On the nature of bifurcations of solutions of the Riemann problem for the truncated Euler system

被引：0

作者：

V. V. Palin

E. V. Radkevich

机构：

[1] Lomonosov Moscow State University,

来源：

Differential Equations | 2015年 / 51卷

关键词：

Shock Wave; Riemann Problem; Shock Wave Front; Euler System; Multiple Eigenvalue;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

For the truncated Euler system, we study the problem of local reachability of points of the state space. We construct bifurcations of one-front solutions of the truncated Euler system into two-front solutions. The truncated Euler system is an example of a nonstrictly hyperbolic system of conservation laws for which there is no complete basis of eigenvectors on the critical manifold (of multiple eigenvalues) and there exists an associated vector. The constructed bifurcations of critical shock waves give an answer to the Lax problem on the behavior of a shock wave after it passes through the critical manifold in the phase space.

引用

页码：755 / 766

页数：11

共 5 条

[1] Lukashev EA(2013)On Nonclassical Regularization of the Many-Component Euler System Problemy Mat. Analiza 73 1-24
[2] Palin VV(2013)On the Nature of Bifurcations of One-Front Solutions of the Truncated Euler System Problemy Mat. Analiza 73 125-139
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