多重连接网络的有限时间广义同步
Finite-Time Generalized Synchronization of Multi-Linked Networks
摘要: 针对一类多重连接复杂动态网络,提出了一种实现有限时间广义同步的分散自适应控制策略。值得指出的是,本文的网络模型是由不同状态维数的相似节点组成的且外部耦合矩阵是时变的、非对称的、非耗散的。此外,需要强调的是,与现存的同步策略相比,有限时间广义同步不仅能减少控制成本和估计达到同步的时间,还可描述不同维数节点间的同步现象,这将提高控制策略的可操作性。基于有限时间稳定性理论,严格证明了网络有限时间广义同步控制策略的有效性,并通过数值仿真实例验证了所提结果的可行性和正确性。
Abstract: The article proposes decentralized adaptive control strategy to realize finite-time generalized syn-chronization for a class of multi-linked complex dynamical networks. It is worth pointing out that our network model is composed of similar nodes with different state dimensions and the outer cou-pling matrix can be time-varying, asymmetric, non-diffusively coupled. In addition, compared to the existing synchronization strategies, finite-time generalized synchronization can not only reduce control costs and estimate the time to achieve synchronization, but also can describe the synchro-nization phenomenon between nodes of different dimensions, which can improve the operability of control strategy. Based on finite-time stability theory, the validness of the control strategy for real-izing the finite-time generalized synchronization of our multi-linked networks is rigorously proved, and the numerical example is provided to illustrate the effectiveness and correctness of the pro-posed theoretical result.
文章引用:陈莉. 多重连接网络的有限时间广义同步[J]. 应用数学进展, 2022, 11(9): 6521-6531. https://doi.org/10.12677/AAM.2022.119690

