Phase Transition on The Degree Sequence of a Mixed Random Graph Process

Abstract

This paper focuses on the problem of the degree sequence for a mixed random graph process which continuously combines the classical model and the BA model. Note that the number of step added edges for the mixed model is random and non-uniformly bounded. By developing a comparing argument, phase transition on the degree distributions of the mixed model is revealed: while the pure classical model possesses a exponential degree sequence, the pure BA model and the mixed model possess power law degree sequences. As an application of the methodology, phase transition on the degree sequence of another mixed model with hard copying is also studied, especially, in the power law region, the inverse power can take any value greater than 1.