A geometrical approach to control and controllability of nonlinear dynamical networks.
about
Control efficacy of complex networks.Physical controllability of complex networks.Universal framework for edge controllability of complex networks.Predicting the bounds of large chaotic systems using low-dimensional manifoldsStructure-based control of complex networks with nonlinear dynamics.Closed-Loop Control of Complex Networks: A Trade-Off between Time and Energy.Target Control in Logical Models Using the Domain of Influence of Nodes.
P2860
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P2860
A geometrical approach to control and controllability of nonlinear dynamical networks.
description
2016 nî lūn-bûn
@nan
2016年の論文
@ja
2016年論文
@yue
2016年論文
@zh-hant
2016年論文
@zh-hk
2016年論文
@zh-mo
2016年論文
@zh-tw
2016年论文
@wuu
2016年论文
@zh
2016年论文
@zh-cn
name
A geometrical approach to control and controllability of nonlinear dynamical networks.
@ast
A geometrical approach to control and controllability of nonlinear dynamical networks.
@en
type
label
A geometrical approach to control and controllability of nonlinear dynamical networks.
@ast
A geometrical approach to control and controllability of nonlinear dynamical networks.
@en
prefLabel
A geometrical approach to control and controllability of nonlinear dynamical networks.
@ast
A geometrical approach to control and controllability of nonlinear dynamical networks.
@en
P2093
P2860
P356
P1476
A geometrical approach to control and controllability of nonlinear dynamical networks.
@en
P2093
Le-Zhi Wang
Wen-Xu Wang
Zi-Gang Huang
P2860
P2888
P356
10.1038/NCOMMS11323
P407
P577
2016-04-14T00:00:00Z