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Distributed optimization over time-varying directed graphs

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arxiv 1303.2289 v2 pith:XTXKNSG3 submitted 2013-03-10 math.OC cs.DCcs.SYeess.SY

Distributed optimization over time-varying directed graphs

classification math.OC cs.DCcs.SYeess.SY
keywords nodessubgradient-pushalgorithmcommunicationsdirecteddistributedeverygraphs
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We consider distributed optimization by a collection of nodes, each having access to its own convex function, whose collective goal is to minimize the sum of the functions. The communications between nodes are described by a time-varying sequence of directed graphs, which is uniformly strongly connected. For such communications, assuming that every node knows its out-degree, we develop a broadcast-based algorithm, termed the subgradient-push, which steers every node to an optimal value under a standard assumption of subgradient boundedness. The subgradient-push requires no knowledge of either the number of agents or the graph sequence to implement. Our analysis shows that the subgradient-push algorithm converges at a rate of $O(\ln(t)/\sqrt{t})$, where the constant depends on the initial values at the nodes, the subgradient norms, and, more interestingly, on both the consensus speed and the imbalances of influence among the nodes.

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