TY - JOUR
T1 - Block preconditioners for linear systems arising from multiscale collocation with compactly supported RBFs
AU - Farrell, Patricio
AU - Pestana, Jennifer
N1 - KAUST Repository Item: Exported on 2020-10-01
Acknowledged KAUST grant number(s): KUK- C1-013-04
Acknowledgements: We thank the referees for their helpful comments that improved the paper. This work was supported in part by award KUK- C1-013-04, made by King Abdullah University of Science and Technology (KAUST).
This publication acknowledges KAUST support, but has no KAUST affiliated authors.
PY - 2015/4/30
Y1 - 2015/4/30
N2 - © 2015John Wiley & Sons, Ltd. Symmetric collocation methods with RBFs allow approximation of the solution of a partial differential equation, even if the right-hand side is only known at scattered data points, without needing to generate a grid. However, the benefit of a guaranteed symmetric positive definite block system comes at a high computational cost. This cost can be alleviated somewhat by considering compactly supported RBFs and a multiscale technique. But the condition number and sparsity will still deteriorate with the number of data points. Therefore, we study certain block diagonal and triangular preconditioners. We investigate ideal preconditioners and determine the spectra of the preconditioned matrices before proposing more practical preconditioners based on a restricted additive Schwarz method with coarse grid correction. Numerical results verify the effectiveness of the preconditioners.
AB - © 2015John Wiley & Sons, Ltd. Symmetric collocation methods with RBFs allow approximation of the solution of a partial differential equation, even if the right-hand side is only known at scattered data points, without needing to generate a grid. However, the benefit of a guaranteed symmetric positive definite block system comes at a high computational cost. This cost can be alleviated somewhat by considering compactly supported RBFs and a multiscale technique. But the condition number and sparsity will still deteriorate with the number of data points. Therefore, we study certain block diagonal and triangular preconditioners. We investigate ideal preconditioners and determine the spectra of the preconditioned matrices before proposing more practical preconditioners based on a restricted additive Schwarz method with coarse grid correction. Numerical results verify the effectiveness of the preconditioners.
UR - http://hdl.handle.net/10754/597686
UR - http://doi.wiley.com/10.1002/nla.1984
UR - http://www.scopus.com/inward/record.url?scp=84935750870&partnerID=8YFLogxK
U2 - 10.1002/nla.1984
DO - 10.1002/nla.1984
M3 - Article
SN - 1070-5325
VL - 22
SP - 731
EP - 747
JO - Numerical Linear Algebra with Applications
JF - Numerical Linear Algebra with Applications
IS - 4
ER -