Bloch波的色散曲线以及带隙的影响.     

Bézier曲线降多阶逼近的一种方法

文献[1,2]讨论了Bezier曲线一次降多阶逼近问题,得到了很好的结果.文献[1]利用广义逆矩阵得到不保端点插值的降多阶逼近曲线的控制顶点的表达式.但却没有得到带端点任意阶插值条件的降多阶逼近曲线的控制顶点的表达式.文献[2]得到了带端点任意阶插值的降多阶逼近曲线的控制顶点的解析表达式.本文首先给出两Bezier曲线间距离的定义;然后根据降阶曲线与原曲线间的距离最小,分别得到了用矩阵表示的不保端点插值和保端点任意阶插值的降多阶逼近曲线的控制顶点的显示表达式.所给数值例子显示,用本文方法得到的降多阶逼近曲线对原曲线有很好的逼近效果.     

一种等距曲线生成与修正方法

给出了一种等距曲线生成与修正方法.从离散点出发,将其经过傅里叶本轮法拟合以获得光滑简单闭曲线,同时根据等距曲线的基本定义给出初始等距曲线表达式,并由辐角原理来判断点与曲线的关系,以此给出推进的方向关于曲线所围区域内外部的判断,再指出了会导致局部曲线病态的原因,并根据曲线自交点划分子回路,由尖点及沿原初曲线主法向量指向的侧来判别该子回路是否需要去除.     

含频散项的K(2,3)方程的精确行波解（英文）

本文研究了包含频散项的K(2,3)方程u_t+(u~2)_x-(u~3)_(xxx)=0的分支问题.利用动力系统的定性分析,并且借助Maple软件进行数值模拟得到行波解系统相应的相图,然后通过积分计算得到周期尖波解、类扭波和类反扭波的精确解的函数表达式,以及孤立波精确解的隐函数表达式.     

CH-r方程的尖波解

用动力系统的定性分析理论和数值模拟方法, 对CH-r方程的尖波解进行研究, 获得了孤立尖波和周期尖波的解析表达式, 揭示了这两种尖波解之间的一些关系, 还指出了产生尖点的原因.     

小展弦比波的Green-Naghdi渐进模型的行波解（英文）

本文研究了小展弦比波的Green-Naghdi渐进模型.利用平面自治系统的稳定性分析方法,在不同的参数条件下,讨论了它的行波系统的分岔并且给出了对应的相图,得到了光滑周期波解,广义扭波解,广义反扭波解,广义紧波解,周期尖波解,孤波解和孤立尖波解的精确表达式.进一步,通过数学软件Maple模拟了这些解.     

M.Wadati可积非线性发展方程的精确行波解

用平面动力系统方法研究由M.Wadati提出的一类可积非线性发展方程的精确行波解,获得了该方程的扭波、反扭波解,周期波解和不可数无穷多光滑孤立波解的精确的参数表达式,以及上述解存在的参数条件．     

Interaction of elementary waves for equations of potential flow

Interaction of elementary waves for equations of unsteady potential flow in gas dynamics is considered. Under the assumptions on weakness of strength of the elementary waves the structure of solutions has been given in various cases of interaction of simple wave with shock, or interaction between simple waves or shocks. Hence the complete results on interaction of weak elementary waves for second-order equation of potential flow are obtained. Project supported by the National Natural Science Foundation of China and the State Education Commission of China.     

静脉血流动力学模型基本波的相互作用北大核心CSCD

静脉系统是心血管系统的重要组成部分.脉搏波在血液流动中有着突出的重要性.本文主要研究静脉血流动力学模型基本波的相互作用.血流动力学模型是2×2严格双曲型方程组,其基本波包括疏散波和激波,属于血液流动中的脉搏波.基本波相互作用后血管截面面积和血流速度发生相应的变化.     

