Fixed-Rank Approximation of a Positive-Semidefinite Matrix from Streaming Data
Abstract
Several important applications, such as streaming PCA and semidefinite programming, involve a large-scale positive-semidefinite (psd) matrix that is presented as a sequence of linear updates. Because of storage limitations, it may only be possible to retain a sketch of the psd matrix. This paper develops a new algorithm for fixed-rank psd approximation from a sketch. The approach combines the Nyström approximation with a novel mechanism for rank truncation. Theoretical analysis establishes that the proposed method can achieve any prescribed relative error in the Schatten 1-norm and that it exploits the spectral decay of the input matrix. Computer experiments show that the proposed method dominates alternative techniques for fixed-rank psd matrix approximation across a wide range of examples.
Attached Files
Submitted - ACM_TR_2017_03.pdf
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Additional details
- Eprint ID
- 78360
- Resolver ID
- CaltechAUTHORS:20170620-081901312
- Created
-
2017-06-21Created from EPrint's datestamp field
- Updated
-
2020-03-09Created from EPrint's last_modified field
- Caltech groups
- Applied & Computational Mathematics
- Series Name
- ACM Technical Reports
- Series Volume or Issue Number
- 2017-03