Alternating Projections on Manifolds

Adrian S. Lewis
Adrian S. Lewis
[email protected]
School of Operations Research and Industrial Engineering, Cornell University, Ithaca, New York 14853
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,
Jérôme Malick
Jérôme Malick
[email protected]
INRIA Rhone-Alpes, Montbonnot, 38334 St. Ismier Cedex, France
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Adrian S. Lewis

[email protected]

School of Operations Research and Industrial Engineering, Cornell University, Ithaca, New York 14853

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Jérôme Malick

[email protected]

INRIA Rhone-Alpes, Montbonnot, 38334 St. Ismier Cedex, France

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Published Online:1 Feb 2008https://doi.org/10.1287/moor.1070.0291

Abstract

We prove that if two smooth manifolds intersect transversally, then the method of alternating projections converges locally at a linear rate. We bound the speed of convergence in terms of the angle between the manifolds, which in turn we relate to the modulus of metric regularity for the intersection problem, a natural measure of conditioning. We discuss a variety of problem classes where the projections are computationally tractable, and we illustrate the method numerically on a problem of finding a low-rank solution of a matrix equation.

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cover image Mathematics of Operations Research

Volume 33, Issue 1

February 2008

Pages 1-256

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Received:July 27, 2006
Published Online:February 01, 2008

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Adrian S. Lewis, Jérôme Malick, (2008) Alternating Projections on Manifolds. Mathematics of Operations Research 33(1):216-234.

https://doi.org/10.1287/moor.1070.0291

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