We analyse the «assumed stresses» hybrid approximation of the Von Karman equations; we provide convergence results and optimal error bounds for a large class of finite element discretizations. © 1980 Instituto di Elaborazione della Informazione del CNR
A primal hybrid method for the biharmonic problem is developed. We find convergence results for a la...
An important limitation of finite element analysis, namely, the need for a large number of small ele...
An important limitation of finite element analysis, namely, the need for a large number of small ele...
We analyse the «assumed stresses» hybrid approximation of the Von Karman equations; we provide conve...
We analyse the «assumed stresses» hybrid approximation of the Von Karman equations; we provide conve...
In this paper, we consider canonical von Karman equations that describe the bending of thin elastic ...
In this paper, a nonconforming finite element method has been proposed and analyzed for th...
A new hybrid-stress finite element algorithm, suitable for analyses of large, quasistatic, inelastic...
Partial Differential Equations (PDEs) are a fundamental tool in modelling various physical phenomena...
AIrstract-A new hybrid stress finite element algorithm, based on a generalization of Fraeijs de Veub...
Three versions of the assumed stress hybrid model in finite element methods and the corresponding va...
A primal hybrid method for the biharmonic problem is developed. We find convergence results for a la...
Hybrid stress elements are proposed as alternative to standard finite elements for linear and non li...
A primal hybrid method for the biharmonic problem is developed. We find convergence results for a la...
Hybrid stress elements are proposed as alternative to standard finite elements for linear and non li...
A primal hybrid method for the biharmonic problem is developed. We find convergence results for a la...
An important limitation of finite element analysis, namely, the need for a large number of small ele...
An important limitation of finite element analysis, namely, the need for a large number of small ele...
We analyse the «assumed stresses» hybrid approximation of the Von Karman equations; we provide conve...
We analyse the «assumed stresses» hybrid approximation of the Von Karman equations; we provide conve...
In this paper, we consider canonical von Karman equations that describe the bending of thin elastic ...
In this paper, a nonconforming finite element method has been proposed and analyzed for th...
A new hybrid-stress finite element algorithm, suitable for analyses of large, quasistatic, inelastic...
Partial Differential Equations (PDEs) are a fundamental tool in modelling various physical phenomena...
AIrstract-A new hybrid stress finite element algorithm, based on a generalization of Fraeijs de Veub...
Three versions of the assumed stress hybrid model in finite element methods and the corresponding va...
A primal hybrid method for the biharmonic problem is developed. We find convergence results for a la...
Hybrid stress elements are proposed as alternative to standard finite elements for linear and non li...
A primal hybrid method for the biharmonic problem is developed. We find convergence results for a la...
Hybrid stress elements are proposed as alternative to standard finite elements for linear and non li...
A primal hybrid method for the biharmonic problem is developed. We find convergence results for a la...
An important limitation of finite element analysis, namely, the need for a large number of small ele...
An important limitation of finite element analysis, namely, the need for a large number of small ele...
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