Resonance in rarefaction and shock curves: Local analysis and numerics of the continuation method

IF 0.5 4区数学 Q4 MATHEMATICS, APPLIED Journal of Hyperbolic Differential Equations Pub Date : 2019-02-11 DOI:10.1142/S0219891620500198

A. C. Alvarez, G. Goedert, D. Marchesin

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引用次数: 4

Abstract

We describe certain crucial steps in the development of an algorithm for finding the Riemann solution to systems of conservation laws. We relax the classical hypotheses of strict hyperbolicity and genuine nonlinearity due to Lax. First, we present a procedure for continuing wave curves beyond points where characteristic speeds coincide, i.e. at wave curve points of maximal co-dimensionality. This procedure requires strict hyperbolicity on both sides of the coincidence locus. Loss of strict hyperbolicity is regularized by means of a Generalized Jordan Chain, which serves to construct a four-fold sub-manifold structure on which wave curves can be continued. Second, we analyze the loss of genuine nonlinearity. We prove a new result: the existence of composite wave curves when the composite wave traverses either the inflection locus or an anomalous part of the non-local composite wave curve. In this sense, we find conditions under which the composite field is well defined and its singularities can be removed, allowing use of our continuation method. Finally, we present numerical examples for a non-strictly hyperbolic system of conservation laws.

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稀疏和激波曲线中的共振:延拓法的局部分析和数值

我们描述了在寻找守恒定律系统的黎曼解的算法开发过程中的某些关键步骤。由于Lax，我们放松了严格双曲性和真正非线性的经典假设。首先，我们提出了一种在特征速度重合的点之外，即在最大共维的波浪曲线点处连续波浪曲线的程序。这个过程要求重合轨迹两边都有严格的夸张性。通过广义Jordan链来正则化严格双曲性的损失，该链用于构造四重子流形结构，在该结构上波浪曲线可以连续。其次，我们分析了真正非线性的损失。我们证明了一个新的结果：当复合波穿过非局部复合波曲线的拐点或异常部分时，复合波曲线是存在的。从这个意义上说，我们找到了复合场被很好地定义并且其奇点可以被去除的条件，从而允许使用我们的延拓方法。最后，我们给出了一个非严格双曲守恒律系统的数值例子。

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来源期刊

Journal of Hyperbolic Differential Equations 数学-物理：数学物理

CiteScore

1.10

自引率

0.00%

发文量

审稿时长

24 months

期刊介绍： This journal publishes original research papers on nonlinear hyperbolic problems and related topics, of mathematical and/or physical interest. Specifically, it invites papers on the theory and numerical analysis of hyperbolic conservation laws and of hyperbolic partial differential equations arising in mathematical physics. The Journal welcomes contributions in: Theory of nonlinear hyperbolic systems of conservation laws, addressing the issues of well-posedness and qualitative behavior of solutions, in one or several space dimensions. Hyperbolic differential equations of mathematical physics, such as the Einstein equations of general relativity, Dirac equations, Maxwell equations, relativistic fluid models, etc. Lorentzian geometry, particularly global geometric and causal theoretic aspects of spacetimes satisfying the Einstein equations. Nonlinear hyperbolic systems arising in continuum physics such as: hyperbolic models of fluid dynamics, mixed models of transonic flows, etc. General problems that are dominated (but not exclusively driven) by finite speed phenomena, such as dissipative and dispersive perturbations of hyperbolic systems, and models from statistical mechanics and other probabilistic models relevant to the derivation of fluid dynamical equations. Convergence analysis of numerical methods for hyperbolic equations: finite difference schemes, finite volumes schemes, etc.

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