Highly Localized RBF Lagrange Functions for Finite Difference Methods on Spheres

02/16/2023

∙

The aim of this paper is to show how rapidly decaying RBF Lagrange functions on the spheres can be used to create effective, stable finite difference methods based on radial basis functions (RBF-FD). For certain classes of PDEs this approach leads to precise convergence estimates for stencils which grow moderately with increasing discretization fineness.

READ FULL TEXT

Highly Localized RBF Lagrange Functions for Finite Difference Methods on Spheres

Stability estimates for radial basis function methods applied to time-dependent hyperbolic PDEs

A least squares radial basis function finite difference method with improved stability properties

Computational Electromagnetics with the RBF-FD Method

RBF-LOI: Augmenting Radial Basis Functions (RBFs) with Least Orthogonal Interpolation (LOI) for Solving PDEs on Surfaces

The Direct RBF Partition of Unity (D-RBF-PU) Method for Solving PDEs

Semilinear fractional elliptic PDEs with gradient nonlinearities on open balls: existence of solutions and probabilistic representation

Highly Localized RBF Lagrange Functions for Finite Difference Methods on Spheres

Related Research

Stability estimates for radial basis function methods applied to time-dependent hyperbolic PDEs

A least squares radial basis function finite difference method with improved stability properties

Computational Electromagnetics with the RBF-FD Method

RBF-LOI: Augmenting Radial Basis Functions (RBFs) with Least Orthogonal Interpolation (LOI) for Solving PDEs on Surfaces

The Direct RBF Partition of Unity (D-RBF-PU) Method for Solving PDEs

Semilinear fractional elliptic PDEs with gradient nonlinearities on open balls: existence of solutions and probabilistic representation