Title :
Optimal parameter updating for optical diffusion imaging
Author :
Ye, J.C. ; Webb, E.J. ; Millane, R.P. ; Downar, T.J.
Author_Institution :
Electr. & Comput. Eng., Purdue Univ., West Lafayette, IN, USA
Abstract :
Because optical diffusion imaging is a highly nonlinear inverse problem, iterative inversion algorithms based on the Born approximation have usually been employed as reconstruction technique, but convergence is slow, especially for high contrast parameter distributions. We show here that the slow convergence of the conventional algorithms is due to the linear integral operator derived by the Born approximation not being the optimal Frechet derivative. We derive the optimal Frechet derivative operator with respect to the spatially varying absorption and scattering coefficients in integral form, and then develop a new iterative inversion algorithm
Keywords :
absorption coefficients; convergence of numerical methods; image reconstruction; inverse problems; iterative methods; mathematical operators; medical image processing; Born approximation; absorption coefficients; convergence; high contrast parameter distributions; highly nonlinear inverse problem; iterative inversion algorithm; iterative inversion algorithms; linear integral operator; optical diffusion imaging; optimal Frechet derivative; optimal parameter updating; reconstruction technique; scattering coefficients; Absorption; Approximation algorithms; Approximation methods; Convergence; Image reconstruction; Inverse problems; Iterative algorithms; Nonlinear optics; Optical imaging; Optical scattering;
Conference_Titel :
Image Processing, 1998. ICIP 98. Proceedings. 1998 International Conference on
Conference_Location :
Chicago, IL
Print_ISBN :
0-8186-8821-1
DOI :
10.1109/ICIP.1998.999028
