Bootstrap percolation on spatial networks

Abstract

We numerically study bootstrap percolation on Kleinberg's spatial networks, in which the probability density function of a node to have a long-range link at distance r scales as P(r) rα. Setting the ratio of the size of the giant active component to the network size as the order parameter, we find a critical exponent αc=-1, above which a hybrid phase transition is observed, with both the first-order and second-order critical points being constant. When α<αc, the second-order critical point increases as the decreasing of α, and there is either absent of the first-order phase transition or with a decreasing first-order critical point as the decreasing of α, depending on other parameters. Our results expand the current understanding on the spreading of information and the adoption of behaviors on spatial social networks.