Random Graphs Associated to some Discrete and Continuous Time Preferential Attachment Models
Abstract
We give a common description of Simon, Barab\'asi--Albert, II-PA and Price growth models, by introducing suitable random graph processes with preferential attachment mechanisms. Through the II-PA model, we prove the conditions for which the asymptotic degree distribution of the Barab\'asi--Albert model coincides with the asymptotic in-degree distribution of the Simon model. Furthermore, we show that when the number of vertices in the Simon model (with parameter ) goes to infinity, a portion of them behave as a Yule model with parameters , and through this relation we explain why asymptotic properties of a random vertex in Simon model, coincide with the asymptotic properties of a random genus in Yule model. As a by-product of our analysis, we prove the explicit expression of the in-degree distribution for the II-PA model, given without proof in \cite{Newman2005}. References to traditional and recent applications of the these models are also discussed.
Cite
@article{arxiv.1503.06150,
title = {Random Graphs Associated to some Discrete and Continuous Time Preferential Attachment Models},
author = {Angelica Pachon and Federico Polito and Laura Sacerdote},
journal= {arXiv preprint arXiv:1503.06150},
year = {2016}
}