Title of article
Eigenvalue stability of radial basis function discretizations for time-dependent problems
Author/Authors
R.B. Platte، نويسنده , , T.A. Driscoll، نويسنده ,
Issue Information
دوهفته نامه با شماره پیاپی سال 2006
Pages
18
From page
1251
To page
1268
Abstract
Differentiation matrices obtained with infinitely smooth radial basis function (RBF) collocation methods have, under many conditions, eigenvalues with positive real part, preventing the use of such methods for time-dependent problems. We explore this difficulty at theoretical and practical levels. Theoretically, we prove that differentiation matrices for conditionally positive definite RBFs are stable for periodic domains. We also show that for Gaussian RBFs, special node distributions can achieve stability in 1-D and tensor-product nonperiodic domains. As a more practical approach for bounded domains, we consider differentiation matrices based on least-squares RBF approximations and show that such schemes can lead to stable methods on less regular nodes. By separating centers and nodes, least-squares techniques open the possibility of the separation of accuracy and stability characteristics.
Keywords
Radial basis functions , RBF , Method of lines , Numerical stability , Least squares
Journal title
Computers and Mathematics with Applications
Serial Year
2006
Journal title
Computers and Mathematics with Applications
Record number
919780
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