On the robustness of event-based synchronization under switching interactions

In this paper we study the robustness of an event-triggered synchronization dynamics for a network of identical nodes under various switching scenarios. We first consider an arbitrary switching scenario where, for a general class of isolated node dynamics we characterize sufficient conditions in terms of network topologies to maintain synchronization. In particular, we shall also demonstrate that for a specific class of skew-symmetric isolated node dynamics-which play important role in this class of synchronization problems-the asymptotic synchronization is not achievable under arbitrary switching. We then consider two classes of constrained switching signals, namely uniform and average classes, i.e., S<sub>dwell</sub>[τ<sub>D</sub>], and S<sub>average</sub>[τ<sub>a</sub>,N<sub>0</sub>], respectively, where we characterize sufficient conditions in terms of the associated parameters, τ<sub>D</sub>, τ<sub>a</sub> and N<sub>0</sub> in order to ensure asymptotic synchronization. We shall wrap up our discussion by presenting relevant simulation studies.

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