Abstract. Parameterization of unstructured surface meshes is of fundamental importance in many applications of digital geometry processing. Such parameterization approaches give rise to large and exceedingly ill-conditioned systems which are difficult or impossible to solve without the use of sophisticated multilevel preconditioning strategies. Since the underlying meshes are very fine to begin with, such multilevel preconditioners require mesh coarsening to build an appropriate hierarchy. In this paper we consider several strategies for the construction of hierarchies using ideas from mesh simplification algorithms used in the computer graphics literature. We introduce two novel hierarchy construction schemes and demonstrate their superior...
Many problems based on unstructured grids provide a natural multigrid framework due to using an adap...
Abstract—This paper presents a novel mesh simplification algorithm. It decouples the simplification ...
This lecture is devoted to the presentation of two particular "hierarchical" approaches to numerical...
Abstract. Parameterization of unstructured surface meshes is of fundamental importance in many appli...
Parameterization of unstructured surface meshes is of fundamental importance in many applications of...
The use of multigrid and related preconditioners with the finite element method is often limited by ...
AbstractIn this paper, we describe an array-based hierarchical mesh generation capability through un...
AbstractThe use of polygonal meshes for the representation of highly complex geometric objects has b...
Geometric Multigrid methods have gained widespread acceptance for solving large systems of linear eq...
Geometric Multigrid methods have gained widespread acceptance for solving large systems of linear eq...
none2noThe goal of a multilevel simplification method is to produce different levels of refinement o...
Geometric Multigrid methods have gained widespread acceptance for solving large systems of linear eq...
This paper develops locally adapted hierarchical basis functions for effectively pre-conditioning la...
Abstract. In this paper we focus on generating hierarchies of topological relations for unstructured...
We consider systems of mesh equations that approximate elliptic boundary value problems on arbitraty...
Many problems based on unstructured grids provide a natural multigrid framework due to using an adap...
Abstract—This paper presents a novel mesh simplification algorithm. It decouples the simplification ...
This lecture is devoted to the presentation of two particular "hierarchical" approaches to numerical...
Abstract. Parameterization of unstructured surface meshes is of fundamental importance in many appli...
Parameterization of unstructured surface meshes is of fundamental importance in many applications of...
The use of multigrid and related preconditioners with the finite element method is often limited by ...
AbstractIn this paper, we describe an array-based hierarchical mesh generation capability through un...
AbstractThe use of polygonal meshes for the representation of highly complex geometric objects has b...
Geometric Multigrid methods have gained widespread acceptance for solving large systems of linear eq...
Geometric Multigrid methods have gained widespread acceptance for solving large systems of linear eq...
none2noThe goal of a multilevel simplification method is to produce different levels of refinement o...
Geometric Multigrid methods have gained widespread acceptance for solving large systems of linear eq...
This paper develops locally adapted hierarchical basis functions for effectively pre-conditioning la...
Abstract. In this paper we focus on generating hierarchies of topological relations for unstructured...
We consider systems of mesh equations that approximate elliptic boundary value problems on arbitraty...
Many problems based on unstructured grids provide a natural multigrid framework due to using an adap...
Abstract—This paper presents a novel mesh simplification algorithm. It decouples the simplification ...
This lecture is devoted to the presentation of two particular "hierarchical" approaches to numerical...