A Hybrid Second Order Scheme for Shallow Water Flows

We extend the well-balanced second order hybrid scheme developed in Donat and Martinez-Gavara (J. Sci. Comput., to appear) to the one-dimensional and two-dimensional shallow water system. We show that the scheme is exactly well-balanced for quiescent steady states, when a particular integration formula is employed, just as in the scalar models considered in Donat and Martinez-Gavara (J. Sci. Comput., to appear). A standard treatment of wet/dry fronts can easily be adapted, obtaining a robust scheme that produces well-resolved numerical solutions.

[1]  Mario Ricchiuto,et al.  Stabilized residual distribution for shallow water simulations , 2009, J. Comput. Phys..

[2]  Alfredo Bermúdez,et al.  Upwind methods for hyperbolic conservation laws with source terms , 1994 .

[3]  J. Greenberg,et al.  A well-balanced scheme for the numerical processing of source terms in hyperbolic equations , 1996 .

[4]  Antonio Marquina,et al.  Capturing Shock Reflections , 1996 .

[5]  Yulong Xing,et al.  High order finite difference WENO schemes with the exact conservation property for the shallow water equations , 2005 .

[6]  Philip L. Roe,et al.  Upwind differencing schemes for hyperbolic conservation laws with source terms , 1987 .

[7]  Vicent Caselles,et al.  Flux-gradient and source-term balancing for certain high resolution shock-capturing schemes , 2009 .

[8]  T. Gallouët,et al.  Some approximate Godunov schemes to compute shallow-water equations with topography , 2003 .

[9]  Randall J. LeVeque,et al.  Balancing Source Terms and Flux Gradients in High-Resolution Godunov Methods , 1998 .

[10]  Mario Ricchiuto,et al.  On the C-property and Generalized C-property of Residual Distribution for the Shallow Water Equations , 2011, J. Sci. Comput..

[11]  Yulong Xing,et al.  High order well-balanced finite volume WENO schemes and discontinuous Galerkin methods for a class of hyperbolic systems with source terms , 2006, J. Comput. Phys..

[12]  Manuel Jesús Castro Díaz,et al.  High Order Extensions of Roe Schemes for Two-Dimensional Nonconservative Hyperbolic Systems , 2009, J. Sci. Comput..

[13]  José M. Corberán,et al.  Construction of second-order TVD schemes for nonhomogeneous hyperbolic conservation laws , 2001 .

[14]  E. Toro Shock-Capturing Methods for Free-Surface Shallow Flows , 2001 .

[15]  Rosa Donat,et al.  Cost-effective Multiresolution schemes for Shock Computations , 2009 .

[16]  P. Sweby High Resolution Schemes Using Flux Limiters for Hyperbolic Conservation Laws , 1984 .

[17]  Anna Martínez-Gavara,et al.  Hybrid Second Order Schemes for Scalar Balance Laws , 2011, J. Sci. Comput..

[18]  Rémi Abgrall,et al.  Application of conservative residual distribution schemes to the solution of the shallow water equations on unstructured meshes , 2007, J. Comput. Phys..

[19]  Rosa Donat,et al.  Point Value Multiscale Algorithms for 2D Compressible Flows , 2001, SIAM J. Sci. Comput..