The degree distribution and the number of edges between nodes of given degrees in directed scale-free graphs

Abstract

In this paper, we study some important statistics of the random graph in the directed preferential attachment model introduced by B. Bollob\'as, C. Borgs, J. Chayes and O. Riordan. First, we find a new asymptotic formula for the expectation of the number nin(d,t) of nodes of a given in-degree d in a graph in this model with t edges, which covers all possible degrees. The out-degree distribution in the model is symmetrical to the in-degree distribution. Then we prove tight concentration for nin(d,t) while d grows up to the moment when nin(d,t) decreases to 2 t; if d grows even faster, nin(d,t) is zero whp. Furthermore, we study a more complicated statistic of the graph: X(d1,d2,t) is the total number of edges from a vertex of out-degree d1 to a vertex of in-degree d2. We also find an asymptotic formula for the expectation of X(d1,d2,t) and prove a tight concentration result.