THE RELAXING SCHEMES FOR HAMILION-JACOBI EQUATIONS 被引量：2

THE RELAXING SCHEMES FOR HAMILION-JACOBI EQUATIONS

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摘要 Hamilton-Jacobi equation appears frequently in applications, e.g., in differential games and control theory, and is closely related to hyperbolic conservation laws[3, 4, 12]. This is helpful in the design of difference approximations for Hamilton-Jacobi equation and hyperbolic conservation laws. In this paper we present the relaxing system for HamiltonJacobi equations in arbitrary space dimensions, and high resolution relaxing schemes for Hamilton-Jacobi equation, based on using the local relaxation approximation. The schemes are numerically tested on a variety of 1D and 2D problems, including a problem related to optimal control problem. High-order accuracy in smooth regions, good resolution of discontinuities, and convergence to viscosity solutions are observed. Hamilton-Jacobi equation appears frequently in applications, e.g., in differential games and control theory, and is closely related to hyperbolic conservation laws[3, 4, 12]. This is helpful in the design of difference approximations for Hamilton-Jacobi equation and hyperbolic conservation laws. In this paper we present the relaxing system for HamiltonJacobi equations in arbitrary space dimensions, and high resolution relaxing schemes for Hamilton-Jacobi equation, based on using the local relaxation approximation. The schemes are numerically tested on a variety of 1D and 2D problems, including a problem related to optimal control problem. High-order accuracy in smooth regions, good resolution of discontinuities, and convergence to viscosity solutions are observed.

作者 Hua-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,

出处《Journal of Computational Mathematics》 SCIE CSCD 2001年第3期231-240,共10页 计算数学（英文）

基金 the National Natural Science Foundation of China (Grant No. 19901031)and the foundation of National Laboratory of Computationa

关键词 The relaxing scheme The relaxing systems Hamilton-Jacobi equation Hyperbolic conservation laws. The relaxing scheme, The relaxing systems, Hamilton-Jacobi equation, Hyperbolic conservation laws.

分类号 O241 [理学—计算数学]

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参考文献20

1Hua-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).ON THE CENTRAL RELAXING SCHEME Ⅱ: SYSTEMS OF HYPERBOLIC CONSERVATION LAWS[J].Journal of Computational Mathematics,2001,19(6):571-582. 被引量：2
2Hua-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
3Hua-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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二级参考文献27

1Hua-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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共引文献3

1Hua-zhong Tang , Hua-mu Wu (State Key Laboratory of Scientific and Engineering Computing, Institute of Computational Mathematics, Chinese Academy of Sciences, Beijing 100080, China).ON THE EXPLICIT COMPACT SCHEMES II: EXTENSION OF THE STCE/CE METHOD ON NONSTAGGERED GRIDS ON THE EXPLICIT COMPACT SCHEMES II: EXTENSION OF THE STCE/CE METHOD ON NONSTAGGERED GRIDS[J].Journal of Computational Mathematics,2000,18(5):467-480. 被引量：1
2Hua-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
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.

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
3刘保县,赵宝云,姜永东.单轴压缩煤岩变形损伤及声发射特性研究[J].地下空间与工程学报,2007,3(4):647-650. 被引量：35
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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 (School of Mathematical Sciences, Peking University, Beijing 100871, China) (LSEC,ICMSEC Academy of Mathematics and Systems Sciences, Chinese Academy of Sciences, Beijing 100080, China).ON THE CENTRAL RELAXING SCHEME Ⅱ: SYSTEMS OF HYPERBOLIC CONSERVATION LAWS[J].Journal of Computational Mathematics,2001,19(6):571-582. 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
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7王平,唐少强,黄永念（推荐）.激波管中动态相变的数值研究[J].应用数学和力学,2007,28(7):824-832.
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Journal of Computational Mathematics

2001年第3期

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