参考文献

[1] Liu, Y.J., Huang, J.J., Qin, Y. and Yang, X.B. (2020) Finite-Time Synchronization of Complex-Valued Neural Net-works with Finite-Time Distributed Delays. Neurocomputing, 416, 152-157. [Google Scholar] [CrossRef
[2] Cai, S.M., Li,X.J., Zhou, P.P. and Shen, J.W. (2019) Aperiodic Intermittent Pinning Control for Exponential Synchronization of Memristive Neural Networks with Time-Varying Delays. Neurocomputing, 332, 249-258. [Google Scholar] [CrossRef
[3] Zhang, L.L., Wang, Y.H., Wang, Q.Y., Qiao, S.H. and Wang, F. (2020) Generalized Projective Synchronization for Networks with One Crucial Node and Different Dimensional Nodes via a Single Controller. Asian Journal of Control, 22, 1471-1481. [Google Scholar] [CrossRef
[4] Yang, D., Li, X.D. and Song, S.J. (2022) Finite-Time Synchronization for Delayed Complex Dynamical Networks with Synchronizing or Desynchronizing Impulses. IEEE Transactions on Neu-ral Networks and Learning Systems, 33, 736-746. [Google Scholar] [CrossRef
[5] Zhang, L.L., Wang, Y.H., Wang, Q.Y., Lei, Y.F. and Wang, F. (2019) Matrix Projective Cluster Synchronization for Arbitrarily Coupled Networks with Different Dimensional Nodes via Nonlinear Control. International Journal of Robust and Nonlinear Control, 29, 3650-3665. [Google Scholar] [CrossRef
[6] Huang, S., Dong, D.Z., Zhou, Z.J. and Liao, X.K. (2021) MP-CREDIT: Multi-Path Credit for High-Speed Data Center Transports. Computer Networks, 193, Article ID: 108061. [Google Scholar] [CrossRef
[7] Qiu, L., Dai, L.C., Pan, J.F., Najariyan, M., Liu, C.X. and Dai, X.S. (2022) Robust Stabilization Control for Multi-Station Motion System with Network Communication Constraints. Journal of the Franklin Institute. [Google Scholar] [CrossRef
[8] Lu, J.A., Wu, X.Q. and Lü, J.H. (2002) Synchronization of a Unified Chaotic System and the Application in Secure Communication. Physics Letters A, 305, 365-370. [Google Scholar] [CrossRef
[9] Wang, L.M., Jiang, S., Ge, M.F., Hu, C. and Hu, J.H. (2021) Finite-/Fixed-Time Synchronization of Memristor Chaotic Systems and Image Encryption Application. IEEE Transac-tions on Circuits and Systems I: Regular Papers, 68, 4957- 4969. [Google Scholar] [CrossRef
[10] Sun, Y.Q., Wu, H.Y., Chen, Z.H., Zheng, H.J. and Chen, Y. (2021) Outer Synchronization of Two Different Multi-Links Complex Networks by Chattering-Free Control. Physica A: Statistical Mechanics and Its Applications, 584, Article ID: 126354. [Google Scholar] [CrossRef
[11] Zhou, L.L., Tan, F., Yu, F. and Liu, W. (2019) Cluster Synchro-nization of Two-Layer Nonlinearly Coupled Multiplex Networks with Multi-Links And Time-Delays. Neurocomputing, 359, 264-275. [Google Scholar] [CrossRef
[12] Mwanandiye, E.S., Wu, B. and Jia, Q. (2020) Synchronization of Delayed Dynamical Networks with Multi-Links via Intermittent Pinning Control. Neural Computing and Applications, 32, 11277-11284. [Google Scholar] [CrossRef
[13] Xia, Y.P., Wu, Y.T. and Duan, W.Y. (2022) Cluster Synchroni-sation of Nonlinear Singular Complex Networks with Multi-Links and Time Delays. International Journal of Systems Science. [Google Scholar] [CrossRef
[14] Wang, X. and Miao, P. (2020) Finite-Time Function Projec-tive Synchronization in Complex Multi-Links Networks and Application to Chua’s Circuit. International Journal of Control, Automation and Systems, 18, 1993-2001. [Google Scholar] [CrossRef
[15] Zheng, M.W., Li, L.X., Peng, H.P., Xiao, J.H., Yang, Y.X., Zhang, Y.P. and Zhao, H. (2019) General Decay Synchronization of Complex Multi-Links Time-Varying Dynamic Network. Communications in Nonlinear Science and Numerical Simulation, 67, 108-123. [Google Scholar] [CrossRef
[16] Lü, L., Li, C.G., Bai, S.Y., Li, G., Yan, Z., Rong, T.T. and Gao, Y. (2018) Synchronization between Uncertain Time-Delayed Networks with Multi-Link and Different Topologies. Phys-ica A: Statistical Mechanics and Its Applications, 506, 635-643. [Google Scholar] [CrossRef
[17] Zhao, H., Li, L.X., Peng, H.P., Xiao, J.H. and Yang, Y.X. (2015) Mean Square Modified Function Projective Synchronization of Uncertain Complex Network with Multi-Links and Sto-chastic Perturbations. The European Physical Journal B, 88, 45. [Google Scholar] [CrossRef
[18] Zhao, H., Li, L.X., Peng, H.P., Xiao, J.H., Yang, Y.X. and Zheng, M.W. (2016) Impulsive Control for Synchronization and Parameters Identification of Uncertain Multi-Links Complex Network. Nonlinear Dynamics, 83, 1437-1451. [Google Scholar] [CrossRef
[19] Zhang, C., Wang, X.Y., Ye, X.L., Zhou, S. and Feng, L. (2020) Robust Modified Function Projective Lag Synchronization between Two Nonlinear Complex Networks with Differ-ent-Dimensional Nodes and Disturbances. ISA Transactions, 101, 42-49. [Google Scholar] [CrossRef] [PubMed]
[20] DeLellis, P., Di Bernardo, M., Gorochowski, T.E. and Russo, G. (2010) Synchronization and Control of Complex Networks via Contraction, Adaptation and Evolution. IEEE Circuits and Systems Magazine, 10, 64-82. [Google Scholar] [CrossRef
[21] Pouragha, M. and Wan, R. (2017) Non-Dissipative Structural Evolutions in Granular Materials within the Small Strain Range. International Journal of Solids and Structures, 110, 94-105. [Google Scholar] [CrossRef
[22] Liu, G.Q., Li, W.H., Yang, H.J. and Knowles, G. (2014) The Control Gain Region for Synchronization in Non-Diffu- sively Coupled Complex Networks. Physica A: Statistical Mechanics and Its Applications, 405, 17-24. [Google Scholar] [CrossRef
[23] Gao, Z.L., Wang, Y.H., Zhang, L.L., Xiong, J. and Wang, W.L. (2019) Decentralized Stabilization for Structurally Balanced Networks with Similar Nodes. Modern Physics Letters B, 33, Article ID: 1950146. [Google Scholar] [CrossRef
[24] Zhang,L.L., Lei, Y.F., Wang, Y.H. and Chen, H.G. (2018) Generalized Outer Synchronization between Non-Dissipa- tively Coupled Complex Networks with Differ-ent-Dimensional Nodes. Applied Mathematical Modelling, 55, 248-261. [Google Scholar] [CrossRef
[25] Zhou, W.J., Hu, Y.F., Liu, X.Y. and Cao, J.D. (2022) Finite-Time Adaptive Synchronization of Coupled Uncertain Neural Networks via Intermittent Control. Physica A: Statistical Me-chanics and Its Applications, 596, Article ID: 127107. [Google Scholar] [CrossRef
[26] Hardy, G., Littlewood, J. and Polya, G. (1952) Inequalities. Cambridge University Press, Cambridge.
[27] Bhat, S.P. and Bernstein, D.S. (2000) Finite-Time Stability of Continuous Autonomous Systems. SIAM Journal of Control and Optimization, 38, 751-766. [Google Scholar] [CrossRef
[28] Mahmoud, G.M. and Ahmed, M.E. (2010) Modified Projective Synchronization and Control of Complex Chen and Lü Systems. Journal of Vibration and Control, 17, 1184-1194. [Google Scholar] [CrossRef
[29] Mahmoud, G.M., Mahmoud, E.E. and Ahmed, M.E. (2009) On the Hyperchaotic Complex Lü System. Nonlinear Dynamics, 58, 725-738. [Google Scholar] [CrossRef

为你推荐