Solitary Wave Solutions and Kink Wave Solutions for a Generalized PC Equation

We present in this paper a generalised PC (GPC) equation which includes several known models. The corresponding traveling wave system is derived and we show that the homoclinic orbits of the traveling wave system correspond to the solitary waves of GPC equation, and the heteroclnic orbits correspond to the kink waves. Under some parameter conditions, the existence of above two types of orbits is demonstrated and the explicit expressions of the two solutions are worked out.     

The Riemann problem for an isentropic ideal dusty gas flow with a magnetic field

This paper deals with Riemann problem for one-dimensional inviscid, isentropic, and perfectly conducting ideal dusty gas flow with a transverse magnetic field. The explicit expressions of elementary waves are derived in terms of the density, velocity, and transverse magnetic induction of an ideal dusty gas flow. The analytical properties of elementary wave curves and the influence of parameter on the elementary waves are discussed. A new approach is proposed to resolve the Riemann problem. By applying this approach, we obtain 10 kinds of exact solutions and their corresponding criteria.     

血液动力学中血管流激波与驻波的相互作用

血液动力学问题是生物力学心血管系统中的重要研究课题.血管内斑块处,血管截面和血管壁的材质发生变化,对血液流动产生重要影响.血液流动中基本波及其相互作用对探究血液流动的规律、生理学意义及与疾病的关系有着重要的意义.本文研究血液动力学血液流动简化数学模型的基本波的相互作用.血管流模型是3×3非严格双曲型方程组.构造性地得到了初值为三段常状态时,血管流问题的解,即解决了激波与驻波的相互作用问题.特别地,给出四种后前激波与驻波的相互作用的结果.     

Four types of bounded wave solutions of CH-γ equation

Recently, many authors have studied the following CH-γ equation:ut + c0ux + 3uux - α2(uxxt + uuxxx + 2uxuxx) + γuxxx =0,where α2, c0 and γ are paramters. Its bounded wave solutions have been investigated mainly for the case α2 ＞ 0. For the case α2 ＜ 0, the existence of three bounded waves (regular solitary waves,compactons, periodic peakons) was pointed out by Dullin et al. But the proof has not been given.In this paper, not only the existence of four types of bounded waves: periodic waves, compacton-like waves, kink-like waves, regular solitary waves, is shown, but also their explicit expressions or implicit expressions are given for the case α2 ＜ 0. Some planar graphs of the bounded wave solutions and their numerical simulations are given to show the correctness of our results.     

Van der Waals气体Euler方程的Riemann问题及基本波的相互作用

研究了修正的等熵Van der Waals气体动力学Euler方程Riemann问题及其基本波的相互作用.利用Maxwell提出的等面积法则,将Van der Waals气体状态方程修正为与实际相符,从而守恒律方程组从混合型转化为双曲型.利用广义特征线分析法,构造性地得到了Riemann问题的解是存在的.进一步,得到了基本波相互作用.     

Solutions to a hyperbolic system of conservation laws on two boundaries

This paper studies the interaction of elementary waves including delta-shock waves on two boundaries for a hyperbolic system of conservation laws. The solutions of the initialboundary value problem for the system are constructively obtained. In the problem the initialboundary data are in piecewise constant states.     

Heteroclinic standing waves in defocusing DNLS equations: variational approach via energy minimization

We study heteroclinic standing waves (dark solitons) in discrete nonlinear Schrödinger equations with defocusing nonlinearity. Our main result is a quite elementary existence proof for waves with monotone and odd profile, and relies on minimizing an appropriately defined energy functional. We also study the continuum limit and the numerical approximation of standing waves.     

PEAKED WAVE SOLUTIONS TO A GENERALIZED HYPERELASTIC-ROD WAVE EQUATION

We study peaked wave solutions of a generalized Hyperelastic-rod wave equation describing waves in compressible hyperelastic-rods by using the bifurcation theory of planar dynamical systems and numerical simulation method. The existence domain of the peaked solitary waves are found. The analytic expressions of peaked solitary wave solutions are obtained. Our numerical simulation and qualitative results are identical.