Adaptive exponential cluster synchronization in colored community networks via aperiodically intermittent pinning control. (English) Zbl 1398.34091
Summary: This paper investigates the problem of pinning cluster synchronization for colored community networks via adaptive aperiodically intermittent control. Firstly, a general colored community network model is proposed, where the isolated nodes can interact through different kinds of connections in different communities and the interactions between different pair of communities can also be different, and moreover, the nodes in different communities can have different state dimensions. Then, an adaptive aperiodically intermittent control strategy combined with pinning scheme is developed to realize cluster synchronization of such colored community network. By introducing a novel piecewise continuous auxiliary function, some globally exponential cluster synchronization criteria are rigorously derived according to Lyapunov stability theory and piecewise analysis approach. Based on the derived criteria, a guideline to illustrate which nodes in each community should be preferentially pinned is given. It is noted that the adaptive intermittent pinning control is aperiodic, in which both control width and control period are allowed to be variable. Finally, a numerical example is provided to show the effectiveness of the theoretical results obtained.
MSC:
| 34H15 | Stabilization of solutions to ordinary differential equations |
| 34B45 | Boundary value problems on graphs and networks for ordinary differential equations |
| 90B10 | Deterministic network models in operations research |
| 34D05 | Asymptotic properties of solutions to ordinary differential equations |
Keywords:
exponential cluster synchronization; colored community network; nodes of different state dimensions; adaptive aperiodically intermittent control; pinning schemeReferences:
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