We study a residual–based a posteriori error estimate for the solution of Dirichlet boundary control problem governed by a convection diffusion equation on a two dimensional convex polygonal domain, using the local discontinuous Galerkin (LDG) method with upwinding for the convection term. With the usage of LDG method, the control variable naturally exists in the variational form due to its mixed finite element structure. We also demonstrate the application of our a posteriori error estimator for the adaptive solution of these optimal control problems
In the first part of this work, we analyzed an unconstrained Dirichlet boundary control problem for ...
In this paper, we study a posteriori error estimates of the upwind symmetric interior penalty Galerk...
Abstract. We analyze a posteriori error estimators for finite element discretizations of convection-...
We study a residual–based a posteriori error estimate for the solution of Dirichlet boundary control...
We study a posteriori error estimates for the numerical approximations of state constrained optimal ...
In this paper, we investigate an a posteriori error estimate of a control constrained op-timal contr...
In this paper, we investigate a posteriori error estimates of a control-constrained optimal control ...
In this paper, we investigate a posteriori error estimates of a control-constrained optimal control ...
Abstract. In this paper we analyze the Local Discontinuous Galerkin (LDG) method for the constrained...
The present thesis is concerned with the development and practical implementation of robust a-poster...
This thesis is concerned with several issues of a posteriori error estimates for linear problems. In...
In this paper we derive an a posteriori error estimate for the Lagrange-Galerkin discretisation of a...
A local adaptive discontinuous Galerkin method for convection-diffusion-reaction equations is introd...
The thesis deals with a posteriori error estimates of the discontinuous Galerkin aproximations of di...
In this paper, we study the numerical solution of optimal control problems governed by a system of c...
In the first part of this work, we analyzed an unconstrained Dirichlet boundary control problem for ...
In this paper, we study a posteriori error estimates of the upwind symmetric interior penalty Galerk...
Abstract. We analyze a posteriori error estimators for finite element discretizations of convection-...
We study a residual–based a posteriori error estimate for the solution of Dirichlet boundary control...
We study a posteriori error estimates for the numerical approximations of state constrained optimal ...
In this paper, we investigate an a posteriori error estimate of a control constrained op-timal contr...
In this paper, we investigate a posteriori error estimates of a control-constrained optimal control ...
In this paper, we investigate a posteriori error estimates of a control-constrained optimal control ...
Abstract. In this paper we analyze the Local Discontinuous Galerkin (LDG) method for the constrained...
The present thesis is concerned with the development and practical implementation of robust a-poster...
This thesis is concerned with several issues of a posteriori error estimates for linear problems. In...
In this paper we derive an a posteriori error estimate for the Lagrange-Galerkin discretisation of a...
A local adaptive discontinuous Galerkin method for convection-diffusion-reaction equations is introd...
The thesis deals with a posteriori error estimates of the discontinuous Galerkin aproximations of di...
In this paper, we study the numerical solution of optimal control problems governed by a system of c...
In the first part of this work, we analyzed an unconstrained Dirichlet boundary control problem for ...
In this paper, we study a posteriori error estimates of the upwind symmetric interior penalty Galerk...
Abstract. We analyze a posteriori error estimators for finite element discretizations of convection-...