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A high-order one-step sub-cell force-based discretization for cell-centered Lagrangian hydrodynamics on polygonal grids

✍ Scribed by Pierre-Henri Maire

Publisher
Elsevier Science
Year
2011
Tongue
English
Weight
520 KB
Volume
46
Category
Article
ISSN
0045-7930

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✦ Synopsis

We present a one-step high-order cell-centered numerical scheme for solving Lagrangian hydrodynamics equations on unstructured grids. The underlying finite volume discretization is constructed through the use of the sub-cell force concept invoking conservation and thermodynamic consistency. The high-order extension is performed using a one-step discretization, wherein the fluxes are computed by means of a Taylor expansion. The time derivatives of the fluxes are obtained through the use of a node-centered solver which can be viewed as a two-dimensional extension of the Generalized Riemann Problem methodology introduced by Ben-Artzi and Falcovitz.

πŸ“œ SIMILAR VOLUMES

Cell-centered discontinuous Galerkin dis
Cell-centered discontinuous Galerkin discretizations for two-dimensional scalar conservation laws on unstructured grids and for one-dimensional Lagrangian hydrodynamics
✍ FranΓ§ois Vilar; Pierre-Henri Maire; RΓ©mi Abgrall πŸ“‚ Article πŸ“… 2011 πŸ› Elsevier Science 🌐 English βš– 552 KB

We present cell-centered discontinuous Galerkin discretizations for two-dimensional scalar conservation laws on unstructured grids and also for the one-dimensional Lagrangian hydrodynamics up to thirdorder. We also demonstrate that a proper choice of the numerical fluxes allows to enforce stability