Add to ORKGWe develop a family of locking-free elements for the Reissner-Mindlin plate using Discontinuous Galerkin techniques, one for each odd degree, and prove optimal error estimates. A second family uses conforming elements for the rotations and nonconforming elements for the transverse displacement, generalizing the element of Arnold and Falk to higher degree
This paper generalizes two nonconforming rectangular elements of the Reissner-Mindlin plate to the q...
In this paper, we apply an a posteriori error control theory that we develop in a very recent paper ...
this paper is to study a low order finite element scheme proposed by O~nate, Zarate, and Flores [15]...
We develop a family of locking-free elements for the Reissner-Mindlin plate using Discontinuous Gal...
We develop a family of locking-free elements for the Reissner– Mindlin plate using Discontinuous Gal...
We develop a locking free nonconforming element for the Reissner-Mindlin plate using Discontinuous G...
Abstract. In a recent paper of Arnold, Brezzi, and Marini [4], the ideas of discontinuous Galerkin m...
We prove optimal error estimates in L2 for a nonconforming finite element for Reissner-Mindlin plate...
In a recent paper of Arnold, Brezzi, and, the ideas of discontinuous Galerkin methods were used to ...
In a recent paper of Arnold, Brezzi, and, the ideas of discontinuous Galerkin methods were used to ...
We prove optimal error estimates in L2 for a nonconforming ¯nite element for Reissner-Mindlin plates...
We report on recent results about some nonconforming finite elements for plates. All the elements ar...
We present a continuous-discontinuous finite element method for the Mindlin-Reissner plate model bas...
International audienceWe propose a simple modification of a recently introduced locking-free finite ...
We propose a locking-free element for plate bending problems, based on the use of nonconforming piec...
This paper generalizes two nonconforming rectangular elements of the Reissner-Mindlin plate to the q...
In this paper, we apply an a posteriori error control theory that we develop in a very recent paper ...
this paper is to study a low order finite element scheme proposed by O~nate, Zarate, and Flores [15]...
We develop a family of locking-free elements for the Reissner-Mindlin plate using Discontinuous Gal...
We develop a family of locking-free elements for the Reissner– Mindlin plate using Discontinuous Gal...
We develop a locking free nonconforming element for the Reissner-Mindlin plate using Discontinuous G...
Abstract. In a recent paper of Arnold, Brezzi, and Marini [4], the ideas of discontinuous Galerkin m...
We prove optimal error estimates in L2 for a nonconforming finite element for Reissner-Mindlin plate...
In a recent paper of Arnold, Brezzi, and, the ideas of discontinuous Galerkin methods were used to ...
In a recent paper of Arnold, Brezzi, and, the ideas of discontinuous Galerkin methods were used to ...
We prove optimal error estimates in L2 for a nonconforming ¯nite element for Reissner-Mindlin plates...
We report on recent results about some nonconforming finite elements for plates. All the elements ar...
We present a continuous-discontinuous finite element method for the Mindlin-Reissner plate model bas...
International audienceWe propose a simple modification of a recently introduced locking-free finite ...
We propose a locking-free element for plate bending problems, based on the use of nonconforming piec...
This paper generalizes two nonconforming rectangular elements of the Reissner-Mindlin plate to the q...
In this paper, we apply an a posteriori error control theory that we develop in a very recent paper ...
this paper is to study a low order finite element scheme proposed by O~nate, Zarate, and Flores [15]...