In Galerkin meshfree methods, because of a denser and unstructured connectivity, the creation and assembly of sparse matrices is expensive. Additionally, the cost of computing basis functions can be significant in problems requiring repetitive evaluations. We show that it is possible to overcome these two bottlenecks resorting to simple and effective algorithms. First, we create and fill the matrix by coarse-graining the connectivity between quadrature points and nodes. Second, we store only partial information about the basis functions, striking a balance between storage and computation. We show the performance of these strategies in relevant problems. (C) 2014 Elsevier Ltd. All rights reserved.Peer Reviewe
We present a method to blend local maximum entropy (LME) meshfree approximants and isogeometric anal...
The element-free Galerkin method (EFG) has specific characteristics that require the usage of techni...
Meshless methods have been explored in many 2D problems and they have been shown to be as accurate a...
In Galerkin meshfree methods, because of a denser and unstructured connectivity, the creation and as...
In this paper, an overview of the construction of meshfree basis functions is presented, with partic...
We present a method for the automatic adaption of the support size of meshfree basis functions in th...
Over the past two decades, meshfree methods have undergone significant development as a numerical to...
In this paper, we devise cell-based maximum-entropy (max-ent) basis functions that are used in a Gal...
In this paper, we devise cell-based maximum-entropy (max-ent) basis functions that are used in a Gal...
Numerical integration errors and volumetric locking in the near-incompressible limit are two outstan...
This paper gives an overview over Meshfree Methods. Starting point is an extended and modified class...
The efficiency of the quadrature-free form of the dis- continuous Galerkin method in two dimensions,...
In this thesis, we develop and study efficient solvers for high-order Galerkin methods applied to fl...
Meshless methods have been explored in many 2D problems and they have been shown to be as accurate a...
This is the pre-peer reviewed version of the following article: Arroyo, M.; Ortiz, M. Local maximum-...
We present a method to blend local maximum entropy (LME) meshfree approximants and isogeometric anal...
The element-free Galerkin method (EFG) has specific characteristics that require the usage of techni...
Meshless methods have been explored in many 2D problems and they have been shown to be as accurate a...
In Galerkin meshfree methods, because of a denser and unstructured connectivity, the creation and as...
In this paper, an overview of the construction of meshfree basis functions is presented, with partic...
We present a method for the automatic adaption of the support size of meshfree basis functions in th...
Over the past two decades, meshfree methods have undergone significant development as a numerical to...
In this paper, we devise cell-based maximum-entropy (max-ent) basis functions that are used in a Gal...
In this paper, we devise cell-based maximum-entropy (max-ent) basis functions that are used in a Gal...
Numerical integration errors and volumetric locking in the near-incompressible limit are two outstan...
This paper gives an overview over Meshfree Methods. Starting point is an extended and modified class...
The efficiency of the quadrature-free form of the dis- continuous Galerkin method in two dimensions,...
In this thesis, we develop and study efficient solvers for high-order Galerkin methods applied to fl...
Meshless methods have been explored in many 2D problems and they have been shown to be as accurate a...
This is the pre-peer reviewed version of the following article: Arroyo, M.; Ortiz, M. Local maximum-...
We present a method to blend local maximum entropy (LME) meshfree approximants and isogeometric anal...
The element-free Galerkin method (EFG) has specific characteristics that require the usage of techni...
Meshless methods have been explored in many 2D problems and they have been shown to be as accurate a...