General Clique Percolation in Network Evolution

Abstract

We introduce a general (k,l) clique community, which consists of adjacent k-cliques sharing at least l vertices with k-1 l 1. The emergence of a giant (k,l) clique community indicates a (k,l) clique percolation, which is studied by the largest size gap of the largest clique community during network evolution and the corresponding evolution step Tc. For a clique percolation, the averages of and Tc and the root-mean-squares of their fluctuations have power law finite-size effects whose exponents are related to the critical exponents. The fluctuation distribution functions of and Tc follow a finite-size scaling form. In the evolution of the Erdos-R\'enyi network, there are a series of (k,l) clique percolation with (k,l)=(2,1),(3,1),(3,2),(4,1),(4,2),(5,1),(4,3), and so on. The critical exponents of clique percolation depend on l, but are independent of k. The universality class of a (k,l) clique percolation is characterized alone by l.