In this paper we present a general approach to embed arbitrary approximation spaces into classical finite element simulations in a non-intrusive fashion. To this end, we employ a global partition of unity method to splice the two independent approximation spaces together. The main goal of this research is to enable the timely evaluation of novel discretization approaches and meshfree techniques in an industrial context by embedding them into large scale finite element simulations. We present some numerical results showing the generality and effectiveness of our approach
This contribution presents two advances in the formulation of discontinuous approximations in finite...
Abstract This paper presents a robust enrichment strategy to model weak and strong discontinuities a...
In this paper, we have obtained an approximation result in the Gener-alized Finite Element Method (G...
Abstract In this paper we are concerned with the non-invasive embedding of enriched partition of uni...
In this paper, meshless methods and partition of unity based finite element methods are reviewed. In...
A technique to couple finite element discretizations with any partition of unity based approximation...
This paper is concerned with the generalization of the finite element method via the use of non-poly...
ABSTRACT: In this paper, meshless methods and partition of unity based finite element methods are re...
The simulation of the behavior of heterogeneous and composite materials poses a number of challenges...
For computational efficiency, partition of unity enrichments are preferably localized to the sub‐dom...
The partition of unity finite element method (PUFEM) proposed in this paper makes it possible to ble...
International audienceNumerous models encountered in science and engineering remain nowadays , despi...
The paper presents the basic ideas and the mathematical foundation of the partition of unity finite ...
153 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2009.In this work, we propose a pr...
This book gathers selected contributions on emerging research work presented at the International Co...
This contribution presents two advances in the formulation of discontinuous approximations in finite...
Abstract This paper presents a robust enrichment strategy to model weak and strong discontinuities a...
In this paper, we have obtained an approximation result in the Gener-alized Finite Element Method (G...
Abstract In this paper we are concerned with the non-invasive embedding of enriched partition of uni...
In this paper, meshless methods and partition of unity based finite element methods are reviewed. In...
A technique to couple finite element discretizations with any partition of unity based approximation...
This paper is concerned with the generalization of the finite element method via the use of non-poly...
ABSTRACT: In this paper, meshless methods and partition of unity based finite element methods are re...
The simulation of the behavior of heterogeneous and composite materials poses a number of challenges...
For computational efficiency, partition of unity enrichments are preferably localized to the sub‐dom...
The partition of unity finite element method (PUFEM) proposed in this paper makes it possible to ble...
International audienceNumerous models encountered in science and engineering remain nowadays , despi...
The paper presents the basic ideas and the mathematical foundation of the partition of unity finite ...
153 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2009.In this work, we propose a pr...
This book gathers selected contributions on emerging research work presented at the International Co...
This contribution presents two advances in the formulation of discontinuous approximations in finite...
Abstract This paper presents a robust enrichment strategy to model weak and strong discontinuities a...
In this paper, we have obtained an approximation result in the Gener-alized Finite Element Method (G...