Node-Asynchronous Spectral Clustering On Directed Graphs

Abstract

In recent years the convergence behavior of random node asynchronous graph communications have been studied for the case of undirected graphs. This paper extends these results to the case of graphs having arbitrary directed edges possibly with a nondiagonalizable adjacency matrix. Assuming that the graph operator has eigenvalue 1 and the input signal satisfies a certain condition (which ensures the existence of fixed points), this study presents the necessary and sufficient condition for the mean-squared convergence of the graph signal. The presented condition depends on the graph operator as well as the update probabilities, and the convergence of the randomized asynchronous updates may be achieved even when the underlying operator is not stable in the synchronous setting. As an application, the node-asynchronous updates are combined with polynomial filtering in order to obtain a spectral clustering for directed networks. The convergence is also verified with numerical simulations.

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