Highly localized RBF Lagrange functions for finite difference methods on spheres
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Publication:6579311
DOI10.1007/S10543-024-01016-XzbMATH Open1544.65036MaRDI QIDQ6579311
Wolfgang Erb, Thomas Hangelbroek, Christian Rieger, F. J. Narcowich, J. D. Ward
Publication date: 25 July 2024
Published in: BIT (Search for Journal in Brave)
Finite difference methods for boundary value problems involving PDEs (65N06) Numerical radial basis function approximation (65D12)
Cites Work
- Title not available (Why is that?)
- Multiscale RBF collocation for solving PDEs on spheres
- Polyharmonic approximation on the sphere
- Decomposition of Besov and Triebel-Lizorkin spaces on the sphere
- Nonlinear approximation using Gaussian kernels
- Fourier analysis of the approximation power of principal shift-invariant spaces
- Error bounds for solving pseudodifferential equations on spheres by collocation with zonal kernels
- Multistep scattered data interpolation using compactly supported radial basis functions
- Multilevel interpolation and approximation
- \(L_{p}\)-error estimates for radial basis function interpolation on the sphere
- Polyharmonic and related kernels on manifolds: interpolation and approximation
- Hyperviscosity-based stabilization for radial basis function-finite difference (RBF-FD) discretizations of advection-diffusion equations
- Zooming from global to local: a multiscale RBF approach
- Efficient reconstruction of functions on the sphere from scattered data
- Direct and inverse Sobolev error estimates for scattered data interpolation via spherical basis functions
- A novel Galerkin method for solving PDEs on the sphere using highly localized kernel bases
- Localized bases for kernel spaces on the unit sphere
- Localized Tight Frames on Spheres
- A Primer on Radial Basis Functions with Applications to the Geosciences
- $L^p$ Bernstein estimates and approximation by spherical basis functions
- Improved error bounds for scattered data interpolation by radial basis functions
- Direct and Inverse Results on Bounded Domains for Meshless Methods via Localized Bases on Manifolds
- An inverse theorem for compact Lipschitz regions in ℝ^{𝕕} using localized kernel bases
- Sobolev bounds on functions with scattered zeros, with applications to radial basis function surface fitting
- Scattered Data Interpolation on Spheres: Error Estimates and Locally Supported Basis Functions
- A Least Squares Radial Basis Function Finite Difference Method with Improved Stability Properties
- Solving PDEs with radial basis functions
- Error bounds for a least squares meshless finite difference method on closed manifolds
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