An interval for the shape parameter in radial basis function approximation
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Publication:1740138
DOI10.1016/j.amc.2017.07.047zbMath1426.65022OpenAlexW2742326333MaRDI QIDQ1740138
Publication date: 29 April 2019
Published in: Applied Mathematics and Computation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.amc.2017.07.047
pseudo-spectral methodradial basis functionshape parameterKansa's methodeigenvalue stabilitymethod of line
Numerical interpolation (65D05) Approximation by other special function classes (41A30) Numerical radial basis function approximation (65D12)
Related Items (13)
Doubly stochastic radial basis function methods ⋮ On solving elliptic boundary value problems using a meshless method with radial polynomials ⋮ Solving PDEs with a Hybrid Radial Basis Function: Power-Generalized Multiquadric Kernel ⋮ A hybrid radial basis functions collocation technique to numerically solve fractional advection–diffusion models ⋮ An efficient localized meshless collocation method for the two-dimensional Burgers-type equation arising in fluid turbulent flows ⋮ Bayesian approach for radial kernel parameter tuning ⋮ Meshless RBFs method for numerical solutions of two-dimensional high order fractional Sobolev equations ⋮ A radial basis function (RBF)-finite difference (FD) method for the backward heat conduction problem ⋮ On the search of the shape parameter in radial basis functions using univariate global optimization methods ⋮ Kansa RBF collocation method with auxiliary boundary centres for high order BVPs ⋮ Coupling of the Crank-Nicolson scheme and localized meshless technique for viscoelastic wave model in fluid flow ⋮ A meshfree numerical technique based on radial basis function pseudospectral method for Fisher's equation ⋮ A bounded randomly variable shape multi-quadric interpolation method in dual reciprocity boundary element method
Uses Software
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