Maximum entropy and feasibility methods for convex and nonconvex inverse problems

Title: Maximum entropy and feasibility methods for convex and nonconvex inverse problems
Creator: Borwein, Jonathan M.
Relation: Optimization Vol. 61, Issue 1, p. 1-33
Publisher Link: http://dx.doi.org/10.1080/02331934.2011.632502
Publisher: Taylor & Francis
Resource Type: journal article
Date: 2012
Description: We discuss informally two approaches to solving convex and nonconvex feasibility problems – via entropy optimization and via algebraic iterative methods. We shall highlight the advantages and disadvantages of each and give various related applications and limiting examples. While some of the results are very classical, they are not as well-known to practitioners as they should be. A key role is played by the Fenchel conjugate.
Subject: entropy optimization; Fenchel duality theorem; inverse problems; feasibility problems; alternating projection and reflection methods
Identifier: http://hdl.handle.net/1959.13/940081
Identifier: uon:12942
Identifier: ISSN:0233-1934
Rights: This is an electronic version of an article published in Optimization Vol. 61, Issue 1, p. 1-33. Optimization is available online at: http://www.tandfonline.com/openurl?genre=article&issn=0233-1934&volume=61&issue=1&spage=1
Language: eng
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