Title :
An efficient frequency-domain algorithm for discrete orthogonal basis restoration
Author :
Moody, Edward B.
Author_Institution :
Div. of Nucl. Med., Kentucky Univ., Lexington, KY, USA
fDate :
4/1/1998 12:00:00 AM
Abstract :
Discrete orthogonal basis restoration (DOBR) is a robust method for the inverse solution of linear systems of the type [A][o]=(i), where [A] may be either shift variant or invariant. Presented in this work is the derivation of a frequency-domain DOBR algorithm that significantly improves computational efficiency. Substantial reductions in the number of arithmetic operations are possible when system stationarity allows the use of precalculated DOBR characteristic vector sets, and sampling of the signal is rapid relative to the highest frequency of interest. More modest improvements in computational efficiency (10%-40%) are obtained when the entire DOBR algorithm must be executed. In addition to reducing the number of floating-point operations and storage requirements, the frequency-domain DOBR algorithm lessens the deleterious effects of perturbations in [A] on the inverse solution
Keywords :
deconvolution; frequency-domain analysis; inverse problems; linear systems; numerical stability; signal restoration; signal sampling; time-varying systems; arithmetic operations reduction; characteristic vector sets; computational efficiency; discrete orthogonal basis restoration; floating-point operations; frequency-domain algorithm; inverse solution; linear systems; robust method; signal sampling; storage requirements reduction; Computational efficiency; Discrete Fourier transforms; Frequency; Linear systems; Robustness; Signal processing algorithms; Signal restoration; Time domain analysis; Transfer functions; Vectors;
Journal_Title :
Circuits and Systems II: Analog and Digital Signal Processing, IEEE Transactions on
