In this paper, we present a non-conforming hp computational modeling methodology for solving elasticity problems. We consider the incompressible elasticity model formulated as a mixed displacement-pressure problem on a global domain which is partitioned into several local subdomains. The approximation within each local subdomain is designed using div-stable hp-mixed finite elements. The displacement is computed in a mortared space while the pressure is not subjected to any constraints across the interfaces. Our computational results demonstrate that the non-conforming finite element method presented for the elasticity problem satisfies similar rates of convergence as the conforming finite element method, in the presence of various h- versio...
This paper presents a nonconforming finite element approximation of the space of sym-metric tensors ...
We propose a new locking-free family of mixed finite element and finite volume element methods for t...
We analyze the application to elastodynamic problems of mixed finite element methods for elasticity ...
AbstractThe motivation of this work is to apply the hp-version of the mortar finite-element method t...
Two non-overlapping domain decomposition methods are presented for the mixed finite element formulat...
We present a mixed formulation for high-order spectral/hp element methods and investigate its stabil...
This article considers a mixed finite element method for linear elasticity. It is based on a modifie...
We construct first order, stable, nonconforming mixed finite elements for plane elasticity and analy...
This paper presents a nonconforming finite element approximation of the space of symmetric tensors w...
textIn my dissertation, I developed mixed hp-finite element methods for linear elasticity with weakl...
We consider mixed finite element methods for linear elasticity based on the Hellinger-Reissner varia...
Based on stress-deflection variational formulation, we propose a family of local projection-based st...
We present a symmetric version of the nonsymmetric mixed finite element method presented in (Lamichh...
In this paper, we present two stable rectangular nonconforming mixed finite element methods for the ...
Abstract We present a new family of rectangular mixed finite elements for the stress-displacement sy...
This paper presents a nonconforming finite element approximation of the space of sym-metric tensors ...
We propose a new locking-free family of mixed finite element and finite volume element methods for t...
We analyze the application to elastodynamic problems of mixed finite element methods for elasticity ...
AbstractThe motivation of this work is to apply the hp-version of the mortar finite-element method t...
Two non-overlapping domain decomposition methods are presented for the mixed finite element formulat...
We present a mixed formulation for high-order spectral/hp element methods and investigate its stabil...
This article considers a mixed finite element method for linear elasticity. It is based on a modifie...
We construct first order, stable, nonconforming mixed finite elements for plane elasticity and analy...
This paper presents a nonconforming finite element approximation of the space of symmetric tensors w...
textIn my dissertation, I developed mixed hp-finite element methods for linear elasticity with weakl...
We consider mixed finite element methods for linear elasticity based on the Hellinger-Reissner varia...
Based on stress-deflection variational formulation, we propose a family of local projection-based st...
We present a symmetric version of the nonsymmetric mixed finite element method presented in (Lamichh...
In this paper, we present two stable rectangular nonconforming mixed finite element methods for the ...
Abstract We present a new family of rectangular mixed finite elements for the stress-displacement sy...
This paper presents a nonconforming finite element approximation of the space of sym-metric tensors ...
We propose a new locking-free family of mixed finite element and finite volume element methods for t...
We analyze the application to elastodynamic problems of mixed finite element methods for elasticity ...