Finite-Time 
                
                  
                
                $${H_\infty }$$
                
                  
                    
                      H
                      ∞
                    
                  
                
               Synchronization for Complex Dynamical Networks with Markovian Jump Parameter

Ma, Ning; Liu, Zhibin; Chen, Lin

doi:10.1007/s40313-018-00428-9

Cited by 2 publications

(1 citation statement)

References 39 publications

(31 reference statements)

Supporting

Mentioning

Contrasting

Order By: Relevance

“…As of late, finite time synchronization of complex systems researched in [29,9,4,1]. In flag transmission, the flag will end up frail because of dispersion in flag transmission, so it is critical to think about that the enactment fluctuates in space just as in time and the response dissemination impacts can't be ignored in both organic and man-made models [31,16]. As electrons transport in a nonuniform electromagnetic field, the dispersion marvels couldn't be overlooked.…”

Section: Syed Ali Palanisamy Gunasekaran Alsaedi and Ahmadmentioning

confidence: 99%

Finite-time exponential synchronization of reaction-diffusion delayed complex-dynamical networks

Ali¹,

Palanisamy²,

Gunasekaran³

et al. 2021

Discrete &Amp; Continuous Dynamical Systems - S

View full text Add to dashboard Cite

This investigation looks at the issue of finite time exponential synchronization of complex dynamical systems with reaaction diffusion term. This reort studies complex networks consisting of N straightly and diffusively coupled networks. By building a new Lyapunov krasovskii functional (LKF), using Jensens inequality and convex algorithms approach stability conditions frameworks are determined. At last, a numerical precedent is given to demonstrate the practicality of the theoretical results.Complex dynamical systems (CDNs) have gotten impressive consideration because of their broad applications in useful society, for example, guideline of intensity framework, parallel picture preparing, the activity of no-man air vehicle, the acknowledgment of chain explosion, and so on., (see [12,35,27,2,3,5] and references in that). As of late, complex systems can be seen all over the place and are turning into an essential piece of our day by day life. The absolute most surely understood models incorporate nourishment networks, correspondence systems, interpersonal organizations, control matrices, cell systems, WWW, metabolic networks, illness transmission systems, and so on. Along these lines, the topology and dynamical conduct of complex dynamical systems have been broadly considered by the scientists ([8, 17, 21, 9]). Specifically, the synchronization issue of complex dynamical systems has gotten much concentration as of late ([34, 25]).

show abstract

Section: Syed Ali Palanisamy Gunasekaran Alsaedi and Ahmadmentioning

confidence: 99%

Finite-time exponential synchronization of reaction-diffusion delayed complex-dynamical networks

Ali¹,

Palanisamy²,

Gunasekaran³

et al. 2021

Discrete &Amp; Continuous Dynamical Systems - S

View full text Add to dashboard Cite

show abstract

Non-Fragile Passivity Synchronization Control for Complex Dynamical Networks With Dynamics Behavior Links

Chen

2021

IEEE Access

View full text Add to dashboard Cite

Passivity synchronization of complex dynamical networks with time-varying dynamics behavior links is investigated in this paper. In many real-world complex dynamical networks have dynamic behavior which can cause synchronization losing in the networks. To make the systems synchronization, a non-fragile controller is given. By constructing a new Laypunov-Krasovskii functional and combining the reciprocal convex technique, sufficient conditions for complex dynamical networks to be synchronized are derived. The derived conditions can be solved by linear matrix inequalities (LMIs). In the end, two examples are presented to demonstrate the effectiveness of the proposed methods.

show abstract

Finite-Time $${H_\infty }$$ H ∞ Synchronization for Complex Dynamical Networks with Markovian Jump Parameter

Cited by 2 publications

References 39 publications

Finite-time exponential synchronization of reaction-diffusion delayed complex-dynamical networks

Finite-time exponential synchronization of reaction-diffusion delayed complex-dynamical networks

Non-Fragile Passivity Synchronization Control for Complex Dynamical Networks With Dynamics Behavior Links

Contact Info

Product

Resources

About