G Method and Finite-Time Consensus

Abstract

We give an extension of the G method, with results, the extension and results being partly suggested by the finite Markov chains and specially by the finite-time consensus problem for the DeGroot model and that for the DeGroot model on distributed systems. For the (homogeneous and nonhomogeneous) DeGroot model, using the G method, a result for reaching a partial or total consensus in a finite time is given. Further, we consider a special submodel/case of the DeGroot model, with examples and comments -- a subset/subgroup property is discovered. For the DeGroot model on distributed systems, using the G method too, we have a result for reaching a partial or total (distributed) consensus in a finite time similar to that for the DeGroot model for reaching a partial or total consensus in a finite time. Then we show that for any connected graph having 2m vertices, m≥ 1, and a spanning subgraph isomorphic to the m-cube graph, distributed averaging is performed in m steps -- this result can be extended -- research work -- for any graph with n1n2...nt vertices under certain conditions, where t, n1,n2,...,nt≥ 2, and, in this case, distributed averaging is performed in t steps.

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