summary:We derive a residual based a posteriori error estimate for the Stokes-Brinkman problem on a two-dimensional polygonal domain. We use Taylor-Hood triangular elements. The link to the possible information on the regularity of the problem is discussed
International audienceIn this paper, we develop adaptive inexact versions of iterative algorithms ap...
Optimal a posteriori error estimates in L∞(L2) are derived for the finite element approximation of A...
summary:A lot of papers and books analyze analytical a posteriori error estimates from the point of ...
summary:We derive a residual based a posteriori error estimate for the Stokes-Brinkman problem on a ...
We consider the standard Taylor-Hood finite element method for the stationary Stokes system on polyh...
AbstractA residual-based error estimator for the MINI-element approximation of the Stokes problem is...
We consider Poisson's equation with a finite number of weighted Dirac masses as a source term, toget...
peer-reviewedLower a posteriori error bounds obtained using the standard bubble function approach ar...
AbstractWe utilize the classical hypercircle method and the lowest-order Raviart–Thomas H(div) eleme...
Presented at the 4th XoveTIC Conference, A Coruña, Spain, 7–8 October 2021.[Abstract] We considered ...
For elliptic interface problems in two and three dimensions, this paper studies a priori and residu...
Problems involving the solution of partial differential equations over surfaces appear in many engin...
In this paper the basic concepts to obtain a posteriori error estimates for the finite element metho...
AbstractIn this work, we study the error in the approximation of the solution of elliptic partial di...
This Chapter aims to investigate the error estimation of numerical approximation to a class of semil...
International audienceIn this paper, we develop adaptive inexact versions of iterative algorithms ap...
Optimal a posteriori error estimates in L∞(L2) are derived for the finite element approximation of A...
summary:A lot of papers and books analyze analytical a posteriori error estimates from the point of ...
summary:We derive a residual based a posteriori error estimate for the Stokes-Brinkman problem on a ...
We consider the standard Taylor-Hood finite element method for the stationary Stokes system on polyh...
AbstractA residual-based error estimator for the MINI-element approximation of the Stokes problem is...
We consider Poisson's equation with a finite number of weighted Dirac masses as a source term, toget...
peer-reviewedLower a posteriori error bounds obtained using the standard bubble function approach ar...
AbstractWe utilize the classical hypercircle method and the lowest-order Raviart–Thomas H(div) eleme...
Presented at the 4th XoveTIC Conference, A Coruña, Spain, 7–8 October 2021.[Abstract] We considered ...
For elliptic interface problems in two and three dimensions, this paper studies a priori and residu...
Problems involving the solution of partial differential equations over surfaces appear in many engin...
In this paper the basic concepts to obtain a posteriori error estimates for the finite element metho...
AbstractIn this work, we study the error in the approximation of the solution of elliptic partial di...
This Chapter aims to investigate the error estimation of numerical approximation to a class of semil...
International audienceIn this paper, we develop adaptive inexact versions of iterative algorithms ap...
Optimal a posteriori error estimates in L∞(L2) are derived for the finite element approximation of A...
summary:A lot of papers and books analyze analytical a posteriori error estimates from the point of ...