Optimal data scaling for principal component
pursuit: a Lyapunov approach to convergence
Optimal data scaling for principal component
pursuit: a Lyapunov approach to convergence
In principle component pursuit (PCP), the essential idea is to replace the original non-convex optimization problem of the matrix rank and the count of non-zero entries by a convex optimization problem of the nuclear and I1 norms. In the PCP literature, it is rigorously proved that the validity of this idea depends on the coherence of the uncontaminated data. Specifically, the lower the coherence is, the equivalence of the convex optimization problem to the original non-convex one will hold by a larger probability. Although the coherence index is fixed for a given data set, it is possible to adjust this index by introducing different scalings to the data. The target of this work is thus to find the optimal scaling of the data such that the coherence index is minimized. Based on the analysis of the PCP problem structure, a non-convex optimization problem with implicit dependence on the scaling parameters is firstly formulated. To solve this problem, a coordinate descent algorithm is proposed. Under mild conditions on the structure of the data matrix, the convergence of the algorithm to a global optimal point is rigorously proved by treating the algorithm as a discrete-time dynamic system and utilizing a Lyapunov-type approach. Monte Carlo simulation experiments are performed to verify the effectiveness of the developed results.
data scaling algorithm, lyapunov approach, principle component pursuit (PCP)
2057-2071
Cheng, Yue
017d79d1-2246-4d55-84dc-feee1806667b
Shi, Dawei
db3deebf-fa7f-4591-9b0d-703d79f04bf5
Chen, Tongwen
256ed6e5-3f19-4d26-b6c9-586fb1d3ae8e
Shu, Zhan
ea5dc18c-d375-4db0-bbcc-dd0229f3a1cb
August 2015
Cheng, Yue
017d79d1-2246-4d55-84dc-feee1806667b
Shi, Dawei
db3deebf-fa7f-4591-9b0d-703d79f04bf5
Chen, Tongwen
256ed6e5-3f19-4d26-b6c9-586fb1d3ae8e
Shu, Zhan
ea5dc18c-d375-4db0-bbcc-dd0229f3a1cb
Cheng, Yue, Shi, Dawei, Chen, Tongwen and Shu, Zhan
(2015)
Optimal data scaling for principal component
pursuit: a Lyapunov approach to convergence.
IEEE Transactions on Automatic Control, 60 (8), .
(doi:10.1109/TAC.2015.2398886).
Abstract
In principle component pursuit (PCP), the essential idea is to replace the original non-convex optimization problem of the matrix rank and the count of non-zero entries by a convex optimization problem of the nuclear and I1 norms. In the PCP literature, it is rigorously proved that the validity of this idea depends on the coherence of the uncontaminated data. Specifically, the lower the coherence is, the equivalence of the convex optimization problem to the original non-convex one will hold by a larger probability. Although the coherence index is fixed for a given data set, it is possible to adjust this index by introducing different scalings to the data. The target of this work is thus to find the optimal scaling of the data such that the coherence index is minimized. Based on the analysis of the PCP problem structure, a non-convex optimization problem with implicit dependence on the scaling parameters is firstly formulated. To solve this problem, a coordinate descent algorithm is proposed. Under mild conditions on the structure of the data matrix, the convergence of the algorithm to a global optimal point is rigorously proved by treating the algorithm as a discrete-time dynamic system and utilizing a Lyapunov-type approach. Monte Carlo simulation experiments are performed to verify the effectiveness of the developed results.
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e-pub ahead of print date: 2 February 2015
Published date: August 2015
Keywords:
data scaling algorithm, lyapunov approach, principle component pursuit (PCP)
Organisations:
Mechatronics
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Local EPrints ID: 381655
URI: http://eprints.soton.ac.uk/id/eprint/381655
ISSN: 0018-9286
PURE UUID: 0fed72ec-a9c8-4274-8fce-5443443367e1
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Date deposited: 07 Oct 2015 10:42
Last modified: 14 Mar 2024 21:18
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Author:
Yue Cheng
Author:
Dawei Shi
Author:
Tongwen Chen
Author:
Zhan Shu
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