On a Centrality Maximization Game
Abstract
The Bonacich centrality is a well-known measure of the relative importance of nodes in a network. This notion is, for example, at the core of Google's PageRank algorithm. In this paper we study a network formation game where each player corresponds to a node in the network to be formed and can decide how to rewire his m out-links aiming at maximizing his own Bonacich centrality, which is his utility function. We study the Nash equilibria (NE) and the best response dynamics of this game and we provide a complete classification of the set of NE when m=1 and a fairly complete classification of the NE when m=2. Our analysis shows that the centrality maximization performed by each node tends to create undirected and disconnected or loosely connected networks, namely 2-cliques for m=1 and rings or a special "Butterfly"-shaped graph when m=2. Our results build on locality property of the best response function in such game that we formalize and prove in the paper.
Keywords
Cite
@article{arxiv.1911.06737,
title = {On a Centrality Maximization Game},
author = {Maria Castaldo and Costanza Catalano and Giacomo Como and Fabio Fagnani},
journal= {arXiv preprint arXiv:1911.06737},
year = {2020}
}
Comments
10 pages, 11 figures