AbstractA graph-based implementation of quadtree meshes for dealing with adaptive mesh refinement (AMR) in the numerical solution of evolutionary partial differential equations is discussed using finite volume methods. The technique displays a plug-in feature that allows replacement of a group of cells in any region of interest for another one with arbitrary refinement, and with only local changes occurring in the data structure. The data structure is also specially designed to minimize the number of operations needed in the AMR. Implementation of the new scheme allows flexibility in the levels of refinement of adjacent regions. Moreover, storage requirements and computational cost compare competitively with mesh refinement schemes based on...
We investigate multigrid algorithms on locally refined quadrilateral meshes. In contrast to a standa...
Adaptive Mesh Refinement (AMR) is a numerical technique for locally tailoring the resolution computa...
AbstractAdaptive mesh methods are valuable tools in improving the accuracy and efficiency of the num...
AbstractA graph-based implementation of quadtree meshes for dealing with adaptive mesh refinement (A...
Coordenação de Aperfeiçoamento de Pessoal de Nível SuperiorThis work proposes an adaptive mesh refin...
We combine an adaptive moving mesh method with an adaptive mesh re¯nement (AMR) algorithm using a hi...
Some numerical simulations of multi-scale physical phenomena consume a significant amount of computa...
This is the final report of a three-year, Laboratory Directed Research and Development (LDRD) projec...
AbstractIn this work, simulations with scalene triangle meshes represented by a recently proposed gr...
A new mesh generator[6] which is able to generate high-quality graded meshes based on the boundary n...
Meshes are a core part of almost any numerical simulation code. A good choice of mesh is crucial t...
Adaptive mesh refinement (AMR) suffers from the problem of hanging faces in regions where elements o...
AbstractA mesh generation approach that allows the local modification of meshes of simplices is revi...
An unstructured adaptive mesh refinement (AMR) method is used in conjunction with the cell-to-cell m...
Solutions to Partial Differential Equations (PDEs) are often computed by dis-cretizing the domain in...
We investigate multigrid algorithms on locally refined quadrilateral meshes. In contrast to a standa...
Adaptive Mesh Refinement (AMR) is a numerical technique for locally tailoring the resolution computa...
AbstractAdaptive mesh methods are valuable tools in improving the accuracy and efficiency of the num...
AbstractA graph-based implementation of quadtree meshes for dealing with adaptive mesh refinement (A...
Coordenação de Aperfeiçoamento de Pessoal de Nível SuperiorThis work proposes an adaptive mesh refin...
We combine an adaptive moving mesh method with an adaptive mesh re¯nement (AMR) algorithm using a hi...
Some numerical simulations of multi-scale physical phenomena consume a significant amount of computa...
This is the final report of a three-year, Laboratory Directed Research and Development (LDRD) projec...
AbstractIn this work, simulations with scalene triangle meshes represented by a recently proposed gr...
A new mesh generator[6] which is able to generate high-quality graded meshes based on the boundary n...
Meshes are a core part of almost any numerical simulation code. A good choice of mesh is crucial t...
Adaptive mesh refinement (AMR) suffers from the problem of hanging faces in regions where elements o...
AbstractA mesh generation approach that allows the local modification of meshes of simplices is revi...
An unstructured adaptive mesh refinement (AMR) method is used in conjunction with the cell-to-cell m...
Solutions to Partial Differential Equations (PDEs) are often computed by dis-cretizing the domain in...
We investigate multigrid algorithms on locally refined quadrilateral meshes. In contrast to a standa...
Adaptive Mesh Refinement (AMR) is a numerical technique for locally tailoring the resolution computa...
AbstractAdaptive mesh methods are valuable tools in improving the accuracy and efficiency of the num...