1. Hierarchical constrained consensus algorithm over multi-cluster networks.
- Author
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Shi, Chong-Xiao and Yang, Guang-Hong
- Subjects
- *
HIERARCHICAL clustering (Cluster analysis) , *CONSENSUS (Social sciences) , *CONSTRAINED optimization , *STOCHASTIC convergence , *ALGORITHMS - Abstract
This paper considers the constrained consensus problem over multi-cluster networks. It is assumed that the agents’ states are constrained by different sets, where each constraint set is privately known by the corresponding agent. Within this framework, a hierarchical projection-based consensus algorithm is presented to solve the considered problem. Technically, the consensus analysis of the proposed algorithm consists of the following three aspects: First, by using the property of the projection operator, the limiting behaviors of the agents’ states generated by the algorithm are investigated. Then, based on the limiting behaviors, it is proven that the agents’ states in the whole network achieve a constrained consensus. Furthermore, by introducing an important auxiliary variable that relates to the agents’ states, the linear convergence of the proposed algorithm is proved. Compared with the existing results, this paper generalizes the constrained consensus methods under single-cluster networks to the multi-cluster ones. Finally, simulations are given to verify the theoretical results. [ABSTRACT FROM AUTHOR]
- Published
- 2018
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