Title :
The Forest Consensus Theorem
Author :
Chebotarev, Pavel ; Agaev, Rafig
Author_Institution :
Inst. of Control Sci., Moscow, Russia
Abstract :
We show that the limiting state vector of the continuous-time consensus protocol with an arbitrary communication digraph is obtained by multiplying the eigenprojection of the Laplacian matrix of the model by the vector of initial states. Furthermore, the eigenprojection coincides with the stochastic matrix of maximum out-forests of the weighted communication digraph. These statements make the forest consensus theorem. A similar result for DeGroot´s iterative pooling model requires the Cesàro limit in the general case. The forest consensus theorem is useful for the analysis of consensus algorithms.
Keywords :
continuous time systems; directed graphs; iterative methods; matrix algebra; stochastic processes; DeGroot iterative pooling model; Laplacian matrix; arbitrary communication digraph; continuous-time consensus protocol; eigenprojection; forest consensus theorem; stochastic matrix; weighted communication digraph; Automation; Eigenvalues and eigenfunctions; Indexes; Laplace equations; Stochastic processes; Vectors; Vegetation; Consensus; DeGroot’s iterative pooling; DeGroot´s iterative pooling; eigenprojection; forest consensus theorem; out-forest;
Journal_Title :
Automatic Control, IEEE Transactions on
DOI :
10.1109/TAC.2014.2304369
