Title :
Stable Convergence Behavior Under Summable Perturbations of a Class of Projection Methods for Convex Feasibility and Optimization Problems
Author :
Butnariu, Dan ; Davidi, Ran ; Herman, Gabor T. ; Kazantsev, Ivan G.
Author_Institution :
Univ. of Haifa, Haifa
Abstract :
We study the convergence behavior of a class of projection methods for solving convex feasibility and optimization problems. We prove that the algorithms in this class converge to solutions of the consistent convex feasibility problem, and that their convergence is stable under summable perturbations. Our class is a subset of the class of string-averaging projection methods, large enough to contain, among many other procedures, a version of the Cimmino algorithm, as well as the cyclic projection method. A variant of our approach is proposed to approximate the minimum of a convex functional subject to convex constraints. This variant is illustrated on a problem in image processing: namely, for optimization in tomography.
Keywords :
approximation theory; convergence of numerical methods; minimisation; set theory; signal processing; Cimmino algorithm; approximation theory; convex feasibility problem; cyclic projection method; image processing; optimization problem; set theory; stable convergence behavior; string-averaging projection method; summable perturbation; tomography; Constraint optimization; Convergence; Helium; Image processing; Mathematics; Optimization methods; Radio access networks; Signal processing algorithms; Tomography; Vectors; Cimmino algorithm; convex feasibility; cyclic projection method; projection method; string-averaging; tomographic optimization; total variation;
Journal_Title :
Selected Topics in Signal Processing, IEEE Journal of
DOI :
10.1109/JSTSP.2007.910263
