Connectivity of Growing Random Networks

Abstract

A solution for the time- and age-dependent connectivity distribution of a growing random network is presented. The network is built by adding sites which link to earlier sites with a probability Ak which depends on the number of pre-existing links k to that site. For homogeneous connection kernels, Ak ~ kgamma, different behaviors arise for gamma<1, gamma>1, and gamma=1. For gamma<1, the number of sites with k links, Nk, varies as stretched exponential. For gamma>1, a single site connects to nearly all other sites. In the borderline case Ak ~ k, the power law Nk ~k-nu is found, where the exponent nu can be tuned to any value in the range 2<nu<infinity.