Add to ORKGIn this paper we consider the p-FEM for elliptic boundary value problems on tetrahedral meshes where the entries of the stiffness matrix are evaluated by numerical quadrature. Such a quadrature can be done by mapping the tetrahedron to a hexahedron via the Duffy transformation. We show that for tensor product Gauss-Lobatto-Jacobi quadrature formulas with q+1=p+1 points in each direction and shape functions that are adapted to the quadrature formula, one again has discrete stability for the fully discrete p-FEM. The present error analysis complements the work [Eibner/Melenk 2005] for the p-FEM on triangles/tetrahedra where it is shown that by adapting the shape functions to the quadrature formula, the stiffness matrix can be set up in optim...
peer reviewedWe present a method for computing robust shape quality measures defined for finite elem...
peer reviewedWe present a method for computing robust shape quality measures defined for finite elem...
AbstractA family of quadrature rules for integration over tetrahedral volumes is developed. The unde...
In this paper we consider the p-FEM for elliptic boundary value problems on tetrahedral meshes where...
We analyze and compare different techniques to set up the stiffness matrix in the hp-version of th...
summary:Linear tetrahedral finite elements whose dihedral angles are all nonobtuse guarantee the val...
It is known that piecewise linear continuous finite element (FE) approximations on nonobtuse tetrahe...
Abstract. We describe some results for the h version which per-tain to the questions on numerical qu...
A family of quadratic finite volume method (FVM) schemes are constructed and analyzed over tetrahedr...
In this work we present a survey of some geometric results on tetrahedral partitions and their refin...
The effect of numerical quadrature in finite element methods for solving quasilinear elliptic proble...
Multilevel quadrature methods for parametric operator equations such as the multilevel (quasi-) Mont...
We present new and efficient quadrature rules for computing the stiffness matrices of mass-lumped te...
In this paper we present efficient quadrature rules for the numerical approximation of integrals of ...
The finite cell method (FCM) is an immersed domain finite element method that combines higher-order ...
peer reviewedWe present a method for computing robust shape quality measures defined for finite elem...
peer reviewedWe present a method for computing robust shape quality measures defined for finite elem...
AbstractA family of quadrature rules for integration over tetrahedral volumes is developed. The unde...
In this paper we consider the p-FEM for elliptic boundary value problems on tetrahedral meshes where...
We analyze and compare different techniques to set up the stiffness matrix in the hp-version of th...
summary:Linear tetrahedral finite elements whose dihedral angles are all nonobtuse guarantee the val...
It is known that piecewise linear continuous finite element (FE) approximations on nonobtuse tetrahe...
Abstract. We describe some results for the h version which per-tain to the questions on numerical qu...
A family of quadratic finite volume method (FVM) schemes are constructed and analyzed over tetrahedr...
In this work we present a survey of some geometric results on tetrahedral partitions and their refin...
The effect of numerical quadrature in finite element methods for solving quasilinear elliptic proble...
Multilevel quadrature methods for parametric operator equations such as the multilevel (quasi-) Mont...
We present new and efficient quadrature rules for computing the stiffness matrices of mass-lumped te...
In this paper we present efficient quadrature rules for the numerical approximation of integrals of ...
The finite cell method (FCM) is an immersed domain finite element method that combines higher-order ...
peer reviewedWe present a method for computing robust shape quality measures defined for finite elem...
peer reviewedWe present a method for computing robust shape quality measures defined for finite elem...
AbstractA family of quadrature rules for integration over tetrahedral volumes is developed. The unde...