Compact central WENO schemes for multidimensional conservation laws

被引:288
作者
Levy, D [1 ]
Puppo, G
Russo, G
机构
[1] Univ Calif Berkeley, Dept Math, Berkeley, CA 94720 USA
[2] Lawrence Berkeley Natl Lab, Berkeley, CA USA
[3] Politecn Torino, Dipartimento Matemat, I-10129 Turin, Italy
[4] Univ Aquila, Dipartimento Matemat, I-67100 Laquila, Italy
关键词
hyperbolic systems; central difference schemes; high-order accuracy; nonoscillatory schemes; WENO reconstruction; CWENO reconstruction;
D O I
10.1137/S1064827599359461
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
We present a new third-order central scheme for approximating solutions of systems of conservation laws in one and two space dimensions. In the spirit of Godunov-type schemes, our method is based on reconstructing a piecewise-polynomial interpolant from cell-averages which is then advanced exactly in time. In the reconstruction step, we introduce a new third-order, compact, central weighted essentially nonoscillatory (CWENO) reconstruction, which is written as a convex combination of interpolants based on different stencils. The heart of the matter is that one of these interpolants is taken as a suitable quadratic polynomial, and the weights of the convex combination are set as to obtain third-order accuracy in smooth regions. The embedded mechanism in the WENO-like schemes guarantees that in regions with discontinuities or large gradients, there is an automatic switch to a one-sided second-order reconstruction, which prevents the creation of spurious oscillations. In the one-dimensional case, our new third-order reconstruction is based on an extremely compact three-point stencil. Analogous compactness is retained in more space dimensions. The accuracy, robustness, and high-resolution properties of our scheme are demonstrated in a variety of one- and two-dimensional problems.
引用
收藏
页码:656 / 672
页数:17
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