Add to ORKGThis work deals with the formulation and implementation of an energy-momentum conserving algorithm for conducting the nonlinear transient analysis of structures, within the framework of stress-based hybrid elements. Hybrid elements, which are based on a two-field variational formulation, are much less susceptible to locking than conventional displacement-based elements within the static framework. We show that this advantage carries over to the transient case, so that not only are the solutions obtained more accurate, but they are obtained in fewer iterations. We demonstrate the efficacy of the algorithm on a wide range of problems such as ones involving dynamic buckling, complicated three-dimensional motions, et cetera
Hybrid stress elements are proposed as alternative to standard finite elements for linear and non li...
This work deals with the formulation and implementation of a mixed finite element formulation for no...
Traditional time integration algorithms for finite-element discretization are numerically stable onl...
This work deals with the formulation and implementation of an energy-momentum conserving algo-rithm ...
Standard displacement-based finite elements are known to display overstiff behavior known as locking...
[[abstract]]The objective of this study is to present an iterative momentum-time element for nonline...
Although they are the most widely used time integration algorithms for finite-element discretization...
Hybrid elements, which are based on a two-field variational formulation with the displacements and s...
The hybrid approach coupling Statistical Energy Analysis (SEA) and the finite element method has bec...
It is widely recognized that displacement elements produce poor stress fields, which do not satisfy ...
International audienceIn a previous paper [L. Noels, L. Stainier, J.-P. Ponthot, An energy momentum ...
A new hybrid-stress finite element algorithm, suitable for analyses of large, quasistatic, inelastic...
In a previous paper [L. Noels, L. Stainier, J.-P. Ponthot, An energy momentum conserving algorithm u...
In the present paper two main research areas of computational mechanics, namely the finite element d...
The formulation basis for nonlinear transient analysis of finite element models of structures using ...
Hybrid stress elements are proposed as alternative to standard finite elements for linear and non li...
This work deals with the formulation and implementation of a mixed finite element formulation for no...
Traditional time integration algorithms for finite-element discretization are numerically stable onl...
This work deals with the formulation and implementation of an energy-momentum conserving algo-rithm ...
Standard displacement-based finite elements are known to display overstiff behavior known as locking...
[[abstract]]The objective of this study is to present an iterative momentum-time element for nonline...
Although they are the most widely used time integration algorithms for finite-element discretization...
Hybrid elements, which are based on a two-field variational formulation with the displacements and s...
The hybrid approach coupling Statistical Energy Analysis (SEA) and the finite element method has bec...
It is widely recognized that displacement elements produce poor stress fields, which do not satisfy ...
International audienceIn a previous paper [L. Noels, L. Stainier, J.-P. Ponthot, An energy momentum ...
A new hybrid-stress finite element algorithm, suitable for analyses of large, quasistatic, inelastic...
In a previous paper [L. Noels, L. Stainier, J.-P. Ponthot, An energy momentum conserving algorithm u...
In the present paper two main research areas of computational mechanics, namely the finite element d...
The formulation basis for nonlinear transient analysis of finite element models of structures using ...
Hybrid stress elements are proposed as alternative to standard finite elements for linear and non li...
This work deals with the formulation and implementation of a mixed finite element formulation for no...
Traditional time integration algorithms for finite-element discretization are numerically stable onl...