textIn my dissertation, I developed mixed hp-finite element methods for linear elasticity with weakly imposed symmetry, which is based on Arnold-Falk-Winther's stable mixed finite elements. I have proved the h-stability of my method for meshes with arbitrary variable orders. In order to show the h-stability, I need an upper limit of the highest order of meshes, which can be an arbitrary nonnegative integer.Computational Science, Engineering, and Mathematic
The present work provides a straightforward and focused set of tools and corresponding theoretical s...
AbstractWe present a novel approach to automatic adaptivity in higher-order finite element methods (...
The convergence and optimality of adaptive mixed finite element methods for the Poisson equation are...
textIn my dissertation, I developed mixed hp-finite element methods for linear elasticity with weakl...
Abstract. We continue our study on variable order Arnold-Falk-Winther el-ements for 2D elasticity in...
AbstractIn the Hellinger–Reissner formulation for linear elasticity, both the displacement u and the...
The hp-FEM is a modern version of the Finite Element Method (FEM) which combines elements of variabl...
of dissertation hp-FEM FOR COUPLED PROBLEMS IN FLUID DYNAMICS Lenka Dubcová The thesis is concerned ...
Stabilized iterative schemes for mixed finite element methods are proposed and analyzed in two abstr...
In this paper, we present a non-conforming hp computational modeling methodology for solving elastic...
The subject of this thesis are adaptive mixed finite element methods for incompressible and nearly i...
We present a mixed formulation for high-order spectral/hp element methods and investigate its stabil...
We present a modified mixed formulation for second order elliptic equations and linear elasticity pr...
The so–called truly–mixed version of the Hellinger–Reissner variational principle implements a regu...
Abstract. There have been many eorts, dating back four decades, to develop stable mixed nite element...
The present work provides a straightforward and focused set of tools and corresponding theoretical s...
AbstractWe present a novel approach to automatic adaptivity in higher-order finite element methods (...
The convergence and optimality of adaptive mixed finite element methods for the Poisson equation are...
textIn my dissertation, I developed mixed hp-finite element methods for linear elasticity with weakl...
Abstract. We continue our study on variable order Arnold-Falk-Winther el-ements for 2D elasticity in...
AbstractIn the Hellinger–Reissner formulation for linear elasticity, both the displacement u and the...
The hp-FEM is a modern version of the Finite Element Method (FEM) which combines elements of variabl...
of dissertation hp-FEM FOR COUPLED PROBLEMS IN FLUID DYNAMICS Lenka Dubcová The thesis is concerned ...
Stabilized iterative schemes for mixed finite element methods are proposed and analyzed in two abstr...
In this paper, we present a non-conforming hp computational modeling methodology for solving elastic...
The subject of this thesis are adaptive mixed finite element methods for incompressible and nearly i...
We present a mixed formulation for high-order spectral/hp element methods and investigate its stabil...
We present a modified mixed formulation for second order elliptic equations and linear elasticity pr...
The so–called truly–mixed version of the Hellinger–Reissner variational principle implements a regu...
Abstract. There have been many eorts, dating back four decades, to develop stable mixed nite element...
The present work provides a straightforward and focused set of tools and corresponding theoretical s...
AbstractWe present a novel approach to automatic adaptivity in higher-order finite element methods (...
The convergence and optimality of adaptive mixed finite element methods for the Poisson equation are...