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32
Voted
SIAMCO
2008
2008
Reaching a Consensus in a Dynamically Changing Environment: A Graphical Approach
This paper presents new graph-theoretic results appropriate to the analysis of a variety of consensus problems cast in dynamically changing environments. The concepts of rooted, strongly rooted and neighbor-shared are defined and conditions are derived for compositions of sequences of directed graphs to be of these types. The graph of a stochastic matrix is defined and it is shown that under certain conditions the graph of a Sarymsakov matrix and a rooted graph are one and the same. As an illustration of the use of the concepts developed in this paper, graph-theoretic conditions are obtained which address the convergence question for the leaderless version of the widely studied Vicsek consensus problem.
Real-time Traffic| Added | 14 Dec 2010 |
| Updated | 14 Dec 2010 |
| Type | Journal |
| Year | 2008 |
| Where | SIAMCO |
| Authors | Ming Cao, A. Stephen Morse, Brian D. O. Anderson |
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