AbstractIn the current paper, we study the convergence properties of the DGFE approximation of optimal control problem governed by convection–diffusion equations. We derive a posteriori error estimates and a priori error estimates for both the states, ad-joint and the control variable approximation. For the optimal control problem, these estimates are apparently not available in the literature
A new a posteriori error estimation technique is applied to the sta-tionary convection-reaction-diff...
In this paper, we study the numerical solution of optimal control problems governed by a system of c...
Abstract. In this work, we study priori error estimates for the numerical ap-proximation of an optim...
Optimal L∞(L2)-error estimates for the DG method applied to nonlinear convection–diffusion problems ...
We study a posteriori error estimates for the numerical approximations of state constrained optimal ...
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...
Abstract. In this paper, a discontinuous Galerkin finite element method with interior penalties for ...
In this paper, we investigate an a posteriori error estimate of a control constrained op-timal contr...
Many real-life applications such as the shape optimization of technological devices, the identificat...
In this paper, we investigate a posteriori error estimates of a control-constrained optimal control ...
AbstractIn this paper, we study an edge-stabilization Galerkin approximation scheme for the constrai...
In this paper, we study a posteriori error estimates of the upwind symmetric interior penalty Galerk...
We study a residual–based a posteriori error estimate for the solution of Dirichlet boundary control...
We propose an embedded discontinuous Galerkin (EDG) method to approximate the solution of a distribu...
A new a posteriori error estimation technique is applied to the sta-tionary convection-reaction-diff...
In this paper, we study the numerical solution of optimal control problems governed by a system of c...
Abstract. In this work, we study priori error estimates for the numerical ap-proximation of an optim...
Optimal L∞(L2)-error estimates for the DG method applied to nonlinear convection–diffusion problems ...
We study a posteriori error estimates for the numerical approximations of state constrained optimal ...
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...
Abstract. In this paper, a discontinuous Galerkin finite element method with interior penalties for ...
In this paper, we investigate an a posteriori error estimate of a control constrained op-timal contr...
Many real-life applications such as the shape optimization of technological devices, the identificat...
In this paper, we investigate a posteriori error estimates of a control-constrained optimal control ...
AbstractIn this paper, we study an edge-stabilization Galerkin approximation scheme for the constrai...
In this paper, we study a posteriori error estimates of the upwind symmetric interior penalty Galerk...
We study a residual–based a posteriori error estimate for the solution of Dirichlet boundary control...
We propose an embedded discontinuous Galerkin (EDG) method to approximate the solution of a distribu...
A new a posteriori error estimation technique is applied to the sta-tionary convection-reaction-diff...
In this paper, we study the numerical solution of optimal control problems governed by a system of c...
Abstract. In this work, we study priori error estimates for the numerical ap-proximation of an optim...