Distributed Optimization Over Time-Varying Directed Graphs
University of Illinois Urbana-Champaign
Abstract
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…
Citation impact
- FWCI
- 71.60
- Percentile
- 100%
- References
- 33
Authors
2Topics & keywords
- Subgradient method
- Node (physics)
- Convex function
- Sequence (biology)
- Convergence (economics)
- Mathematical optimization
- Mathematics
- Convex optimization