The singular wave in a pressureless hydrodynamic model

IF 4.4 2区数学 Q1 COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS

Mathematics and Computers in Simulation Pub Date : 2025-02-26 DOI:10.1016/j.matcom.2025.02.018

Zhijian Wei, Lihui Guo

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引用次数: 0

Abstract

In this paper, we investigate the non-classical wave for a pressureless hydrodynamic model with the flux perturbed term by the Riemann problem and a singularity formation. All the possible Riemann solutions, the combination of two contact discontinuities

J_{1} + J_{2}

, and a delta shock wave

δ S

, are constructed in fully explicit forms. It should be mentioned that the delta shock wave appears in the solution if and only if the flux perturbed parameter

ɛ

satisfies some specific condition. Due to the particularity of the delta shock wave in the Riemann solutions, we investigate the formation of singularity, namely, the traffic density blowing up under certain data. Moreover, its result gives an example of the conjecture proposed by Majda [Springer New York, 1984]: “If a hyperbolic system of conservation laws is totally linearly degenerate, then the system has smooth global solutions when the initial data are smooth, unless the solution itself blows up in a finite time.” We further explore and discuss their asymptotic behaviors to analyze the effect of

ɛ

, in which the delta shock wave and vacuum state solutions for a pressureless hydrodynamic model can be obtained by

J_{1} + J_{2}

ɛ

tends to 0. In addition, we offer some typical numerical simulations that are identical well to our theoretical results and provide a more intuitive way to observe the singular wave.

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无压水动力模型中的奇异波

本文利用黎曼问题和奇点的形成，研究了带通量扰动项的无压水动力模型的非经典波。所有可能的黎曼解，两个接触不连续面J1+J2的组合，以及一个δ激波δS，都以完全显式的形式构造。需要指出的是，当且仅当通量扰动参数满足某些特定条件时，溶液中才会出现δ激波。由于黎曼解中三角洲激波的特殊性，我们研究了奇点的形成，即在一定数据下交通密度爆炸。而且，它的结果给出了Majda[施普林格New York， 1984]提出的猜想的一个例子：“如果一个守恒律的双曲系统是完全线性退化的，那么当初始数据是光滑的时，该系统具有光滑的全局解，除非解本身在有限时间内爆炸。”我们进一步探索和讨论了它们的渐近行为，分析了它们的影响，其中，当η趋于0时，可以用J1+J2得到无压水动力模型的δ激波和真空状态解。此外，我们还提供了一些典型的数值模拟，这些数值模拟与我们的理论结果很好地吻合，为观测奇异波提供了一种更直观的方法。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Mathematics and Computers in Simulation 数学-计算机：跨学科应用

CiteScore

8.90

自引率

4.30%

发文量

335

审稿时长

54 days

期刊介绍： The aim of the journal is to provide an international forum for the dissemination of up-to-date information in the fields of the mathematics and computers, in particular (but not exclusively) as they apply to the dynamics of systems, their simulation and scientific computation in general. Published material ranges from short, concise research papers to more general tutorial articles. Mathematics and Computers in Simulation, published monthly, is the official organ of IMACS, the International Association for Mathematics and Computers in Simulation (Formerly AICA). This Association, founded in 1955 and legally incorporated in 1956 is a member of FIACC (the Five International Associations Coordinating Committee), together with IFIP, IFAV, IFORS and IMEKO. Topics covered by the journal include mathematical tools in: •The foundations of systems modelling •Numerical analysis and the development of algorithms for simulation They also include considerations about computer hardware for simulation and about special software and compilers. The journal also publishes articles concerned with specific applications of modelling and simulation in science and engineering, with relevant applied mathematics, the general philosophy of systems simulation, and their impact on disciplinary and interdisciplinary research. The journal includes a Book Review section -- and a "News on IMACS" section that contains a Calendar of future Conferences/Events and other information about the Association.