Title :
Finite element basis functions for nested meshes of nonuniform refinement level
Author :
Hill, Volker ; Farle, Ortwin ; Dyczij-Edlinger, Romanus
Author_Institution :
Dept. of Electr. Eng., Saarland Univ., Saarbrucken, Germany
fDate :
3/1/2004 12:00:00 AM
Abstract :
We propose a systematic methodology for the construction of hanging variables to connect finite elements of unequal refinement levels within a nested tetrahedral mesh. While conventional refinement schemes introduce irregular elements at such interfaces which must be removed when the mesh is further refined, the suggested approach keeps the discretization perfectly nested. Thanks to enhanced regularity, mesh-based methods such as refinement algorithms or intergrid transfer operators for use in multigrid solvers can be implemented in a much simpler fashion. This paper covers H1 and H(curl) basis functions for triangular or tetrahedral elements.
Keywords :
electromagnetic fields; finite element analysis; mesh generation; edge elements; electromagnetic fields; facet elements; finite element basis functions; finite element methods; hanging variables; intergrid transfer operators; multigrid solvers; nested meshes; nested tetrahedral mesh; nonuniform refinement level; refinement algorithms; systematic methodology; tetrahedral elements; triangular elements; unequal refinement levels; Convergence of numerical methods; Electromagnetic fields; Equations; Extrapolation; Finite element methods; Iron; Multigrid methods;
Journal_Title :
Magnetics, IEEE Transactions on
DOI :
10.1109/TMAG.2004.825149
