HWENO Schemes Based on Compact Differencefor Hyperbolic Conservation Laws
暂无分享,去创建一个
Zhan Ma | Song-Ping Wu | S. Wu | Zhan Ma
[1] S. Osher,et al. Weighted essentially non-oscillatory schemes , 1994 .
[2] Jianxian Qiu,et al. Hermite WENO schemes and their application as limiters for Runge-Kutta discontinuous Galerkin method II: Two dimensional case , 2005 .
[3] Datta V. Gaitonde,et al. Optimized Compact-Difference-Based Finite-Volume Schemes for Linear Wave Phenomena , 1997 .
[4] Jianxian Qiu,et al. Finite Difference Hermite WENO Schemes for Conservation Laws, II: An Alternative Approach , 2015, Journal of Scientific Computing.
[5] Jun Zhu,et al. A class of the fourth order finite volume Hermite weighted essentially non-oscillatory schemes , 2008 .
[6] K. S. Ravichandran. Higher Order KFVS Algorithms Using Compact Upwind Difference Operators , 1997 .
[7] P. Woodward,et al. The numerical simulation of two-dimensional fluid flow with strong shocks , 1984 .
[8] Jianxian Qiu,et al. Hermite WENO schemes and their application as limiters for Runge-Kutta discontinuous Galerkin method: one-dimensional case , 2004 .
[9] Chi-Wang Shu,et al. High Order Weighted Essentially Nonoscillatory Schemes for Convection Dominated Problems , 2009, SIAM Rev..
[10] Chi-Wang Shu,et al. Monotonicity Preserving Weighted Essentially Non-oscillatory Schemes with Increasingly High Order of Accuracy , 2000 .
[11] S. Osher,et al. High-order essentially nonsocillatory schemes for Hamilton-Jacobi equations , 1990 .
[12] A. Iske,et al. On the structure of function spaces in optimal recovery of point functionals for ENO-schemes by radial basis functions , 1996 .
[13] Nikolaus A. Adams,et al. An asymptotically stable compact upwind-biased finite-difference scheme for hyperbolic systems , 2005 .
[14] S. Lele. Compact finite difference schemes with spectral-like resolution , 1992 .
[15] Chi-Wang Shu,et al. A new class of central compact schemes with spectral-like resolution I: Linear schemes , 2013, J. Comput. Phys..
[16] Danping Peng,et al. Weighted ENO Schemes for Hamilton-Jacobi Equations , 1999, SIAM J. Sci. Comput..
[17] Jianxian Qiu,et al. Finite Difference Hermite WENO Schemes for Hyperbolic Conservation Laws , 2014, Journal of Scientific Computing.
[18] S. Osher,et al. High Order Two Dimensional Nonoscillatory Methods for Solving Hamilton-Jacobi Scalar Equations , 1996 .
[19] A. Harten. High Resolution Schemes for Hyperbolic Conservation Laws , 2017 .
[20] S. Osher,et al. Uniformly High-Order Accurate Nonoscillatory Schemes. I , 1987 .
[21] Nikolaus A. Adams,et al. A High-Resolution Hybrid Compact-ENO Scheme for Shock-Turbulence Interaction Problems , 1996 .
[22] Tapan K. Sengupta,et al. Analysis of central and upwind compact schemes , 2003 .
[23] Arnab Kumar De,et al. Analysis of a new high resolution upwind compact scheme , 2006, J. Comput. Phys..
[24] Chi-Wang Shu,et al. Efficient Implementation of Weighted ENO Schemes , 1995 .
[25] Chi-Wang Shu,et al. A new class of central compact schemes with spectral-like resolution II: Hybrid weighted nonlinear schemes , 2015, J. Comput. Phys..
[26] S. Dennis,et al. Compact h4 finite-difference approximations to operators of Navier-Stokes type , 1989 .
[27] S. Osher,et al. Efficient implementation of essentially non-oscillatory shock-capturing schemes,II , 1989 .
[28] S. Osher,et al. Uniformly high order accurate essentially non-oscillatory schemes, 111 , 1987 .