Title :
Stochastic deconvolution over groups for inverse problems in imaging
Author_Institution :
Electr. & Comput. Eng. Dept., Drexel Univ., Philadelphia, PA, USA
Abstract :
In this paper, we present a stochastic deconvolution method for a class of inverse problems that arc naturally formulated as group convolutions. Examples of such problems include Radon transform inversion for tomography, radar and sonar imaging, as well as channel estimation in communications. Key components of our approach are group representation theory and the concept of group stationarity. We formulate a minimum mean square solution to the deconvolution problem in the presence of nonstationary measurement noise. Our approach incorporates a priori information about the noise and the unknown signal into the inversion problem, which leads to a natural regularized solution.
Keywords :
Radon transforms; channel estimation; deconvolution; group theory; inverse problems; least mean squares methods; radar imaging; sonar imaging; stochastic processes; Radon transform inversion; a priori information; channel estimation; group representation theory; group stationarity; inverse problems; minimum mean square solution; nonstationary measurement noise; radar imaging; regularized solution; sonar imaging; stochastic deconvolution; tomography; Deconvolution; Equations; Image reconstruction; Inverse problems; Radar imaging; Radar signal processing; Robots; Sonar; Stochastic processes; Wideband;
Conference_Titel :
Acoustics, Speech, and Signal Processing, 2003. Proceedings. (ICASSP '03). 2003 IEEE International Conference on
Print_ISBN :
0-7803-7663-3
DOI :
10.1109/ICASSP.2003.1201747
