Title of article
The rate of convergence for the cyclic projections algorithm III: Regularity of convex sets Original Research Article
Author/Authors
Frank Deutsch، نويسنده , , Hein Hundal، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2008
Pages
30
From page
155
To page
184
Abstract
The cyclic projections algorithm is an important method for determining a point in the intersection of a finite number of closed convex sets in a Hilbert space. That is, for determining a solution to the “convex feasibility” problem. This is the third paper in a series on a study of the rate of convergence for the cyclic projections algorithm. In the first of these papers, we showed that the rate could be described in terms of the “angles” between the convex sets involved. In the second, we showed that these angles often had a more tractable formulation in terms of the “norm” of the product of the (nonlinear) metric projections onto related convex sets.
In this paper, we show that the rate of convergence of the cyclic projections algorithm is also intimately related to the “linear regularity property” of Bauschke and Borwein, the “normal property” of Jameson (as well as Bakan, Deutsch, and Li’s generalization of Jameson’s normal property), the “strong conical hull intersection property” of Deutsch, Li, and Ward, and the rate of convergence of iterated parallel projections. Such properties have already been shown to be important in various other contexts as well.
Keywords
* Regularity properties of convex sets: regular , boundedly linearly regular , Normal , * Convex feasibility problem , weakly normal , linearly regular , * Projections onto convex sets , uniformly normal , * POCS , * Cyclic projections , * Alternating projections , * Orthogonal projections , * Angle between convex sets , * rate of convergence , * Angle between subspaces , * The strong conical hull intersection property (strong CHIP) , * Norm of nonlinear operators , boundedly regular
Journal title
Journal of Approximation Theory
Serial Year
2008
Journal title
Journal of Approximation Theory
Record number
852612
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