We present a technique to extend the geometric construction of diagonal discrete Hodge operators to arbitrary triangular and tetrahedral boundary conforming Delaunay meshes in the frequent case of piecewise uniform and isotropic material parameters. The technique is based on the novel concept of signed dual complex that originates from a physical argument. In particular, it is shown how the positive definiteness of the mass matrix obtained with the signed dual complex is easily ensured for all boundary conforming Delaunay meshes without requiring\u2014as expected by the common knowledge\u2014that each circumcenter has to lie inside the corresponding element. Eliminating this requirement, whose fulfillment presents otherwise formidable pract...
The paper deals with a discrete formulation that makes use of primal and dual meshes. While the firs...
We propose an algorithm to compute a conforming Delaunay mesh of a bounded domain specified by a pie...
AbstractWe describe an algorithm which, for any piecewise linear complex (PLC) in 3D, builds a Delau...
The boundary of three-dimensional objects is usually represented by Piecewise Linear Complexes (PLCs...
We present a technique to construct diagonal material matrices for arbitrary triangular and tetrahed...
Given a sequence of finite element spaces which form a de Rham sequence, we will construct dual repr...
Abstract. We dene discrete dierential operators such as grad, div and curl, on general two-dimension...
We introduce Hodge-optimized triangulations (HOT), a family of well-shaped primal-dual pairs of comp...
International audienceWe define discrete differential operators such as grad, div and curl, on gener...
Two-dimensional constrained Delaunay triangulations are geometric structures that are popular for in...
International audienceWe define discrete differential operators such as grad, div and curl, on gener...
A three-dimensional domain with piecewise linear boundary elements can be represented as a piecewise...
Compatible schemes localize degrees of freedom according to the physical nature of the underlying fi...
Compatible schemes localize degrees of freedom according to the physical nature of the underlying fi...
In the thesis we study two dimensional simplicial complexes and linear codes. We say that a linear c...
The paper deals with a discrete formulation that makes use of primal and dual meshes. While the firs...
We propose an algorithm to compute a conforming Delaunay mesh of a bounded domain specified by a pie...
AbstractWe describe an algorithm which, for any piecewise linear complex (PLC) in 3D, builds a Delau...
The boundary of three-dimensional objects is usually represented by Piecewise Linear Complexes (PLCs...
We present a technique to construct diagonal material matrices for arbitrary triangular and tetrahed...
Given a sequence of finite element spaces which form a de Rham sequence, we will construct dual repr...
Abstract. We dene discrete dierential operators such as grad, div and curl, on general two-dimension...
We introduce Hodge-optimized triangulations (HOT), a family of well-shaped primal-dual pairs of comp...
International audienceWe define discrete differential operators such as grad, div and curl, on gener...
Two-dimensional constrained Delaunay triangulations are geometric structures that are popular for in...
International audienceWe define discrete differential operators such as grad, div and curl, on gener...
A three-dimensional domain with piecewise linear boundary elements can be represented as a piecewise...
Compatible schemes localize degrees of freedom according to the physical nature of the underlying fi...
Compatible schemes localize degrees of freedom according to the physical nature of the underlying fi...
In the thesis we study two dimensional simplicial complexes and linear codes. We say that a linear c...
The paper deals with a discrete formulation that makes use of primal and dual meshes. While the firs...
We propose an algorithm to compute a conforming Delaunay mesh of a bounded domain specified by a pie...
AbstractWe describe an algorithm which, for any piecewise linear complex (PLC) in 3D, builds a Delau...