A study is made on Cauchy problem of compressible Eulers equations with relaxation term.
研究具松弛项可压缩的欧拉方程组柯西问题。
In Chapter l, we introduce the background of the research of Cauchy problem and the main methods and results of "differential" regularization.
第一章,我们阐述柯西问题的研究背景以及“微分”正则化的主要方法以及结果。
This paper by introducing integral deals with the uniqueness and stability of solution of the Cauchy problem to a form of semi-linear parabolic equation.
本文采用引进积分的方法讨论一类半线性抛物型方程柯西问题解的唯一性与稳定性。
The Cauchy problem of Euler equations with degenerate linear damping for a perfect gas is studied in this paper, while the initial gas lies in a compact domain.
本文研究了理想气体的带线性退化阻尼项的可压缩欧拉方程组的真空初值问题。
The relationship between the differentiability of solution of Cauchy problem of weak—hyperbolic differential equationand its lower term is studied in this paper.
本文讨论了一类含奇异系数双曲偏微分方程柯西问题解的可微性与低阶项之间的关系。
In this paper, the global existence and uniqueness of mild solution for the cauchy problem of a class of generalized equations of pulse transmission type with higher dimension are studied.
本文研究了一类高维广义神经传播方程初值问题的广义解整体存在性和唯一性。
In this paper, we get a method to solve a non-linear RH problem by the Cauchy-Riemann conditions and the theories of partial differential equation.
利用柯西黎曼条件和偏微分方程理论,得到了一类非线性RH问题的求解方法,并通过实例表明该方法是可行的。
In this paper, we get a method to solve a non-linear RH problem by the Cauchy-Riemann conditions and the theories of partial differential equation.
利用柯西黎曼条件和偏微分方程理论,得到了一类非线性RH问题的求解方法,并通过实例表明该方法是可行的。
应用推荐