We present a technique to construct diagonal material matrices for arbitrary triangular and tetrahedral meshes and arbitrary scalar material parameters. The recipe is based on a novel dual complex called folded Voronoï diagram. The proposed matrices are tailored to enable the use of a complementary-dual formulation for Poisson problems featuring one unknown per element
We introduce a new algorithm for generating tetrahedral meshes that conform to physical boundaries i...
We present a new algorithm for material boundary interface reconstruction from data sets containing ...
This thesis introduces polyhedral cell shapes into the formalism of the Finite Integration Technique...
In the recent years, reformulating the mathematical description of physical laws in an algebraic for...
We present a technique to extend the geometric construction of diagonal discrete Hodge operators to ...
The geometric reinterpretation of the Finite Element Method (FEM) shows that Raviart–Thomas and Nédé...
We present a local formulation for 2D Discrete Exterior Calculus (DEC) similar to that of the Finite...
Sieger D, Alliez P, Botsch M. Optimizing Voronoi Diagrams for Polygonal Finite Element Computations....
Given a sequence of finite element spaces which form a de Rham sequence, we will construct dual repr...
AbstractIn this paper we propose a method to generate mixed-element meshes (tetrahedra, triangular p...
The paper deals with a discrete formulation that makes use of primal and dual meshes. While the firs...
A general technique to develop arbitrary-sided polygonal elements based on the scaled boundary finit...
In this paper we propose a method to generate mixed-element meshes (tetrahedra, triangular prisms, s...
We present a new algorithm for material boundary interface recon-struction from data sets containing...
In this paper we propose a method to generate mixed-element meshes (tetrahedra, triangular prisms, s...
We introduce a new algorithm for generating tetrahedral meshes that conform to physical boundaries i...
We present a new algorithm for material boundary interface reconstruction from data sets containing ...
This thesis introduces polyhedral cell shapes into the formalism of the Finite Integration Technique...
In the recent years, reformulating the mathematical description of physical laws in an algebraic for...
We present a technique to extend the geometric construction of diagonal discrete Hodge operators to ...
The geometric reinterpretation of the Finite Element Method (FEM) shows that Raviart–Thomas and Nédé...
We present a local formulation for 2D Discrete Exterior Calculus (DEC) similar to that of the Finite...
Sieger D, Alliez P, Botsch M. Optimizing Voronoi Diagrams for Polygonal Finite Element Computations....
Given a sequence of finite element spaces which form a de Rham sequence, we will construct dual repr...
AbstractIn this paper we propose a method to generate mixed-element meshes (tetrahedra, triangular p...
The paper deals with a discrete formulation that makes use of primal and dual meshes. While the firs...
A general technique to develop arbitrary-sided polygonal elements based on the scaled boundary finit...
In this paper we propose a method to generate mixed-element meshes (tetrahedra, triangular prisms, s...
We present a new algorithm for material boundary interface recon-struction from data sets containing...
In this paper we propose a method to generate mixed-element meshes (tetrahedra, triangular prisms, s...
We introduce a new algorithm for generating tetrahedral meshes that conform to physical boundaries i...
We present a new algorithm for material boundary interface reconstruction from data sets containing ...
This thesis introduces polyhedral cell shapes into the formalism of the Finite Integration Technique...