On distributed optimization under inequality constraints via Lagrangian primal-dual methods

We consider a multi-agent convex optimization problem where agents are to minimize a sum of local objective functions subject to a global inequality constraint and a global constraint set. To deal with this, we devise a distributed primal-dual subgradient algorithm which is based on the characteriza...

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Bibliographic Details
Published in	Proceedings of the 2010 American Control Conference pp. 4863 - 4868
Main Authors	Minghui Zhu, Martínez, Sonia
Format	Conference Proceeding
Language	English
Published	IEEE 01.06.2010
Subjects	Algorithm design and analysis Communication system control Constraint optimization Distributed algorithms Distributed computing Lagrangian functions Multiagent systems Network topology Optimization methods Utility programs
Online Access	Get full text
ISBN	9781424474264 1424474264
ISSN	0743-1619
DOI	10.1109/ACC.2010.5530903

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Summary:	We consider a multi-agent convex optimization problem where agents are to minimize a sum of local objective functions subject to a global inequality constraint and a global constraint set. To deal with this, we devise a distributed primal-dual subgradient algorithm which is based on the characterization of the primal-dual optimal solutions as the saddle points of the Lagrangian function. This algorithm allows the agents to exchange information over networks with time-varying topologies and asymptotically agree on a pair of primal-dual optimal solutions and the optimal value.
ISBN:	9781424474264 1424474264
ISSN:	0743-1619
DOI:	10.1109/ACC.2010.5530903