Title :
Trigonometric Polynomial Approximations for BTTB Systems
Author :
Wang Chi-xi ; Yu Ben-cheng ; Yang Yong ; Yin Zhi-Hao
Author_Institution :
Xuzhou Coll. of Ind. Technol., Xuzhou, China
Abstract :
We discuss the numerical solution of block systems Tm,n x = b by preconditioned conjugate gradient methods where Tm,n are m × m block Toeplitz matrices with n × n Toeplitz blocks (BTTB). These systems occur in a variety of applications, such as two-dimensional image processing and the discretization of two-dimensional partial differential equations. In this paper, we propose the BTTB matrix T-1 as a preconditioner for the above system. We prove that the resulting preconditioned matrix T-1 will have clustered spectrum. Numerical results show that our preconditioners are more efficient than circulant preconditioners.
Keywords :
Toeplitz matrices; conjugate gradient methods; numerical analysis; polynomial approximation; BTTB matrix; BTTB systems; block Toeplitz matrices; block systems; clustered spectrum; numerical solution; preconditioned conjugate gradient methods; preconditioned matrix; preconditioners; trigonometric polynomial approximations; two-dimensional partial differential equations; Approximation methods; Discrete cosine transforms; Educational institutions; Eigenvalues and eigenfunctions; Polynomials; Symmetric matrices; BTTB system; circulant matrix; convergence rate; preconditioned conjugate gradient;
Conference_Titel :
Computational and Information Sciences (ICCIS), 2013 Fifth International Conference on
Conference_Location :
Shiyang
DOI :
10.1109/ICCIS.2013.237
