This paper presents a procedure to build Ck, k arbitrarily large, generalized nite element (FE) shape functions dened on non-structured nite element meshes. The functions have the same support as corresponding global FE Lagrangian shape functions. Meshes with both convex and non-convex clouds (set of elements sharing a vertex node), can be used. The so-called R-functions are used to build Ck FE-based partition of unity functions with non-convex support. A technique to combine C0 Lagrangian FE shape functions with the proposed Ck partition of unity is presented. The technique allows the use of Ck generalized FE shape functions in parts of the computational domain where their high smoothness is required, as in the case of problems with distri...
The global-local analysis procedure in the Finite Element Method is broadly used in industry for the...
International audienceIn this paper a new extension of the mesh-free natural element method (NEM) is...
We propose a family of 3D versions of a smooth finite element method (Sunilkumar and Roy 2010), wher...
A technique to couple finite element discretizations with any partition of unity based approximation...
Here, we propose an extension of the Partition of Unit Finite Element Method (PUFEM) and a numerical...
A general technique to develop arbitrary-sided polygonal elements based on the scaled boundary finit...
The main feature of partition of unity methods such as the generalized or extended finite element me...
Generating matching meshes for problems with complex boundaries is often an intricate process, and t...
This paper is concerned with the generalization of the finite element method via the use of non-poly...
In this paper, an efficient and scalable approach for simulating inhomogeneous and non-linear elasti...
International audienceMany of the formulations of cm-rent research interest, including iosogeometric...
In this paper, we develop a method based on local maximum entropy shape functions together with enri...
AbstractFor many practical applications in engineering, a complex structure shows linear elastic beh...
International audienceIn this paper, a new approach is proposed to address issues associated with in...
The approximation properties of the finite element method can often be substantially improved by cho...
The global-local analysis procedure in the Finite Element Method is broadly used in industry for the...
International audienceIn this paper a new extension of the mesh-free natural element method (NEM) is...
We propose a family of 3D versions of a smooth finite element method (Sunilkumar and Roy 2010), wher...
A technique to couple finite element discretizations with any partition of unity based approximation...
Here, we propose an extension of the Partition of Unit Finite Element Method (PUFEM) and a numerical...
A general technique to develop arbitrary-sided polygonal elements based on the scaled boundary finit...
The main feature of partition of unity methods such as the generalized or extended finite element me...
Generating matching meshes for problems with complex boundaries is often an intricate process, and t...
This paper is concerned with the generalization of the finite element method via the use of non-poly...
In this paper, an efficient and scalable approach for simulating inhomogeneous and non-linear elasti...
International audienceMany of the formulations of cm-rent research interest, including iosogeometric...
In this paper, we develop a method based on local maximum entropy shape functions together with enri...
AbstractFor many practical applications in engineering, a complex structure shows linear elastic beh...
International audienceIn this paper, a new approach is proposed to address issues associated with in...
The approximation properties of the finite element method can often be substantially improved by cho...
The global-local analysis procedure in the Finite Element Method is broadly used in industry for the...
International audienceIn this paper a new extension of the mesh-free natural element method (NEM) is...
We propose a family of 3D versions of a smooth finite element method (Sunilkumar and Roy 2010), wher...