The approximation properties of the finite element method can often be substantially improved by choosing smooth high-order basis functions. It is extremely difficult to devise such basis functions for partitions consisting of arbitrarily shaped polytopes. We propose the mollified basis functions of arbitrary order and smoothness for partitions consisting of convex polytopes. On each polytope an independent local polynomial approximant of arbitrary order is assumed. The basis functions are defined as the convolutions of the local approximants with a mollifier. The mollifier is chosen to be smooth, to have a compact support and a unit volume. The approximation properties of the obtained basis functions are governed by the local polynomial ap...
Due to its unique and intriguing properties, polygonal and polyhedral discretization is an emerging ...
In this paper we present efficient quadrature rules for the numerical approximation of integrals of ...
In this paper, conforming finite elements on polygon meshes are developed. Polygonal finite elements...
The approximation properties of the finite element method can often be substantially improved by cho...
Meshing has been a longstanding impediment to the engineering design-analysis cycle. As designs beco...
The multiscale hybrid-mixed (MHM) method consists of a multi-level strategy to approximate the solut...
We combine theory and results from polytope domain meshing, generalized barycentric coor-dinates, an...
International audienceIn this work we present a generic framework for non-conforming finite elements...
Polynomial approximation on convex polytopes in \mathbf{R}^d is considered in uniform and L^p-norms....
The simulation of the behavior of heterogeneous and composite materials poses a number of challenges...
The method of the finite elements is an adaptable numerical procedure for interpolation as well as f...
It is known that generalized barycentric coordinates (GBCs) can be used to form Bernstein polynomial...
In this work we give guidelines for the construction of new high order conforming finite element exa...
A general technique to develop arbitrary-sided polygonal elements based on the scaled boundary finit...
It is known that piecewise linear continuous finite element (FE) approximations on nonobtuse tetrahe...
Due to its unique and intriguing properties, polygonal and polyhedral discretization is an emerging ...
In this paper we present efficient quadrature rules for the numerical approximation of integrals of ...
In this paper, conforming finite elements on polygon meshes are developed. Polygonal finite elements...
The approximation properties of the finite element method can often be substantially improved by cho...
Meshing has been a longstanding impediment to the engineering design-analysis cycle. As designs beco...
The multiscale hybrid-mixed (MHM) method consists of a multi-level strategy to approximate the solut...
We combine theory and results from polytope domain meshing, generalized barycentric coor-dinates, an...
International audienceIn this work we present a generic framework for non-conforming finite elements...
Polynomial approximation on convex polytopes in \mathbf{R}^d is considered in uniform and L^p-norms....
The simulation of the behavior of heterogeneous and composite materials poses a number of challenges...
The method of the finite elements is an adaptable numerical procedure for interpolation as well as f...
It is known that generalized barycentric coordinates (GBCs) can be used to form Bernstein polynomial...
In this work we give guidelines for the construction of new high order conforming finite element exa...
A general technique to develop arbitrary-sided polygonal elements based on the scaled boundary finit...
It is known that piecewise linear continuous finite element (FE) approximations on nonobtuse tetrahe...
Due to its unique and intriguing properties, polygonal and polyhedral discretization is an emerging ...
In this paper we present efficient quadrature rules for the numerical approximation of integrals of ...
In this paper, conforming finite elements on polygon meshes are developed. Polygonal finite elements...