ON THE CENTRAL RELAXING SCHEME Ⅱ: SYSTEMS OF HYPERBOLIC CONSERVATION LAWS 被引量：2

ON THE CENTRAL RELAXING SCHEME Ⅱ: SYSTEMS OF HYPERBOLIC CONSERVATION LAWS

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摘要 This paper continues to study the central relaxing schemes for system of hyperbolic conservation laws, based on the local relaxation approximation. Two classes of relaxing systems with stiff source term are introduced to approximate system of conservation laws in curvilinear coordinates. Based on them, the semi-implicit relaxing schemes are con- structed as in [6, 12] without using any linear or nonlinear Riemann solvers. Numerical experiments for one-dimensional and two-dimensional problems are presented to demon- strate the performance and resolution of the current schemes. This paper continues to study the central relaxing schemes for system of hyperbolic conservation laws, based on the local relaxation approximation. Two classes of relaxing systems with stiff source term are introduced to approximate system of conservation laws in curvilinear coordinates. Based on them, the semi-implicit relaxing schemes are con- structed as in [6, 12] without using any linear or nonlinear Riemann solvers. Numerical experiments for one-dimensional and two-dimensional problems are presented to demon- strate the performance and resolution of the current schemes.

作者 Hua-zhong Tang (School of Mathematical Sciences, Peking University, Beijing 100871, China) (LSEC,ICMSEC Academy of Mathematics and Systems Sciences, Chinese Academy of Sciences, Beijing 100080, China)

出处《Journal of Computational Mathematics》 SCIE CSCD 2001年第6期571-582,共12页 计算数学（英文）

基金 This project supported partly by National Natural Science Foundation of China (No.19901031), the specialFunds for Major State

关键词 Hyperbolic conservation laws The relaxing system The central relaxing schemes The Euler equations. Hyperbolic conservation laws, The relaxing system, The central relaxing schemes, The Euler equations.

分类号 O241.8 [理学—计算数学]

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参考文献1

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同被引文献31

1Hua-zhong Tang (LSEC, Institute of Computational Mathematics and Scientific /Engineering Computing, Academy of Mathematics and System Sciences, Chinese Academy of Sciences, Beijing, 100080, China).ON THE CENTRAL RELAXING SCHEMES I:SINGLE CONSERVATION LAWS[J].Journal of Computational Mathematics,2000,18(3):313-324. 被引量：2
2Hua-zhong Tang,Hua-mo Wu(State Key Labomtory of Scientific and Engineering Computing, Institute of ComputationalMathematics, Chinese Academy of Sciences, Beijing 100080, China).ON A CELL ENTROPY INEQUALITY OF THE RELAXINGSCHEMES FOR SCALAR CONSERVATION LAWS[J].Journal of Computational Mathematics,2000,18(1):69-74. 被引量：4
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引证文献2

1Hua-zhong Tang (LSEC, Institute of Computational Mathematics and Scientific /Engineering Computing, Academy of Mathematics and System Sciences, Chinese Academy of Sciences, Beijing, 100080, China).ON THE CENTRAL RELAXING SCHEMES I:SINGLE CONSERVATION LAWS[J].Journal of Computational Mathematics,2000,18(3):313-324. 被引量：2
2Hua-zhong Tang Hua-mu Wu (State Key Laboratory of Scientific and Engineering Computing, Institute of Computational Mathematics and Scientific/Engineering Computing, Academy of Mathematics and Systems Sciences, Chinese Academy of Sciences, Beijing 100080,.THE RELAXING SCHEMES FOR HAMILION-JACOBI EQUATIONS[J].Journal of Computational Mathematics,2001,19(3):231-240. 被引量：2

二级引证文献3

1Hua-zhong Tang Hua-mu Wu (State Key Laboratory of Scientific and Engineering Computing, Institute of Computational Mathematics and Scientific/Engineering Computing, Academy of Mathematics and Systems Sciences, Chinese Academy of Sciences, Beijing 100080,.THE RELAXING SCHEMES FOR HAMILION-JACOBI EQUATIONS[J].Journal of Computational Mathematics,2001,19(3):231-240. 被引量：2
2Hua-zhong Tang,Hua-mo Wu.ON THE CELL ENTROPY INEQUALITY FOR THE FULLY DISCRETE RELAXING SCHEMES[J].Journal of Computational Mathematics,2001,19(5):511-518.
3刘星光,高峰,张志镇,邢燕,李玺茹.含瓦斯煤破裂过程声发射时空演化规律[J].科技导报,2013,31(15):35-38. 被引量：2

1Hua-zhong Tang (LSEC, Institute of Computational Mathematics and Scientific /Engineering Computing, Academy of Mathematics and System Sciences, Chinese Academy of Sciences, Beijing, 100080, China).ON THE CENTRAL RELAXING SCHEMES I:SINGLE CONSERVATION LAWS[J].Journal of Computational Mathematics,2000,18(3):313-324. 被引量：2
2Hua-zhong Tang Hua-mu Wu (State Key Laboratory of Scientific and Engineering Computing, Institute of Computational Mathematics and Scientific/Engineering Computing, Academy of Mathematics and Systems Sciences, Chinese Academy of Sciences, Beijing 100080,.THE RELAXING SCHEMES FOR HAMILION-JACOBI EQUATIONS[J].Journal of Computational Mathematics,2001,19(3):231-240. 被引量：2
3Hua-zhong Tang,Hua-mo Wu.ON THE CELL ENTROPY INEQUALITY FOR THE FULLY DISCRETE RELAXING SCHEMES[J].Journal of Computational Mathematics,2001,19(5):511-518.
4Hua-zhong Tang,Hua-mo Wu(State Key Labomtory of Scientific and Engineering Computing, Institute of ComputationalMathematics, Chinese Academy of Sciences, Beijing 100080, China).ON A CELL ENTROPY INEQUALITY OF THE RELAXINGSCHEMES FOR SCALAR CONSERVATION LAWS[J].Journal of Computational Mathematics,2000,18(1):69-74. 被引量：4
5Xiao-hong Qin.Boundary Layer to a System of Viscous Hyperbolic Conservation Laws[J].Acta Mathematicae Applicatae Sinica,2008,24(3):523-528.
6朱长江,徐学文.A NOTE ON THE RIEMANN PROBLEM TO HYPERBOLIC CONSERVATION LAWS[J].Acta Mathematica Scientia,1998,18(S1):1-4.
7Zhengfu Xu,Jinchao Xu,Chi-Wang Shu.A HIGH ORDER ADAPTIVE FINITE ELEMENT METHOD FOR SOLVING NONLINEAR HYPERBOLIC CONSERVATION LAWS[J].Journal of Computational Mathematics,2011,29(5):491-500.
8Hua-zhong Tang,Hua-mo Wu.ON THE CONVERGENCE OF IMPLICIT DIFFERENCE SCHEMES FOR HYPERBOLIC CONSERVATION LAWS[J].Journal of Computational Mathematics,2002,20(2):121-128.
9Wang Yaguang Department of Applied Mathematics Shanghai Jiao Tong University Shanghai,200030 China.Multiple Shock Fronts for Hyperbolic Conservation Laws in Higher Dimensional Space[J].Acta Mathematica Sinica,English Series,1995,11(1):88-104.
10符松,李启兵,王明皓.Depicting Vortex Stretching and Vortex Relaxing Mechanisms[J].Chinese Physics Letters,2003,20(12):2195-2198. 被引量：1

Journal of Computational Mathematics

2001年第6期

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ON THE CENTRAL RELAXING SCHEME Ⅱ: SYSTEMS OF HYPERBOLIC CONSERVATION LAWS 被引量：2

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