The Price of Anarchy in Bilateral Network Formation in an Adversary Model

Abstract

We study network formation with the bilateral link formation rule (Jackson and Wolinsky 1996) with n players and link cost α>0. After the network is built, an adversary randomly destroys one link according to a certain probability distribution. Cost for player v incorporates the expected number of players to which v will become disconnected. This model was previously studied for unilateral link formation (K. 2011). We prove existence of pairwise Nash equilibria under moderate assumptions on the adversary and n≥ 9. As the main result, we prove bounds on the price of anarchy for two special adversaries: one destroys a link chosen uniformly at random, while the other destroys a link that causes a maximum number of player pairs to be separated. We prove bounds tight up to constants, namely O(1) for one adversary (if α>1/2), and (n) for the other (if α>2 considered constant and n ≥ 9). The latter is the worst that can happen for any adversary in this model (if α=(1)).