In order to accelerate the solution of linear systems, multigrid methods utilize different levels of discretizations. Transfer operations between different levels are usually straightforward, since most geometric multigrid solver is embedded in structured problem domains. However, the multigrid method in this thesis makes use of barycentric coordinates to cope with unstructured problems. Thereby, the approach is applied to a Finite Element framework simulating deformable models on both linear and quadratic tetrahedral meshes
We present a hexahedral finite element method for simulating cuts in deformable bodies using the cor...
Multigridmethods are fast iterative solvers for sparse large ill-conditioned linear systems of equat...
Abstract. Finding efficient and physically based methods to interac-tively simulate deformable objec...
In order to accelerate the solution of linear systems, multigrid methods utilize different levels of...
In order to accelerate the solution of linear systems, multigrid methods utilize different levels of...
The use of multigrid and related preconditioners with the finite element method is often limited by ...
AbstractAn overview is given of the development of the geometric multigrid method, with emphasis on ...
We present a novel p-multigrid method for efficient simulation of co-rotational elasticity with high...
We present a novel p-multigrid method for efficient simulation of corotational elasticity with highe...
We present a novel p-multigrid method for efficient simulation of co-rotational elasticity with high...
We present a novel p-multigrid method for efficient simulation of co-rotational elasticity with high...
An overview is given of the development of the geometric multigrid method, with emphasis on applicat...
Abstract. Fast, robust and efficient multigrid solvers are a key numer-ical tool in the solution of ...
In this paper, multigrid methods applied to linear elastic problems are presented, taking two and th...
Abstract: A multigrid algorithm for the solution of stabilized finite element discretiza...
We present a hexahedral finite element method for simulating cuts in deformable bodies using the cor...
Multigridmethods are fast iterative solvers for sparse large ill-conditioned linear systems of equat...
Abstract. Finding efficient and physically based methods to interac-tively simulate deformable objec...
In order to accelerate the solution of linear systems, multigrid methods utilize different levels of...
In order to accelerate the solution of linear systems, multigrid methods utilize different levels of...
The use of multigrid and related preconditioners with the finite element method is often limited by ...
AbstractAn overview is given of the development of the geometric multigrid method, with emphasis on ...
We present a novel p-multigrid method for efficient simulation of co-rotational elasticity with high...
We present a novel p-multigrid method for efficient simulation of corotational elasticity with highe...
We present a novel p-multigrid method for efficient simulation of co-rotational elasticity with high...
We present a novel p-multigrid method for efficient simulation of co-rotational elasticity with high...
An overview is given of the development of the geometric multigrid method, with emphasis on applicat...
Abstract. Fast, robust and efficient multigrid solvers are a key numer-ical tool in the solution of ...
In this paper, multigrid methods applied to linear elastic problems are presented, taking two and th...
Abstract: A multigrid algorithm for the solution of stabilized finite element discretiza...
We present a hexahedral finite element method for simulating cuts in deformable bodies using the cor...
Multigridmethods are fast iterative solvers for sparse large ill-conditioned linear systems of equat...
Abstract. Finding efficient and physically based methods to interac-tively simulate deformable objec...
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