In the paper, the extended finite element method (XFEM) is combined with a recovery procedure in the analysis of the discontinuous Poisson problem. The model considers the weak as well as the strong discontinuity. Computationally efficient low-order finite elements provided good convergence are used. The combination of the XFEM with a recovery procedure allows for optimal convergence rates in the gradient i.e. as the same order as the primary solution. The discontinuity is modelled independently of the finite element mesh using a step-enrichment and level set approach. The results show improved gradient prediction locally for the interface element and globally for the entire domain
Discontinuities such as voids, cracks, material interfaces, and joints widely exist in nature. Conve...
In this work a multi-point constraint unfitted finite element method for the solution of the Poisson...
This article investigates the convergence properties of the augmented finite element method (AFEM). ...
In the paper, the extended finite element method (XFEM) is combined with a recovery procedure in the...
Discontinuous coefficients in the Poisson equation lead to the weak discontinuity in the solution, e...
We introduce a new methodology for modeling problems with both weak and strong discontinuities indep...
The computational study of discontinuous problems becomes increasingly important due to industrial n...
We adopt a numerical method to solve Poisson's equation on a fixed grid with embedded boundary condi...
peer reviewedPartition of unity methods, such as the extended finite element method, allows disconti...
Discontinuities can appear in different fields of mechanics. Some examples where discontinuities ari...
This article investigates the convergence properties of the augmented finite element method (AFEM). ...
International audienceThis paper presents and studies a residual a posteriori error estimator for La...
Abstract. Solution of multiphase problems shows discontinuities across the material inter-faces, whi...
Discontinuities such as voids, cracks, material interfaces, and joints widely exist in nature. Conve...
This thesis presents advances and applications of the eXtended Finite Element Method (XFEM). The no...
Discontinuities such as voids, cracks, material interfaces, and joints widely exist in nature. Conve...
In this work a multi-point constraint unfitted finite element method for the solution of the Poisson...
This article investigates the convergence properties of the augmented finite element method (AFEM). ...
In the paper, the extended finite element method (XFEM) is combined with a recovery procedure in the...
Discontinuous coefficients in the Poisson equation lead to the weak discontinuity in the solution, e...
We introduce a new methodology for modeling problems with both weak and strong discontinuities indep...
The computational study of discontinuous problems becomes increasingly important due to industrial n...
We adopt a numerical method to solve Poisson's equation on a fixed grid with embedded boundary condi...
peer reviewedPartition of unity methods, such as the extended finite element method, allows disconti...
Discontinuities can appear in different fields of mechanics. Some examples where discontinuities ari...
This article investigates the convergence properties of the augmented finite element method (AFEM). ...
International audienceThis paper presents and studies a residual a posteriori error estimator for La...
Abstract. Solution of multiphase problems shows discontinuities across the material inter-faces, whi...
Discontinuities such as voids, cracks, material interfaces, and joints widely exist in nature. Conve...
This thesis presents advances and applications of the eXtended Finite Element Method (XFEM). The no...
Discontinuities such as voids, cracks, material interfaces, and joints widely exist in nature. Conve...
In this work a multi-point constraint unfitted finite element method for the solution of the Poisson...
This article investigates the convergence properties of the augmented finite element method (AFEM). ...