m-step preconditioners for nonhermitian positive definite Toeplitz systems

It is known that if A is a Toeplitz matrix,then A enjoys a circulant and skew circulant splitting(de— noted by CSCS),i.e.,A=C+ S with C a circulant matrix and S a skew circulant matrix. Based on the CSCS iteration,we give m-step preconditioners P for certain classes of Toeplitz matrices in this pape...

Full description

Bibliographic Details
Main Author: Liu, Zhongyun (author)
Other Authors: Yu, Jing (author), Zhang, Yan (author), Zhang, Yulin (author)
Format: article
Language:eng
Published: 2016
Subjects:
Circulant
Skew circulant splitting
m-step polynomial preconditioners
Conjugate gradientmethod
Toeplitz matrix
Ciências Naturais::Matemáticas
Online Access:http://hdl.handle.net/1822/50409
Country:Portugal
Oai:oai:repositorium.sdum.uminho.pt:1822/50409
Description
Summary:It is known that if A is a Toeplitz matrix,then A enjoys a circulant and skew circulant splitting(de— noted by CSCS),i.e.,A=C+ S with C a circulant matrix and S a skew circulant matrix. Based on the CSCS iteration,we give m-step preconditioners P for certain classes of Toeplitz matrices in this paper.We show that if both C and S are positive definite,then the spectrum of the preconditioned matrix(PA)^* PA are clustered around one for some moderate size . Experimental results show that the proposed preconditioners perform slightly better than T.Chan’S preconditioners for some moderate size m.

Similar Items