Hermite WENO schemes with strong stability preserving multi-step temporal discretization methods for conservation laws

doi:10.4208/jcm.1609-m2014-0069

科研成果详情

发表状态	已发表Published
题名	Hermite WENO schemes with strong stability preserving multi-step temporal discretization methods for conservation laws
作者	Cai, Xiaofeng1 ; Zhu, Jun 2; Qiu, Jianxian 3
发表日期	2017
发表期刊	Journal of Computational Mathematics
ISSN/eISSN	0254-9409
卷号	35 期号:1 页码:52-73
摘要	Based on the work of Shu [SIAM J. Sci. Stat. Comput, 9 (1988), pp. 1073-1084], we construct a class of high order multi-step temporal discretization procedure for finite volume Hermite weighted essential non-oscillatory (HWENO) methods to solve hyperbolic conservation laws. The key feature of the multi-step temporal discretization procedure is to use variable time step with strong stability preserving (SSP). The multi-step temporal discretization methods can make full use of computed information with HWENO spatial discretization by holding the former computational values. Extensive numerical experiments are presented to demonstrate that the finite volume HWENO schemes with multi-step discretization can achieve high order accuracy and maintain non-oscillatory properties near discontinuous region of the solution.
关键词	Finite volume scheme Hermite weighted essentially non-oscillatory scheme Multi-step temporal discretization Strong stability preserving Uniformly high order accuracy
DOI	10.4208/jcm.1609-m2014-0069
URL	查看来源
收录类别	SCIE
语种	英语English
WOS研究方向	Mathematics
WOS类目	Mathematics, Applied ; Mathematics
WOS记录号	WOS:000399811800004
Scopus入藏号	2-s2.0-85015310639
引用统计	被引频次：5[WOS] [WOS记录] [WOS相关记录]
文献类型	期刊论文
条目标识符	https://repository.uic.edu.cn/handle/39GCC9TT/8995
专题	个人在本单位外知识产出
通讯作者	Qiu, Jianxian
作者单位	1.School of Mathematical Sciences,Xiamen University,Xiamen,361005,China 2.College of Science,Nanjing University of Aeronautics and Astronautics,Nanjing,210016,China 3.School of Mathematical Sciences and Fujian Provincial Key Laboratory of Mathematical Modeling and High-Performance Scientific Computation,Xiamen University,Xiamen,361005,China
推荐引用方式 GB/T 7714	Cai, Xiaofeng,Zhu, Jun,Qiu, Jianxian. Hermite WENO schemes with strong stability preserving multi-step temporal discretization methods for conservation laws[J]. Journal of Computational Mathematics, 2017, 35(1): 52-73.
APA	Cai, Xiaofeng, Zhu, Jun, & Qiu, Jianxian. (2017). Hermite WENO schemes with strong stability preserving multi-step temporal discretization methods for conservation laws. Journal of Computational Mathematics, 35(1), 52-73.
MLA	Cai, Xiaofeng,et al."Hermite WENO schemes with strong stability preserving multi-step temporal discretization methods for conservation laws". Journal of Computational Mathematics 35.1(2017): 52-73.