summary:We will show that some of the superconvergence properties for the mixed finite element method for elliptic problems are preserved in the mixed semi-discretizations for a diffusion equation and for a Maxwell equation in two space dimensions. With the help of mixed elliptic projection we will present estimates global and pointwise in time. The results for the Maxwell equations form an extension of existing results. For both problems, our results imply that post-processing and a posteriori error estimation for the error in the space discretization can be performed in the same way as for the underlying elliptic problem
In this paper, we investigate the superconvergence property of mixed finite element methods for a li...
summary:Natural superconvergence of the least-squares finite element method is surveyed for the one-...
In this paper, we present a superconvergence result for the mixed finite element approximations of g...
summary:We will show that some of the superconvergence properties for the mixed finite element metho...
In this paper we prove superconvergence error estimates for the vector variable for mixed finite ele...
summary:We will investigate the possibility to use superconvergence results for the mixed finite ele...
In this dissertation, we develop new superconvergence estimates of mixed and nonconforming finite el...
summary:We show that a non-standard mixed finite element method proposed by Barrios and Gatica in 2...
Abstract. This paper develops a general superconvergence result for the least-squares mixed finite e...
In this paper, a nonconforming mixed finite element approximat-ing to the three-dimensional time-har...
AbstractIn this paper, we consider the superconvergence of a mixed covolume method on the quasi-unif...
summary:A simple superconvergent scheme for the derivatives of finite element solution is presented,...
Abstract. We consider control-volume mixed finite element methods for the approximation of second-or...
summary:Second order elliptic systems with Dirichlet boundary conditions are solved by means of affi...
AbstractIn this paper we prove some superconvergence of a new family of mixed finite element spaces ...
In this paper, we investigate the superconvergence property of mixed finite element methods for a li...
summary:Natural superconvergence of the least-squares finite element method is surveyed for the one-...
In this paper, we present a superconvergence result for the mixed finite element approximations of g...
summary:We will show that some of the superconvergence properties for the mixed finite element metho...
In this paper we prove superconvergence error estimates for the vector variable for mixed finite ele...
summary:We will investigate the possibility to use superconvergence results for the mixed finite ele...
In this dissertation, we develop new superconvergence estimates of mixed and nonconforming finite el...
summary:We show that a non-standard mixed finite element method proposed by Barrios and Gatica in 2...
Abstract. This paper develops a general superconvergence result for the least-squares mixed finite e...
In this paper, a nonconforming mixed finite element approximat-ing to the three-dimensional time-har...
AbstractIn this paper, we consider the superconvergence of a mixed covolume method on the quasi-unif...
summary:A simple superconvergent scheme for the derivatives of finite element solution is presented,...
Abstract. We consider control-volume mixed finite element methods for the approximation of second-or...
summary:Second order elliptic systems with Dirichlet boundary conditions are solved by means of affi...
AbstractIn this paper we prove some superconvergence of a new family of mixed finite element spaces ...
In this paper, we investigate the superconvergence property of mixed finite element methods for a li...
summary:Natural superconvergence of the least-squares finite element method is surveyed for the one-...
In this paper, we present a superconvergence result for the mixed finite element approximations of g...