Generating-function approach for bond percolations in hierarchical networks

Abstract

We study bond percolations on hierarchical scale-free networks with the open bond probability of the shortcuts p and that of the ordinary bonds p. The system has a critical phase in which the percolating probability P takes an intermediate value 0<P<1. Using generating function approach, we calculate the fractal exponent of the root clusters to show that varies continuously with p in the critical phase. We confirm numerically that the distribution ns of cluster size s in the critical phase obeys a power law ns s-τ, where τ satisfies the scaling relation τ=1+-1. In addition the critical exponent β(p) of the order parameter varies as p, from β 0.164694 at p=0 to infinity at p=pc=5/32.