Paper Title:
A Fast Algorithm for the Inverse of a Tridiagonal Period Matrices in Signal Processing
  Abstract

The theory and method of matrix computation, as an important tool, have much important applications such as in computational mathematics, physics, image processing and recognition, missile system design, rotor bearing system, nonlinear kinetics, economics and biology etc. In this paper, Motivated by the references, especially [2], we give the estimates for the lower bounds on the inverse elements of strictly diagonally dominant tridiagonal period matrices.

  Info
Periodical
Edited by
Dehuai Zeng
Pages
469-476
DOI
10.4028/www.scientific.net/AMR.159.469
Citation
X. L. Fu, "A Fast Algorithm for the Inverse of a Tridiagonal Period Matrices in Signal Processing", Advanced Materials Research, Vol. 159, pp. 469-476, 2011
Online since
December 2010
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