An A Posteriori Error Estimator for a Non Homogeneous Dirichlet Problem Considering a Dual Mixed Formulation

Abstract: In this paper, we describe an a posteriori error analysis for a conforming dual mixed scheme of the Poisson problem with non homogeneous Dirichlet boundary condition. As a result, we obtain an a posteriori error estimator, which is proven to be reliable and locally efficient with respect to the usual norm on H(div;Omega) x L^2(Omega). We remark that the analysis relies on the standard Ritz projection of the error, and take into account a kind of a quasi-Helmholtz decomposition of functions in H(div;Omega), whi… Show more

“…Remark 23. The results for Poisson problem with pure non homogeneous Dirichlet boundary condition, valid for 2D and 3D cases, can be found in [9]. Concerning to this work, we can comment that the quasi Helmholtz decomposition established there, is not exactly the same as the one proved in the current article.…”

A note on a posteriori error analysis for dual mixed methods with mixed boundary conditions

“…Remark 23. The results for Poisson problem with pure non homogeneous Dirichlet boundary condition, valid for 2D and 3D cases, can be found in [9]. Concerning to this work, we can comment that the quasi Helmholtz decomposition established there, is not exactly the same as the one proved in the current article.…”

A note on a posteriori error analysis for dual mixed methods with mixed boundary conditions