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Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations
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Zeitschriftentitel: | Advances in Mathematical Physics |
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Personen und Körperschaften: | , , , |
In: | Advances in Mathematical Physics, 2020, 2020, S. 1-15 |
Format: | E-Article |
Sprache: | Englisch |
veröffentlicht: |
Hindawi Limited
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Schlagwörter: |
author_facet |
Qiu, Haifeng Weng, Liguo Yu, Bin Zhang, Yanghui Qiu, Haifeng Weng, Liguo Yu, Bin Zhang, Yanghui |
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author |
Qiu, Haifeng Weng, Liguo Yu, Bin Zhang, Yanghui |
spellingShingle |
Qiu, Haifeng Weng, Liguo Yu, Bin Zhang, Yanghui Advances in Mathematical Physics Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations Applied Mathematics General Physics and Astronomy |
author_sort |
qiu, haifeng |
spelling |
Qiu, Haifeng Weng, Liguo Yu, Bin Zhang, Yanghui 1687-9139 1687-9120 Hindawi Limited Applied Mathematics General Physics and Astronomy http://dx.doi.org/10.1155/2020/7456120 <jats:p>The paper mainly focuses on the synchronization of multiple-weight Markovian switching complex networks under nonlinear coupling mode. Based on the finite-time stability theory, Itô’s lemma, and some inequality technologies, the synchronization criterion of network models in the nonlinear coupling mode is obtained; at the same time, unknown parameters of networks are also identified by an effective controller. In addition, several corollaries are given to illustrate the general applicability of the control rules in the paper. Finally, two typical numerical simulations are given to prove the rationality and feasibility of theoretical analysis of network models.</jats:p> Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations Advances in Mathematical Physics |
doi_str_mv |
10.1155/2020/7456120 |
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Hindawi Limited, 2020 |
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Hindawi Limited, 2020 |
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1687-9139 1687-9120 |
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2020 |
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Hindawi Limited |
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Advances in Mathematical Physics |
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49 |
title |
Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations |
title_unstemmed |
Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations |
title_full |
Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations |
title_fullStr |
Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations |
title_full_unstemmed |
Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations |
title_short |
Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations |
title_sort |
finite-time antisynchronization and parameters identification of nonlinear coupled multiple-weight markovian switching complex networks with stochastic perturbations |
topic |
Applied Mathematics General Physics and Astronomy |
url |
http://dx.doi.org/10.1155/2020/7456120 |
publishDate |
2020 |
physical |
1-15 |
description |
<jats:p>The paper mainly focuses on the synchronization of multiple-weight Markovian switching complex networks under nonlinear coupling mode. Based on the finite-time stability theory, Itô’s lemma, and some inequality technologies, the synchronization criterion of network models in the nonlinear coupling mode is obtained; at the same time, unknown parameters of networks are also identified by an effective controller. In addition, several corollaries are given to illustrate the general applicability of the control rules in the paper. Finally, two typical numerical simulations are given to prove the rationality and feasibility of theoretical analysis of network models.</jats:p> |
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author | Qiu, Haifeng, Weng, Liguo, Yu, Bin, Zhang, Yanghui |
author_facet | Qiu, Haifeng, Weng, Liguo, Yu, Bin, Zhang, Yanghui, Qiu, Haifeng, Weng, Liguo, Yu, Bin, Zhang, Yanghui |
author_sort | qiu, haifeng |
container_start_page | 1 |
container_title | Advances in Mathematical Physics |
container_volume | 2020 |
description | <jats:p>The paper mainly focuses on the synchronization of multiple-weight Markovian switching complex networks under nonlinear coupling mode. Based on the finite-time stability theory, Itô’s lemma, and some inequality technologies, the synchronization criterion of network models in the nonlinear coupling mode is obtained; at the same time, unknown parameters of networks are also identified by an effective controller. In addition, several corollaries are given to illustrate the general applicability of the control rules in the paper. Finally, two typical numerical simulations are given to prove the rationality and feasibility of theoretical analysis of network models.</jats:p> |
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institution | DE-D275, DE-Bn3, DE-Brt1, DE-Zwi2, DE-D161, DE-Zi4, DE-Gla1, DE-15, DE-Pl11, DE-Rs1, DE-14, DE-105, DE-Ch1, DE-L229 |
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spelling | Qiu, Haifeng Weng, Liguo Yu, Bin Zhang, Yanghui 1687-9139 1687-9120 Hindawi Limited Applied Mathematics General Physics and Astronomy http://dx.doi.org/10.1155/2020/7456120 <jats:p>The paper mainly focuses on the synchronization of multiple-weight Markovian switching complex networks under nonlinear coupling mode. Based on the finite-time stability theory, Itô’s lemma, and some inequality technologies, the synchronization criterion of network models in the nonlinear coupling mode is obtained; at the same time, unknown parameters of networks are also identified by an effective controller. In addition, several corollaries are given to illustrate the general applicability of the control rules in the paper. Finally, two typical numerical simulations are given to prove the rationality and feasibility of theoretical analysis of network models.</jats:p> Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations Advances in Mathematical Physics |
spellingShingle | Qiu, Haifeng, Weng, Liguo, Yu, Bin, Zhang, Yanghui, Advances in Mathematical Physics, Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations, Applied Mathematics, General Physics and Astronomy |
title | Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations |
title_full | Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations |
title_fullStr | Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations |
title_full_unstemmed | Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations |
title_short | Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations |
title_sort | finite-time antisynchronization and parameters identification of nonlinear coupled multiple-weight markovian switching complex networks with stochastic perturbations |
title_unstemmed | Finite-Time Antisynchronization and Parameters Identification of Nonlinear Coupled Multiple-Weight Markovian Switching Complex Networks with Stochastic Perturbations |
topic | Applied Mathematics, General Physics and Astronomy |
url | http://dx.doi.org/10.1155/2020/7456120 |