We introduce a new variant of Nodal Virtual Element spaces that mimics the ``Serendipity Finite Element Methods'' (whose most popular example is the 8-node quadrilateral) and allows to reduce (often in a significant way) the number of internal degrees of freedom. When applied to the faces of a three-dimensional decomposition, this allows a reduction in the number of face degrees of freedom: an improvement that cannot be achieved by a simple static condensation. On triangular and tetrahedral decompositions the new elements (contrary to the original VEMs) reduce exactly to the classical Lagrange FEM. On quadrilaterals and hexahedra the new elements are quite similar (and have the same amount of degrees of freedom) to the Serendipity Finite El...
Abstract. We develop a family of finite element spaces of differential forms defined on cubical mesh...
Abstract. We develop a family of finite element spaces of differential forms defined on cubical mesh...
The Virtual Element Method (VEM) is a generalization of the Finite Element Method (FEM) for the trea...
Abstract We introduce a new variant of Nodal Virtual Element spaces that mimics the "Serendipit...
We extend the basic idea of Serendipity Virtual Elements from the previous case (by the same autho...
We consider, as a simple model problem, the application of Virtual Element Methods (VEM) to the line...
Using the notion of multivariate lower set interpolation, we construct nodal basis functions for the...
These are the proceedings of the 25th International Conference on Domain Decomposition Methods in Sc...
Among Numerical Methods for PDEs, the Virtual Element Methods were introduced recently in order to a...
In this paper, we tackle the problem of constructing conforming Virtual Element spaces on polygons w...
In the present paper we construct virtual element spaces that are H(div)-conforming and H(curl)-conf...
We study the use of the Virtual Element Method (VEM) of order k for general second order elliptic pr...
This paper describes the formulation of shape functions and their derivatives for universal serendip...
We construct 2D and 3D finite element de Rham sequences of arbitrary polynomial degrees with extra s...
We present, on the simplest possible case, what we consider as the very basic features of the (brand...
Abstract. We develop a family of finite element spaces of differential forms defined on cubical mesh...
Abstract. We develop a family of finite element spaces of differential forms defined on cubical mesh...
The Virtual Element Method (VEM) is a generalization of the Finite Element Method (FEM) for the trea...
Abstract We introduce a new variant of Nodal Virtual Element spaces that mimics the "Serendipit...
We extend the basic idea of Serendipity Virtual Elements from the previous case (by the same autho...
We consider, as a simple model problem, the application of Virtual Element Methods (VEM) to the line...
Using the notion of multivariate lower set interpolation, we construct nodal basis functions for the...
These are the proceedings of the 25th International Conference on Domain Decomposition Methods in Sc...
Among Numerical Methods for PDEs, the Virtual Element Methods were introduced recently in order to a...
In this paper, we tackle the problem of constructing conforming Virtual Element spaces on polygons w...
In the present paper we construct virtual element spaces that are H(div)-conforming and H(curl)-conf...
We study the use of the Virtual Element Method (VEM) of order k for general second order elliptic pr...
This paper describes the formulation of shape functions and their derivatives for universal serendip...
We construct 2D and 3D finite element de Rham sequences of arbitrary polynomial degrees with extra s...
We present, on the simplest possible case, what we consider as the very basic features of the (brand...
Abstract. We develop a family of finite element spaces of differential forms defined on cubical mesh...
Abstract. We develop a family of finite element spaces of differential forms defined on cubical mesh...
The Virtual Element Method (VEM) is a generalization of the Finite Element Method (FEM) for the trea...