Asymptotic degree distribution of a duplication-deletion random graph model

Abstract

We study a discrete-time duplication-deletion random graph model and analyse its asymptotic degree distribution. The random graphs consists of disjoint cliques. In each time step either a new vertex is brought in with probability 0<p<1 and attached to an existing clique, chosen with probability proportional to the clique size, or all the edges of a random vertex are deleted with probability 1-p. We prove almost sure convergence of the asymptotic degree distribution and find its exact values in terms of a hypergeometric integral, expressed in terms of the parameter p. In the regime 0<p<12 we show that the degree sequence decays exponentially at rate p1-p, whereas it satisfies a power-law with exponent p2p-1 if 12<p<1. At the threshold p=12 the degree sequence lies between a power-law and exponential decay.