| [1] |
Dong, Z.; Wang, X.; Zhang, X., A nonsingular M-matrix-based global exponential stability analysis of higher-order delayed discrete-time Cohen-Grossberg neural networks, Appl Math Comput, 385, Article 125401 pp. (2020) · Zbl 1508.39013 |
| [2] |
Yan, Z.; Huang, X.; Fan, Y.; Xia, J.; Shen, H., Threshold-function-dependent quasi-synchronization of delayed memristive neural networks via hybrid event-triggered control, IEEE Trans Syst Man Cybern -Syst, 51, 11, 6712-6722 (2021) |
| [3] |
Wang, P.; He, Q.; Su, H., Stabilization of discrete-time stochastic delayed neural networks by intermittent control, IEEE Trans Cybern (2021) |
| [4] |
Zhang, C.; Xia, D.; Chen, H.; Yang, H.; Li, R., Nallappan gunasekaran, identifying partial topological structures of stochastic multi-group models with multiple dispersals via graph-theoretic method, Fractal Fract, 6, 371 (2022) |
| [5] |
Li, X.; Ho, D. W.C.; Cao, J., Finite-time stability and settling-time estimation of nonlinear impulsive systems, Automatica, 99, 361-368 (2019) · Zbl 1406.93260 |
| [6] |
Zhou, H.; Song, J.; Li, W., Stabilization of stochastic time-varying coupled systems with delays and lévy noise on networks based on aperiodically intermittent control, Eng Appl Artif Intell, 91, Article 103576 pp. (2020) |
| [7] |
Liu, Y.; Liu, J.; Li, W., Stabilization of highly nonlinear stochastic coupled systems via periodically intermittent control, IEEE Trans Automat Control, 66, 10, 4799-4806 (2021) · Zbl 1536.93962 |
| [8] |
Xu, D.; Wang, T.; Su, H., Aperiodically intermittent pinning discrete-time observation control for exponential synchronization of stochastic multilayer coupled systems, Neurocomputing, 505, 21, 203-213 (2022) |
| [9] |
Li, X.; Peng, D.; Cao, J., Lyapunov stability for impulsive systems via event-triggered impulsive control, IEEE Trans Automat Control, 65, 11, 4908-4913 (2020) · Zbl 1536.93638 |
| [10] |
Guo, Y.; Li, Y., Bipartite leader-following synchronization of fractional-order delayed multilayer signed networks by adaptive and impulsive controllers, Appl Math Comput, 430, Article 127243 pp. (2022) · Zbl 1510.93141 |
| [11] |
Zhang, N.; Wang, X.; Li, W., Stability for multi-linked stochastic delayed complex networks with stochastic hybrid impulses by Dupire Itô’s formula, Nonlinear Anal-Hybrid Syst, 45, Article 101200 pp. (2022) · Zbl 1497.93236 |
| [12] |
Liu, Y.; Lin, Y., Synchronization of quaternion-valued coupled systems with time-varying coupling via event-triggered impulsive control, Math Methods Appl Sci (2021) |
| [13] |
Li, X.; Song, S.; Wu, J., Exponential stability of nonlinear systems with delayed impulses and applications, IEEE Trans Automat Control, 64, 4024-4034 (2019) · Zbl 1482.93452 |
| [14] |
Lu, J.; Ho, D. W.C.; Cao, J., A unified synchronization criterion for impulsive dynamical networks, Automatica, 46, 1215-1221 (2010) · Zbl 1194.93090 |
| [15] |
Jian, J.; Wan, P., Global exponential convergence of fuzzy complex-valued neural networks with time-varying delays and impulsive effects, Fuzzy Sets and Systems, 338, 23-39 (2018) · Zbl 1402.34080 |
| [16] |
Li, X.; Li, P., Stability of time-delay systems with impulsive control involving stabilizing delays, Automatica, 124, Article 109336 pp. (2021) · Zbl 1461.93436 |
| [17] |
Yang, B.; Chen, Y., A new complex-valued polynomial model, Neural Process Lett, 50, 3, 2609-2626 (2019) |
| [18] |
Shi, Y.; Cao, J.; Chen, G., Exponential stability of complex-valued memristor-based neural networks with time-varying delays, Appl Math Comput, 313, 222-234 (2017) · Zbl 1426.92004 |
| [19] |
Zhang, Z.; Lin, C.; Chen, B., Global stability criterion for delayed complex-valued recurrent neural networks, IEEE Trans Neural Netw Learn Syst, 25, 9, 1704-1708 (2014) |
| [20] |
Wang, H.; Duan, S.; Huang, T.; Wang, L.; Li, C., Exponential stability of complex-valued memristive recurrent neural networks, IEEE Trans Neural Netw Learn Syst, 28, 3, 766-771 (2017) |
| [21] |
Zeng, X.; Li, C.; Huang, T.; He, X., Stability analysis of complex-valued impulsive systems with time delay, Appl Math Comput, 256, 75-82 (2015) · Zbl 1338.34132 |
| [22] |
Fang, T.; Sun, J., Stability of complex-valued impulsive and switching system and application to the Lü system, Nonlinear Anal-Hybrid Syst, 14, 38-46 (2014) · Zbl 1292.93095 |
| [23] |
Wang, P.; Zhang, B.; Su, H., Stabilization of stochastic uncertain complex-valued delayed networks via aperiodically intermittent nonlinear control, IEEE Trans Syst Man Cybern -Syst, 49, 3, 649-662 (2019) |
