In recent years, the numerical treatment of boundary value problems with the help of polygonal and polyhedral discretization techniques has received a lot of attention within several disciplines. Due to the general element shapes an enormous flexibility is gained and can be exploited, for instance, in adaptive mesh refinement strategies. The Virtual Element Method (VEM) is one of the new promising approaches applicable on general meshes. Although polygonal element shapes may be highly adapted, the analysis relies on isotropic elements which must not be very stretched. But, such anisotropic element shapes have a high potential in the discretization of interior and boundary layers. Recent results on anisotropic polygonal meshes are reviewed a...
We present novel techniques for obtaining the basic estimates of virtual element methods in terms of...
In this letter we compare the behaviour of standard Virtual Element Methods (VEM) and stabilization ...
In the discretization of differential problems on complex geometrical domains, discretization method...
In recent years, the numerical treatment of boundary value problems with the help of polygonal and p...
Due to its unique and intriguing properties, polygonal and polyhedral discretization is an emerging ...
We derive an anisotropic a posteriori error estimate for the adaptive conforming virtual element app...
Interpolation and quasi-interpolation operators of Clément- and Scott-Zhang-type are analyzed on ani...
The Virtual Element Method (VEM) is a generalization of the Finite Element Method (FEM) for the trea...
Generalized barycentric coordinates such as Wachspress and mean value coordinates have been used in ...
The virtual element method (VEM) is a recent technology that can make use of very general polygonal/...
This book introduces readers to one of the first methods developed for the numerical treatment of bo...
Among Numerical Methods for PDEs, the Virtual Element Methods were introduced recently in order to a...
A classical formulation of topology optimization addresses the problem of finding the best distribut...
We present a Virtual Element Method (VEM) for possibly nonlinear elastic and inelastic problems, mai...
Homogenized properties of polycrystalline materials are needed in many engineering applications. The...
We present novel techniques for obtaining the basic estimates of virtual element methods in terms of...
In this letter we compare the behaviour of standard Virtual Element Methods (VEM) and stabilization ...
In the discretization of differential problems on complex geometrical domains, discretization method...
In recent years, the numerical treatment of boundary value problems with the help of polygonal and p...
Due to its unique and intriguing properties, polygonal and polyhedral discretization is an emerging ...
We derive an anisotropic a posteriori error estimate for the adaptive conforming virtual element app...
Interpolation and quasi-interpolation operators of Clément- and Scott-Zhang-type are analyzed on ani...
The Virtual Element Method (VEM) is a generalization of the Finite Element Method (FEM) for the trea...
Generalized barycentric coordinates such as Wachspress and mean value coordinates have been used in ...
The virtual element method (VEM) is a recent technology that can make use of very general polygonal/...
This book introduces readers to one of the first methods developed for the numerical treatment of bo...
Among Numerical Methods for PDEs, the Virtual Element Methods were introduced recently in order to a...
A classical formulation of topology optimization addresses the problem of finding the best distribut...
We present a Virtual Element Method (VEM) for possibly nonlinear elastic and inelastic problems, mai...
Homogenized properties of polycrystalline materials are needed in many engineering applications. The...
We present novel techniques for obtaining the basic estimates of virtual element methods in terms of...
In this letter we compare the behaviour of standard Virtual Element Methods (VEM) and stabilization ...
In the discretization of differential problems on complex geometrical domains, discretization method...