summary:We show that a non-standard mixed finite element method proposed by Barrios and Gatica in 2007, is a higher order perturbation of the least-squares mixed finite element method. Therefore, it is also superconvergent whenever the least-squares mixed finite element method is superconvergent. Superconvergence of the latter was earlier investigated by Brandts, Chen and Yang between 2004 and 2006. Since the new method leads to a non-symmetric system matrix, its application seems however more expensive than applying the least-squares mixed finite element method
This report has the main aim of comparing the Mixed Finite Element Method to the standard Finite Ele...
In this paper, we suggest a new patch condition for nonconforming mixed finite elements (MFEs) on pa...
Abstract In this paper, a low order nonconforming mixed finite element method (MFEM) is studied with...
summary:We show that a non-standard mixed finite element method proposed by Barrios and Gatica in 2...
In this dissertation, we develop new superconvergence estimates of mixed and nonconforming finite el...
Abstract. This paper develops a general superconvergence result for the least-squares mixed finite e...
In this paper we prove superconvergence error estimates for the vector variable for mixed finite ele...
summary:Natural superconvergence of the least-squares finite element method is surveyed for the one-...
summary:We will show that some of the superconvergence properties for the mixed finite element metho...
AbstractIn this paper we prove some superconvergence of a new family of mixed finite element spaces ...
AbstractThis paper is devoted to a study of mathematical properties of certain mixed finite element ...
In the first chapter, basic error estimates are derived for the lowest-order Raviart-Thomas mixed me...
In this paper, we present a superconvergence result for the mixed finite element approximations of g...
. We consider mixed finite element methods for second order elliptic equations on non-matching multi...
In this paper we show that mixed finite element methods for a fairly general second order elliptic p...
This report has the main aim of comparing the Mixed Finite Element Method to the standard Finite Ele...
In this paper, we suggest a new patch condition for nonconforming mixed finite elements (MFEs) on pa...
Abstract In this paper, a low order nonconforming mixed finite element method (MFEM) is studied with...
summary:We show that a non-standard mixed finite element method proposed by Barrios and Gatica in 2...
In this dissertation, we develop new superconvergence estimates of mixed and nonconforming finite el...
Abstract. This paper develops a general superconvergence result for the least-squares mixed finite e...
In this paper we prove superconvergence error estimates for the vector variable for mixed finite ele...
summary:Natural superconvergence of the least-squares finite element method is surveyed for the one-...
summary:We will show that some of the superconvergence properties for the mixed finite element metho...
AbstractIn this paper we prove some superconvergence of a new family of mixed finite element spaces ...
AbstractThis paper is devoted to a study of mathematical properties of certain mixed finite element ...
In the first chapter, basic error estimates are derived for the lowest-order Raviart-Thomas mixed me...
In this paper, we present a superconvergence result for the mixed finite element approximations of g...
. We consider mixed finite element methods for second order elliptic equations on non-matching multi...
In this paper we show that mixed finite element methods for a fairly general second order elliptic p...
This report has the main aim of comparing the Mixed Finite Element Method to the standard Finite Ele...
In this paper, we suggest a new patch condition for nonconforming mixed finite elements (MFEs) on pa...
Abstract In this paper, a low order nonconforming mixed finite element method (MFEM) is studied with...