Self-Similar Solution of the Generalized Riemann Problem for Two-Dimensional Isothermal Euler Equations

IF 1.2 3区数学 Q2 MATHEMATICS, APPLIED

Journal of Mathematical Fluid Mechanics Pub Date : 2024-09-05 DOI:10.1007/s00021-024-00897-w

Wancheng Sheng, Yang Zhou

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Abstract

In this paper, a kind of classic generalized Riemann problem for 2-dimensional isothermal Euler equations for compressible gas dynamics is considered. The problem is the gas $(u_{0}, v_{0}, r_{0} \mid x \mid ^{\beta })$ in the rectangular region expands into the vacuum. We construct the solution of the following form

$$\begin{aligned} u=u(\xi , \eta ),\ v=v(\xi , \eta ),\ \rho =t^{\beta } \varrho (\xi , \eta ),\ \xi =\frac{x}{t},\ \eta =\frac{y}{t}, \end{aligned}$$

where $\rho $ and (u, v) denote the density and the velocity fields respectively, and $u_{0}, v_{0}, r_{0}>0$ and $\beta \in (-1,0) \cup (0,+\infty )$ are constants. The continuity of the self-similar solution depends on the value of $\beta $. Under certain conditions, we get a weak solution with shock wave, which is necessarily generated initially and move apart along a plane. Furthermore, by the method of characteristic analysis, we explain the mechanism of the shock wave.

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二维等温欧拉方程广义黎曼问题的自相似解

本文考虑了可压缩气体动力学二维等温欧拉方程的一种经典广义黎曼问题。问题是气体 $(u_{0}, v_{0}, r_{0} \mid x \mid ^{\beta })$在矩形区域膨胀到真空中。我们构建了如下形式的解 $$\begin{aligned} u=u(\xi , \eta ),\v=v(\xi , \eta ),\rho =t^{\beta }\varrho (\xi , \eta ),\xi =\frac{x}{t},\eta =\frac{y}{t}, \end{aligned}$$ 其中 $\rho $ 和 (u, v) 分别表示密度场和速度场，$u_{0}, v_{0}, r_{0}>；0）和（beta \in (-1,0) \cup (0,+\infty )$ 是常数。自相似解的连续性取决于 $\beta$ 的值。在一定条件下，我们会得到一个带有冲击波的弱解，它必然在初始时产生并沿着一个平面移动开来。此外，通过特征分析的方法，我们解释了冲击波的机理。

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来源期刊

Journal of Mathematical Fluid Mechanics 物理-力学

CiteScore

2.00

自引率

15.40%

发文量

审稿时长

>12 weeks

期刊介绍： The Journal of Mathematical Fluid Mechanics (JMFM)is a forum for the publication of high-quality peer-reviewed papers on the mathematical theory of fluid mechanics, with special regards to the Navier-Stokes equations. As an important part of that, the journal encourages papers dealing with mathematical aspects of computational theory, as well as with applications in science and engineering. The journal also publishes in related areas of mathematics that have a direct bearing on the mathematical theory of fluid mechanics. All papers will be characterized by originality and mathematical rigor. For a paper to be accepted, it is not enough that it contains original results. In fact, results should be highly relevant to the mathematical theory of fluid mechanics, and meet a wide readership.