An adaptive finite element scheme for transient problems in CFD
Computer Methods in Applied Mechanics and Engineering
An h–p Taylor—Galerkin finite method for compressible Euler equations
Computer Methods in Applied Mechanics and Engineering
Three-dimensional adaptive mesh refinement for hyperbolic conservation laws
SIAM Journal on Scientific Computing
Journal of Computational Physics
Tools for Triangulations and Tetrahedrizations
Scientific Visualization, Overviews, Methodologies, and Techniques
Tools for Computing Tangent Curves and Topological Graphs
Scientific Visualization, Overviews, Methodologies, and Techniques
Local adaptive mesh refinement for shock hydrodynamics
Journal of Computational Physics
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Mesh generation is one of the key issues in Computational Fluid Dynamics. This paper presents an adaptive two-dimensional mesh refinement method based on the law of mass conservation. The method can be used to a governing system that includes the law of mass conservation (continuity equation) for incompressible or compressible steady flows. We show one example that demonstrates the streamlines constructed using the refined mesh is accurate.