Abstract | ||
---|---|---|
. Mesh reduction techniques are used for accelerating the visualizationprocess for large datasets. Typical examples are scalar or vector valued functionsdefined on complex 2 or 3 dimensional meshes. Grosso et al. presented a methodfor mesh optimization based on finite elements approximations with the L2 normand adaptive local mesh refinement. Starting with a very coarse triangulation ofthe functional domain a hierarchy of highly non-uniform tetrahedral (or triangularin 2D) meshes is... |
Year | Keywords | Field |
---|---|---|
1997 | 3 dimensional | Applied mathematics,Laplacian smoothing,Polygon mesh,Computer science,Finite element method,Norm (mathematics),Piecewise linear function,hp-FEM,Mesh generation,Mixed finite element method |
DocType | Citations | PageRank |
Conference | 3 | 0.47 |
References | Authors | |
14 | 2 |
Name | Order | Citations | PageRank |
---|---|---|---|
Roberto Grosso | 1 | 124 | 15.72 |
Thomas Ertl | 2 | 4417 | 401.52 |