| [24] |
Zhou, H.; Jiang, Q.; Li, W.; Feng, J., Stability of stochastic Levy noise coupled systems with mixed delays, Internat J Control (2020) |
| [25] |
Zhai, Y.; Wang, P.; Su, H., Stabilization of stochastic complex networks with delays based on completely aperiodically intermittent control, Nonlinear Anal-Hybrid Syst, 42, Article 101074 pp. (2021) · Zbl 1478.93727 |
| [26] |
Wu, Y.; Zhuang, S.; Ahn, C. K.; Li, W., Aperiodically intermittent discrete-time state observation noise for consensus of multi-agent systems, IEEE Trans Syst Man Cybern-Syst, 52, 2, 1243-1253 (2021) |
| [27] |
Zhang, N.; Chen, H.; Li, W., Stability for multi-links stochastic delayed complex networks with semi-Markov jump under hybrid multi-delay impulsive control, Neurocomputing, 449, 214-228 (2021) |
| [28] |
Zhou, X.; Yang, J.; Li, Z.; Tong, D., Pth moment synchronization of Markov switched neural networks driven by fractional Brownian noise, Neural Comput Appl, 29, 10, 823-836 (2018) |
| [29] |
Wu, X.; Zhang, W.; Tang, Y., Pth moment stability of impulsive stochastic delay differential systems with Markovian switching, Commun Nonlinear Sci Numer Simul, 18, 7, 1870-1879 (2013) · Zbl 1291.35432 |
| [30] |
Boutiara, A.; Etemad, S.; Hussain, A.; Rezapour, S., The generalized U-H and U-H stability and existence analysis of a coupled hybrid system of integro-differential IVPs involving phi-Caputo fractional operators, Adv Differential Equations, 2021, 1, 95 (2021) · Zbl 1494.34023 |
| [31] |
Hussain, A.; Baleanu, D.; Adeel, M., Existence of solution and stability for the fractional order novel coronavirus (nCoV-2019) model, Adv Differential Equations, 2020, 1, 384 (2020) · Zbl 1485.92132 |
| [32] |
Zhou, J.; Zhang, S.; He, Y., Existence and stability of solution for a nonlinear fractional differential equation, J Math Anal Appl, 498, 1, 1-13 (2021) · Zbl 1462.34108 |
| [33] |
Guo, R.; Zhang, Z.; Liu, X.; Lin, C., Existence, uniqueness, and exponential stability analysis for complex-valued memristor-based BAM neural networks with time delays, Appl Math Comput, 311, 100-117 (2017) · Zbl 1429.93306 |
| [34] |
Rakkiyappan, R.; Cao, J.; Velmurugan, G., Existence and uniform stability analysis of fractional-order complex-valued neural networks with time delays, IEEE Trans Neural Netw Learn Syst, 26, 1, 84-97 (2015) |
| [35] |
Yan, L.; Pei, W.; Zhang, Z., Exponential stability of SDEs driven by FBM with Markovian switching, Discrete Contin Dyn Syst, 39, 11, 6467-6483 (2019) · Zbl 1422.60108 |
| [36] |
Li, S.; Zheng, Y.; Su, H., Almost sure synchronization of multilayer networks via intermittent pinning noises: A white-noise-based time-varying coupling, IEEE Trans Circuits Syst I-Regul Pap, 68, 8, 3460-3473 (2021) |
| [37] |
Uboe, J., Conformal martingales and analytic functions, Math Scand, 60, 2, 292-309 (1987) · Zbl 0634.60042 |
| [38] |
Mao, X.; Yuan, C., Stochastic differential equations with markovian switching (2006), Imperial College Press · Zbl 1126.60002 |
| [39] |
K., K.-D., The complex gradient operator and the CR-calculus (2009), Dept. Elect. Comput. Eng, Univ. California: Dept. Elect. Comput. Eng, Univ. California San Diego, CA, USA |
| [40] |
Li, M. Y.; Shuai, Z., Global-stability problem for coupled systems of differential equations on networks, J Differ Equ, 248, 1, 1-20 (2010) · Zbl 1190.34063 |
| [41] |
Li, X.; Song, S., Impulsive control for existence, uniqueness, and global stability of periodic solutions of recurrent neural networks with discrete and continuously distributed delays, IEEE Trans Neural Netw Learn Syst, 24, 6, 868-877 (2013) |
| [42] |
Song, Q.; Yan, H.; Zhao, Z.; Liu, Y., Global exponential stability of impulsive complex-valued neural networks with both asynchronous time-varying and continuously distributed delays, Neural Netw, 81, 1-10 (2016) · Zbl 1417.34181 |
| [43] |
Wei, T.; Li, X.; Stojanovic, V., Input-to-state stability of impulsive reaction-diffusion neural networks with infinite distributed delays, Nonlinear Dynam, 103, 2, 1733-1755 (2021) · Zbl 1517.93057 |
| [44] |
Sakthivel, R.; Luo, J., Asymptotic stability of impulsive stochastic partial differential equations with infinite delays, J Math Anal Appl, 356, 1-6 (2009) · Zbl 1166.60037 |
| [45] |
Li, X.; Li, P., Input-to-state stability of nonlinear systems: Event-triggered impulsive control, IEEE Trans Automat Control, 67, 3, 1460-1465 (2022) · Zbl 1537.93629 |
