Imre Derenyi, Gergely Palla, Tamas Vicsek
Published 2005-04-21Version 1
The notion of k-clique percolation in random graphs is introduced, where k is the size of the complete subgraphs whose large scale organizations are analytically and numerically investigated. For the Erdos-Renyi graph of N vertices we obtain that the percolation transition of k-cliques takes place when the probability of two vertices being connected by an edge reaches the threshold pc(k)=[(k-1)N]^{-1/(k-1)}. At the transition point the scaling of the giant component with N is highly non-trivial and depends on k. We discuss why clique percolation is a novel and efficient approach to the identification of overlapping communities in large real networks.
Comments: 4 pages, 3 figures, to be published in Phys. Rev. Lett
Journal: Phys. Rev. Lett. 94, 160202 (2005)
Bayes-optimal inference for spreading processes on random networks
Stability in the evolution of random networks
Comment to "Emergence of Scaling in Random Networks" (cond-mat/9910332)
