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Proceedings Paper

Regularized method for the inverse problem of diffusion tomography
Author(s): Gennady N. Erokhin; Michael V. Klibanov; Leonid N. Pestov; Nikolay L. Podkolodny
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Paper Abstract

The statement and some questions of the solution to the inverse problem of diffusion tomography are considered. Some numerical results of the solution and the regularization technique are briefly discussed. The main characteristics of this approach is taking account of the circular symmetry in the statement. The algorithm proposed for the solution of this problem in such symmetric statement showed high performance and sufficient accuracy.

Paper Details

Date Published: 9 October 1995
PDF: 7 pages
Proc. SPIE 2570, Experimental and Numerical Methods for Solving Ill-Posed Inverse Problems: Medical and Nonmedical Applications, (9 October 1995); doi: 10.1117/12.224159
Show Author Affiliations
Gennady N. Erokhin, Computing Ctr./Siberian Branch (Russia)
Michael V. Klibanov, Univ. of North Carolina/Charlotte (United States)
Leonid N. Pestov, Computing Ctr./Siberian Branch (Russia)
Nikolay L. Podkolodny, Computing Ctr./Siberian Branch (Russia)


Published in SPIE Proceedings Vol. 2570:
Experimental and Numerical Methods for Solving Ill-Posed Inverse Problems: Medical and Nonmedical Applications
Randall Locke Barbour; Mark J. Carvlin; Michael A. Fiddy, Editor(s)

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