Amongst the various approaches of ‘meshless’ method, the Partition-ofunity concept married with the traditional finite-element method, namely PUFEM, has emerged to be competitive in solving the boundary-value problems. It inherits most of the advantages from both techniques except that the beauty of being ‘meshless’ vanishes. This paper presents an alternative approach to solve singular boundary-value problems. It follows the basic PUFEM procedures. The salient feature is to enhance the quality of the influence functions, either over one single nodal cover or multi-nodal-covers. In the vicinity of the singularity, available asymptotic analytical solution is employed to enrich the influence function. The beauty of present approach is...
In this article, we propose a Partition ofUnity Refinement (PUR)method to improve the local approxim...
Singular boundary-value problems appear frequently on the modellization of many physical phenomena a...
The Boundary Element Method (BEM) has become established as a technique well-suited to the modelling...
It has been well recognized that interface problems often contain strong singularities which make c...
It is well known that the standard finite element method based on the space Vh of continuous piecewi...
This paper introduces an enriched Boundary Element Method in which functions are introduced that ar...
Abstract. This study proposes a new formulation of singular boundary method (SBM) to solve the 2D po...
The present method offers an approach to 2D fracture problems where certain basis functions that are...
The paper presents the basic ideas and the mathematical foundation of the partition of unity finite ...
Here, we propose an extension of the Partition of Unit Finite Element Method (PUFEM) and a numerical...
AbstractWe compare two numerical methods for the solution of elliptic problems with boundary singula...
We introduce a novel enriched Boundary Element Method (BEM) and Dual Boundary Element Method (DBEM) ...
The chapter deals with the numerical solution of initial and boundary value problems for systems of ...
The partition of unity finite element method (PUFEM) proposed in this paper makes it possible to ble...
The singular finite element method is used to solve the sudden-expansion and the die-swell problems ...
In this article, we propose a Partition ofUnity Refinement (PUR)method to improve the local approxim...
Singular boundary-value problems appear frequently on the modellization of many physical phenomena a...
The Boundary Element Method (BEM) has become established as a technique well-suited to the modelling...
It has been well recognized that interface problems often contain strong singularities which make c...
It is well known that the standard finite element method based on the space Vh of continuous piecewi...
This paper introduces an enriched Boundary Element Method in which functions are introduced that ar...
Abstract. This study proposes a new formulation of singular boundary method (SBM) to solve the 2D po...
The present method offers an approach to 2D fracture problems where certain basis functions that are...
The paper presents the basic ideas and the mathematical foundation of the partition of unity finite ...
Here, we propose an extension of the Partition of Unit Finite Element Method (PUFEM) and a numerical...
AbstractWe compare two numerical methods for the solution of elliptic problems with boundary singula...
We introduce a novel enriched Boundary Element Method (BEM) and Dual Boundary Element Method (DBEM) ...
The chapter deals with the numerical solution of initial and boundary value problems for systems of ...
The partition of unity finite element method (PUFEM) proposed in this paper makes it possible to ble...
The singular finite element method is used to solve the sudden-expansion and the die-swell problems ...
In this article, we propose a Partition ofUnity Refinement (PUR)method to improve the local approxim...
Singular boundary-value problems appear frequently on the modellization of many physical phenomena a...
The Boundary Element Method (BEM) has become established as a technique well-suited to the modelling...