Global solution to a three-dimensional spherical piston problem for the relativistic Euler equations

被引:3
作者
Lai, Geng [1 ]
机构
[1] Shanghai Univ, Dept Math, Shanghai 200444, Peoples R China
来源
EUROPEAN JOURNAL OF APPLIED MATHEMATICS | 2022年 / 33卷 / 01期
关键词
Relativistic Euler equations; spherical piston problem; shock wave; characteristic; CONIC SHOCK-WAVE; CONSERVATION-LAWS; RIEMANN SOLUTIONS; ENTROPY SOLUTIONS; EXISTENCE; STABILITY;
D O I
10.1017/S0956792520000315
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
The study of spherically symmetric motion is important for the theory of explosion waves. In this paper, we consider a 'spherical piston' problem for the relativistic Euler equations, which describes the wave motion produced by a sphere expanding into an infinite surrounding medium. We use the reflected characteristics method to construct a global piecewise smooth solution with a single shock of this spherical piston problem, provided that the speed of the sphere is a small perturbation of a constant speed.
引用
收藏
页码:1 / 26
页数:26
相关论文
共 50 条
[21]   Riemann problem for a two-dimensional steady pressureless relativistic Euler equations [J].
Zhang, Yu ;
Zhang, Yanyan .
MATHEMATISCHE NACHRICHTEN, 2021, 294 (06) :1206-1229
[22]   Leapfrogging vortex rings for the three-dimensional incompressible Euler equations [J].
Davila, Juan ;
Pino, Manuel del ;
Musso, Monica ;
Wei, Juncheng .
COMMUNICATIONS ON PURE AND APPLIED MATHEMATICS, 2024, 77 (10) :3843-3957
[23]   Riemann problem for the relativistic Chaplygin Euler equations [J].
Cheng, Hongjun ;
Yang, Hanchun .
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 2011, 381 (01) :17-26
[24]   Non-relativistic global limits of the entropy solutions to the relativistic Euler equations with γ-law [J].
Li, Yachun ;
Ren, Xucai .
COMMUNICATIONS ON PURE AND APPLIED ANALYSIS, 2006, 5 (04) :963-979
[25]   Local existence and non-relativistic limits of shock solutions to a multidimensional piston problem for the relativistic Euler equations [J].
Min Ding ;
Yachun Li .
Zeitschrift für angewandte Mathematik und Physik, 2013, 64 :101-121
[26]   A Stability Estimate for a Solution to a Three-Dimensional Inverse Problem for the Maxwell Equations [J].
V. G. Romanov .
Siberian Mathematical Journal, 2004, 45 :1098-1112
[27]   A stability estimate for a solution to a three-dimensional inverse problem for the Maxwell equations [J].
Romanov, VG .
SIBERIAN MATHEMATICAL JOURNAL, 2004, 45 (06) :1098-1112
[28]   One dimensional piston problem for compressible Euler equations of generalized Chaplygin gas [J].
Fan, Yongqiang ;
Guo, Lihui ;
Fan, Xingya ;
You, Shouke .
APPLIED MATHEMATICS LETTERS, 2021, 112
[29]   Piston problem for the isentropic Euler equations for a modified Chaplygin gas [J].
Huang, Meixiang ;
Wang, Yuanjin ;
Shao, Zhiqiang .
PHYSICS OF FLUIDS, 2023, 35 (01)
[30]   Global Existence and Stability of Shock Front Solution to 1-D Piston Problem for Exothermically Reacting Euler Equations [J].
Jie Kuang ;
Qin Zhao .
Journal of Mathematical Fluid Mechanics, 2020, 22
12345