A Threshold For Clusters in Real-World Random Networks

Abstract

Recent empirical work [Leskovec2009] has suggested the existence of a size threshold for the existence of clusters within many real-world networks. We give the first proof that this clustering size threshold exists within a real-world random network model, and determine the asymptotic value at which it occurs. More precisely, we choose the Community Guided Attachment (CGA) random network model of Leskovek, Kleinberg, and Faloutsos [Leskovec2005]. The model is non-uniform and contains self-similar communities, and has been shown to have many properties of real-world networks. To capture the notion of clustering, we follow Mishra et. al. [Mishra2007], who defined a type of clustering for real-world networks: an (α,β)-cluster is a set that is both internally dense (to the extent given by the parameter β), and externally sparse (to the extent given by the parameter α) . With this definition of clustering, we show the existence of a size threshold of ( n)1/2 for the existence of clusters in the CGA model. For all ε>0, a.a.s. clusters larger than ( n)1/2-ε exist, whereas a.a.s. clusters larger than ( n)1/2+ε do not exist. Moreover, we show a size bound on the existence of small, constant-size clusters.