Presents a GQL-based PCP flux-limiting method for high-order WENO finite difference schemes in RHD that enforces physical constraints non-iteratively using rational stereographic parameterization and small eigenvalue problems in arbitrary dimensions.
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Active Flux/PamPa schemes incorporate discontinuous Galerkin methods as a building block, possess intrinsic bound-preserving properties illustrated numerically, and satisfy the summation-by-parts property in one dimension.
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GQL-Based Physical-Constraint-Preserving High-Order Finite Difference Schemes for Special Relativistic Hydrodynamics in Arbitrary Dimensions
Presents a GQL-based PCP flux-limiting method for high-order WENO finite difference schemes in RHD that enforces physical constraints non-iteratively using rational stereographic parameterization and small eigenvalue problems in arbitrary dimensions.
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Some new properties of an Active flux type scheme: PamPa
Active Flux/PamPa schemes incorporate discontinuous Galerkin methods as a building block, possess intrinsic bound-preserving properties illustrated numerically, and satisfy the summation-by-parts property in one dimension.