We consider adaptive meshless discretisation of the Dirichlet problem for Poisson equation based on numerical differentiation stencils obtained with the help of radial basis functions. New meshless stencil selection and adaptive refinement algorithms are proposed in 2D. Numerical experiments show that the accuracy of the solution is comparable with, and often better than that achieved by the mesh-based adaptive finite element method
The authors present a numerical method for solving Poisson`s equation, with variable coefficients an...
In this paper we present the adaptive variational multiscale method for solving the Poisson equation...
In this article, we apply the theory of meshfree methods to the problem of PDE constrained optimizat...
We consider adaptive meshless discretisation of the Dirichlet problem for Pois-son equation based on...
We investigate the influence of the shape parameter in the meshless Gaussian RBF finite difference m...
This paper presents the combination of new mesh-free radial basis function network (RBFN) methods an...
There are many types of adaptive methods that have been developed with different algorithm schemes a...
Meshless methods are nowadays emerging, alternative or subsidiary techniques to classical Finite Ele...
AbstractWe investigate the influence of the shape parameter in the meshless Gaussian radial basis fu...
Based on the radial basis functions (RBF) and T-Trefftz solution, this paper presents a new meshless...
In order to solve the linear partial differential equation Au = f, we combine two methods:...
International audienceWe propose in this work new algorithms associating asymptotic numerical method...
3siThe present paper develops two new techniques, namely additive correction multicloud (ACMC) and s...
The subject of this thesis is the meshfree numerical solution of PDEs on a general domain, using a ...
WOS: 000394613300009In this paper we propose a numerical scheme for the solution of fractional order...
The authors present a numerical method for solving Poisson`s equation, with variable coefficients an...
In this paper we present the adaptive variational multiscale method for solving the Poisson equation...
In this article, we apply the theory of meshfree methods to the problem of PDE constrained optimizat...
We consider adaptive meshless discretisation of the Dirichlet problem for Pois-son equation based on...
We investigate the influence of the shape parameter in the meshless Gaussian RBF finite difference m...
This paper presents the combination of new mesh-free radial basis function network (RBFN) methods an...
There are many types of adaptive methods that have been developed with different algorithm schemes a...
Meshless methods are nowadays emerging, alternative or subsidiary techniques to classical Finite Ele...
AbstractWe investigate the influence of the shape parameter in the meshless Gaussian radial basis fu...
Based on the radial basis functions (RBF) and T-Trefftz solution, this paper presents a new meshless...
In order to solve the linear partial differential equation Au = f, we combine two methods:...
International audienceWe propose in this work new algorithms associating asymptotic numerical method...
3siThe present paper develops two new techniques, namely additive correction multicloud (ACMC) and s...
The subject of this thesis is the meshfree numerical solution of PDEs on a general domain, using a ...
WOS: 000394613300009In this paper we propose a numerical scheme for the solution of fractional order...
The authors present a numerical method for solving Poisson`s equation, with variable coefficients an...
In this paper we present the adaptive variational multiscale method for solving the Poisson equation...
In this article, we apply the theory of meshfree methods to the problem of PDE constrained optimizat...