International audienceWe propose a simple modification of a recently introduced locking-free finite element method for the Reissner-Mindlin plate model. By this modification, we are able to obtain optimal convergence rates on numerical benchmarks. These results are substantiated by a complete mathematical analysis which provides optimal a priori error estimates
In a recent paper of Arnold, Brezzi, and, the ideas of discontinuous Galerkin methods were used to ...
We develop a locking free nonconforming element for the Reissner-Mindlin plate using Discontinuous G...
Adaptive algorithms are important tools for efficient finite-element mesh design. In this paper, an ...
We prove optimal error estimates in L2 for a nonconforming finite element for Reissner-Mindlin plate...
We report on recent results about some nonconforming finite elements for plates. All the elements ar...
this paper is to study a low order finite element scheme proposed by O~nate, Zarate, and Flores [15]...
The solution of the Reissner–Mindlin plate problem with free boundary conditions presents a strong ...
We report on recent results about some nonconforming ¯nite elements for plates, introduced and analy...
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 Gale...
We prove optimal error estimates in L2 for a nonconforming ¯nite element for Reissner-Mindlin plates...
Abstract. In a recent paper of Arnold, Brezzi, and Marini [4], the ideas of discontinuous Galerkin m...
We propose a locking-free element for plate bending problems, based on the use of nonconforming piec...
We develop a family of locking-free elements for the Reissner– Mindlin plate using Discontinuous Gal...
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 develop a locking free nonconforming element for the Reissner-Mindlin plate using Discontinuous G...
Adaptive algorithms are important tools for efficient finite-element mesh design. In this paper, an ...
We prove optimal error estimates in L2 for a nonconforming finite element for Reissner-Mindlin plate...
We report on recent results about some nonconforming finite elements for plates. All the elements ar...
this paper is to study a low order finite element scheme proposed by O~nate, Zarate, and Flores [15]...
The solution of the Reissner–Mindlin plate problem with free boundary conditions presents a strong ...
We report on recent results about some nonconforming ¯nite elements for plates, introduced and analy...
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 Gale...
We prove optimal error estimates in L2 for a nonconforming ¯nite element for Reissner-Mindlin plates...
Abstract. In a recent paper of Arnold, Brezzi, and Marini [4], the ideas of discontinuous Galerkin m...
We propose a locking-free element for plate bending problems, based on the use of nonconforming piec...
We develop a family of locking-free elements for the Reissner– Mindlin plate using Discontinuous Gal...
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 develop a locking free nonconforming element for the Reissner-Mindlin plate using Discontinuous G...
Adaptive algorithms are important tools for efficient finite-element mesh design. In this paper, an ...
DOI
Add to ORKG