TY - JOUR
T1 - Localized radial basis functions-based pseudo-spectral method (LRBF-PSM) for nonlocal diffusion problems
AU - Zhao, Wei
AU - Hon, Yiu-chung
AU - Stoll, Martin
PY - 2018/3/1
Y1 - 2018/3/1
N2 - Spectral/pseudo-spectral methods based on high order polynomials have been successfully used for solving partial differential and integral equations. In this paper, we will present the use of a localized radial basis functions-based pseudo-spectral method (LRBF-PSM) for solving 2D nonlocal problems with radial nonlocal kernels. The basic idea of the LRBF-PSM is to construct a set of orthogonal functions by RBFs on each overlapping sub-domain from which the global solution can be obtained by extending the approximation on each sub-domain to the entire domain. Numerical implementation indicates that the proposed LRBF-PSM is simple to use, efficient and robust to solve various nonlocal problems.
AB - Spectral/pseudo-spectral methods based on high order polynomials have been successfully used for solving partial differential and integral equations. In this paper, we will present the use of a localized radial basis functions-based pseudo-spectral method (LRBF-PSM) for solving 2D nonlocal problems with radial nonlocal kernels. The basic idea of the LRBF-PSM is to construct a set of orthogonal functions by RBFs on each overlapping sub-domain from which the global solution can be obtained by extending the approximation on each sub-domain to the entire domain. Numerical implementation indicates that the proposed LRBF-PSM is simple to use, efficient and robust to solve various nonlocal problems.
KW - Cardinal function
KW - Discontinuity
KW - Nonlocal diffusion equations
KW - Radial basis functions
KW - Spectral/pseudo-spectral methods
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U2 - 10.1016/j.camwa.2017.11.030
DO - 10.1016/j.camwa.2017.11.030
M3 - RGC 21 - Publication in refereed journal
SN - 0898-1221
VL - 75
SP - 1685
EP - 1704
JO - Computers and Mathematics with Applications
JF - Computers and Mathematics with Applications
IS - 5
ER -