Add to ORKGsummary:We describe the basic ideas needed to obtain apriori error estimates for a nonlinear convection diffusion equation discretized by higher order conforming finite elements. For simplicity of presentation, we derive the key estimates under simplified assumptions, e.g. Dirichlet-only boundary conditions. The resulting error estimate is obtained using continuous mathematical induction for the space semi-discrete scheme
This study contemplates the Finite Element Method (FEM), a well-known numerical method, to find nume...
AbstractIn this paper, we establish the error estimates for the generalized hybrid finite element/fi...
Abstract In this paper, we derive an a posteriori error estimator, for nonconforming finite element ...
summary:We describe the basic ideas needed to obtain apriori error estimates for a nonlinear convect...
summary:We describe the basic ideas needed to obtain apriori error estimates for a nonlinear convect...
Abstract. The paper is concerned with the analysis of error estimates of the discontinuous Galerkin ...
Abstract. In classical mixed finite element method, the choice of the finite element approximating s...
summary:The subject of the paper is the derivation of error estimates for the combined finite volume...
Abstract. We analyze a posteriori error estimators for finite element discretizations of convection-...
AbstractThe cell discretization algorithm is applied to generate approximate solutions for some seco...
This paper is concerned with the analysis of the full discrete discon-tinuous Galerkin finite elemen...
Within the framework of finite element methods, the paper investigates a general approximation techn...
AbstractWe present a posteriori error estimates for a defect correction method for approximating sol...
Kyushu University 21st Century COE Program Development of Dynamic Mathematics with High Functionalit...
In this paper, we provide $L^2$ error estimates for the semi-discrete local discontinuous Galerkin m...
This study contemplates the Finite Element Method (FEM), a well-known numerical method, to find nume...
AbstractIn this paper, we establish the error estimates for the generalized hybrid finite element/fi...
Abstract In this paper, we derive an a posteriori error estimator, for nonconforming finite element ...
summary:We describe the basic ideas needed to obtain apriori error estimates for a nonlinear convect...
summary:We describe the basic ideas needed to obtain apriori error estimates for a nonlinear convect...
Abstract. The paper is concerned with the analysis of error estimates of the discontinuous Galerkin ...
Abstract. In classical mixed finite element method, the choice of the finite element approximating s...
summary:The subject of the paper is the derivation of error estimates for the combined finite volume...
Abstract. We analyze a posteriori error estimators for finite element discretizations of convection-...
AbstractThe cell discretization algorithm is applied to generate approximate solutions for some seco...
This paper is concerned with the analysis of the full discrete discon-tinuous Galerkin finite elemen...
Within the framework of finite element methods, the paper investigates a general approximation techn...
AbstractWe present a posteriori error estimates for a defect correction method for approximating sol...
Kyushu University 21st Century COE Program Development of Dynamic Mathematics with High Functionalit...
In this paper, we provide $L^2$ error estimates for the semi-discrete local discontinuous Galerkin m...
This study contemplates the Finite Element Method (FEM), a well-known numerical method, to find nume...
AbstractIn this paper, we establish the error estimates for the generalized hybrid finite element/fi...
Abstract In this paper, we derive an a posteriori error estimator, for nonconforming finite element ...