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Infeasibility detection in the alternating direction method of multipliers for convex optimization

Abstract:

The alternating direction method of multipliers is a powerful operator splitting technique for solving structured optimization problems. For convex optimization problems, it is well known that the algorithm generates iterates that converge to a solution, provided that it exists. If a solution does not exist, then the iterates diverge. Nevertheless, we show that they yield conclusive information regarding problem infeasibility for optimization problems with linear or quadratic objective functions and conic constraints, which includes quadratic, second-order cone, and semidefinite programs. In particular, we show that in the limit the iterates either satisfy a set of first-order optimality conditions or produce a certificate of either primal or dual infeasibility. Based on these results, we propose termination criteria for detecting primal and dual infeasibility.

Publication status:
Published
Peer review status:
Peer reviewed

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Publisher copy:
10.1007/s10957-019-01575-y

Authors

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Institution:
University of Oxford
Division:
MPLS
Department:
Engineering Science
Oxford college:
St Edmund Hall
Role:
Author
ORCID:
0000-0002-0456-4124


Publisher:
Springer
Journal:
Journal of Optimization Theory and Applications More from this journal
Volume:
183
Issue:
2
Pages:
490-519
Publication date:
2019-08-13
Acceptance date:
2019-07-27
DOI:
EISSN:
1573-2878
ISSN:
0022-3239


Language:
english
Keywords:
Pubs id:
pubs:1038820
UUID:
uuid:dc140c81-1993-429a-aa70-f72c71fa0ae9
Local pid:
pubs:1038820
Source identifiers:
1038820
Deposit date:
2019-08-06
ARK identifier:

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