High-dimensional structure estimation in Ising models: Local separation criterion
Abstract
We consider the problem of high-dimensional Ising (graphical) model selection. We propose a simple algorithm for structure estimation based on the thresholding of the empirical conditional variation distances. We introduce a novel criterion for tractable graph families, where this method is efficient, based on the presence of sparse local separators between node pairs in the underlying graph. For such graphs, the proposed algorithm has a sample complexity of n=Ω(J^(−2)_(min)log p), where p is the number of variables, and J_(min) is the minimum (absolute) edge potential in the model. We also establish nonasymptotic necessary and sufficient conditions for structure estimation.
Additional Information
© 2012 Institute of Mathematical Statistics. Supported by the setup funds at UCI and the AFOSR Award FA9550-10-1-0310. Supported in part by A*STAR, Singapore. Supported in part by AFOSR under Grant FA9550-08-1-1080. The authors thank Sujay Sanghavi (U.T. Austin), Elchanan Mossel (UC Berkeley), Martin Wainwright (UC Berkeley), Sebastien Roch (UCLA), Rui Wu (UIUC) and Divyanshu Vats (U. Minn.) for extensive comments, and Béla Bollobás (Cambridge) for discussions on random graphs. The authors thank the anonymous reviewers and the co-editor Peter Bühlmann (ETH) for valuable comments that significantly improved this manuscript.Attached Files
Published - euclid.aos.1344610586.pdf
Accepted Version - 1107.1736.pdf
Supplemental Material - euclid.aos.1344610586_si.pdf
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Additional details
- Eprint ID
- 81876
- Resolver ID
- CaltechAUTHORS:20170927-101515951
- Air Force Office of Scientific Research (AFOSR)
- FA9550-10-1-0310
- Agency for Science, Technology and Research (A*STAR)
- Air Force Office of Scientific Research (AFOSR)
- FA9550-08-1-1080
- University of California, Irvine
- Created
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2017-09-27Created from EPrint's datestamp field
- Updated
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2023-06-02Created from EPrint's last_modified field