Large deviation and anomalous fluctuations scaling in degree assortativity on configuration networks

Abstract

By constructing a multicanonical Monte Carlo simulation, we obtain the full probability distribution N(r) of the degree assortativity coefficient r on configuration networks of size N by using the multiple histogram reweighting method. We suggest that N(r) obeys a large deviation principle, N (r-rN* ) e - N I( r- rN* ), where the rate function I is convex and possesses its unique minimum at r=rN*, and is an exponent that scales N's with N. We show that =1 for Poisson random graphs, and ≥1 for scale-free networks in which is a decreasing function of the degree distribution exponent γ. Our results reveal that the fluctuations of r exhibits an anomalous scaling with N in highly heterogeneous networks.