摘要
A class of models for activity-driven networks is proposed in which nodes vary in two states: active and inactive. Only active nodes can receive links from others which represent instantaneous dynamical interactions. The evolution of the network couples the addition of new nodes and state transitions of old ones. The active group changes with activated nodes entering and deactivated ones leaving. A general differential equation framework is developed to study the degree distribution of nodes of integrated networks where four different schemes are formulated.
A class of models for activity-driven networks is proposed in which nodes vary in two states: active and inactive. Only active nodes can receive links from others which represent instantaneous dynamical interactions. The evolution of the network couples the addition of new nodes and state transitions of old ones. The active group changes with activated nodes entering and deactivated ones leaving. A general differential equation framework is developed to study the degree distribution of nodes of integrated networks where four different schemes are formulated.
基金
supported by the National Natural Science Foundation of China(Grant No.11665009)
the Natural Science Research Project of Guizhou Provincial Education Bureau(Grant No.KY[2015]355)
