In this paper, a nonconforming finite element method has been proposed and analyzed for the von Kármán equations that describe bending of thin elastic plates. Optimal order error estimates in broken energy and H1 norms are derived under minimal regularity assumptions. Numerical results that justify the theoretical results are presented
This paper presents a procedure for computing approximate solution of bending Kirchhoff plate with a...
We study the F\uf6ppl-von K\ue1rm\ue1n theory for isotropically compressed thin plates in a geometri...
We discuss the method of linearization and construction of perturbation solutions for the Foppl-von ...
In this paper, we consider canonical von Karman equations that describe the bending of thin elastic ...
This paper analyses the nonconforming Morley type virtual element method to approximate a regular so...
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...
We analyse the «assumed stresses» hybrid approximation of the Von Karman equations; we provide conve...
Abstract. We propose a locking-free element for plate bending problems, based on the use of nonconfo...
We propose a locking-free element for plate bending problems, based on the use of nonconforming piec...
One of the most popular finite element method for Reissner-Mindlin plates is the so-called MITC4 met...
This paper deals with the numerical approximation of the bending of a plate modeled by Reissner-Mind...
In this article we propose and analyze a Virtual Element Method (VEM) to approximate the isolated so...
We study the Föppl-von Kármán theory for isotropically compressed thin plates in a geometrically lin...
We study the Föppl-von Kármán theory for isotropically compressed thin plates in a geometrically lin...
This paper presents a procedure for computing approximate solution of bending Kirchhoff plate with a...
We study the F\uf6ppl-von K\ue1rm\ue1n theory for isotropically compressed thin plates in a geometri...
We discuss the method of linearization and construction of perturbation solutions for the Foppl-von ...
In this paper, we consider canonical von Karman equations that describe the bending of thin elastic ...
This paper analyses the nonconforming Morley type virtual element method to approximate a regular so...
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...
We analyse the «assumed stresses» hybrid approximation of the Von Karman equations; we provide conve...
Abstract. We propose a locking-free element for plate bending problems, based on the use of nonconfo...
We propose a locking-free element for plate bending problems, based on the use of nonconforming piec...
One of the most popular finite element method for Reissner-Mindlin plates is the so-called MITC4 met...
This paper deals with the numerical approximation of the bending of a plate modeled by Reissner-Mind...
In this article we propose and analyze a Virtual Element Method (VEM) to approximate the isolated so...
We study the Föppl-von Kármán theory for isotropically compressed thin plates in a geometrically lin...
We study the Föppl-von Kármán theory for isotropically compressed thin plates in a geometrically lin...
This paper presents a procedure for computing approximate solution of bending Kirchhoff plate with a...
We study the F\uf6ppl-von K\ue1rm\ue1n theory for isotropically compressed thin plates in a geometri...
We discuss the method of linearization and construction of perturbation solutions for the Foppl-von ...
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