摘要
We present a new Finite Volume Evolution Galerkin(FVEG)scheme for the solution of the shallow water equations(SWE)with the bottom topography as a source term.Our new scheme will be based on the FVEG methods presented in(Noelle and Kraft,J.Comp.Phys.,221(2007)),but adds the possibility to handle dry boundaries.The most important aspect is to preserve the positivity of the water height.We present a general approach to ensure this for arbitrary finite volume schemes.The main idea is to limit the outgoing fluxes of a cell whenever they would create negative water height.Physically,this corresponds to the absence of fluxes in the presence of vacuum.Wellbalancing is then re-established by splitting gravitational and gravity driven parts of the flux.Moreover,a new entropy fix is introduced that improves the reproduction of sonic rarefaction waves.
基金
supported by DFG-Grant NO361/3-1"Adaptive semi-implicit FVEG methods for multidimensional systems of hyperbolic balance laws".
