Twitter event networks and the Superstar model

Author(s)

Bhamidi, Shankar; Steele, J. Michael; Zaman, Tauhid R

Abstract

Condensation phenomenon is often observed in social networks such as Twitter where one “superstar” vertex gains a positive fraction of the edges, while the remaining empirical degree distribution still exhibits a power law tail. We formulate a mathematically tractable model for this phenomenon that provides a better fit to empirical data than the standard preferential attachment model across an array of networks observed in Twitter. Using embeddings in an equivalent continuous time version of the process, and adapting techniques from the stable age-distribution theory of branching processes, we prove limit results for the proportion of edges that condense around the superstar, the degree distribution of the remaining vertices, maximal nonsuperstar degree asymptotics and height of these random trees in the large network limit.

Date issued

2015-07

URI

http://hdl.handle.net/1721.1/109426

Department

Sloan School of Management

Journal

The Annals of Applied Probability

Publisher

Institute of Mathematical Statistics

Citation

Bhamidi, Shankar; Steele, J. Michael and Zaman, Tauhid. “Twitter Event Networks and the Superstar Model.” The Annals of Applied Probability 25, no. 5 (October 2015): 2462–2502 © 2015 Institute of Mathematical Statistics

Version: Final published version

ISSN

1050-5164