Sparse and low-rank matrix decompositions
Abstract
We consider the following fundamental problem: given a matrix that is the sum of an unknown sparse matrix and an unknown low-rank matrix, is it possible to exactly recover the two components? Such a capability enables a considerable number of applications, but the goal is both ill-posed and NP-hard in general. In this paper we develop (a) a new uncertainty principle for matrices, and (b) a simple method for exact decomposition based on convex optimization. Our uncertainty principle is a quantification of the notion that a matrix cannot be sparse while having diffuse row/column spaces. It characterizes when the decomposition problem is ill-posed, and forms the basis for our decomposition method and its analysis. We provide deterministic conditions - on the sparse and low-rank components - under which our method guarantees exact recovery.
Additional Information
© 2009 IEEE. Date of Current Version: 22 January 2010. This work was supported by MURI AFOSR grant FA9550-06-1-0324, MURI AFOSR grant FA9550-06-1-0303, and NSF FRG 0757207.Attached Files
Published - 05394889.pdf
Submitted - cspw_slr_sysid09.pdf
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Additional details
- Eprint ID
- 34735
- Resolver ID
- CaltechAUTHORS:20121008-082643123
- Air Force Office of Scientific Research (AFOSR) Multidisciplinary University Research Initiative (MURI)
- FA9550-06-1-0324
- Air Force Office of Scientific Research (AFOSR) Multidisciplinary University Research Initiative (MURI)
- FA9550-06-1-0303
- NSF
- FRG 0757207
- Created
-
2012-10-08Created from EPrint's datestamp field
- Updated
-
2021-11-09Created from EPrint's last_modified field
- Other Numbering System Name
- INSPEC Accession Number
- Other Numbering System Identifier
- 11135166